patterns of innovation during the industrial revolution: a...
TRANSCRIPT
Patterns of Innovation during the Industrial Revolution: a
Reappraisal using a Composite Indicator of Patent Quality∗
Alessandro Nuvolari†a, Valentina Tartarib, and Matteo Trancheroc
aScuola Superiore Sant’Anna, Pisa, Italy
bCopenhagen Business School, Copenhagen, Denmark
cHaas School of Business, UC Berkeley, USA
August 5, 2019
Abstract
We introduce a new bibliographic quality indicator for English patents granted in the period
1700-1850. The indicator is based on the visibility of each patent both in the contemporary
legal and engineering literature and in modern authoritative works on the history of science and
technology. The indicator permits to operationalize empirically the distinction between micro-
and macroinventions. Our findings indicate that macroinventions did not exhibit any specific time
clustering, while at the same time they were characterized by a labor-saving bias. These results
suggest that Mokyr’s and Allen’s views of macroinventions, rather than conflicting, should be
regarded as complementary.
Keywords: Industrial Revolution; Patents; Macroinventions; Microinventions.
JEL Code: N74, O31
∗Acknowledgements: The authors want to thank Bart Verspagen, Tania Treibich, Abhishek Nagaraj, Sameer Srivas-
tava, as well as participants to seminars at University Cote d’Azur, UNU-MERIT, Berkeley-Haas and to EMAEE 2019
at SPRU - University of Sussex for their helpful comments. We are indebted to Joel Mokyr, Ralf Meisenzahl, Morgane
Louenan, Olivier Gergaud and Etienne Wasmer for sharing their data. The usual disclaimers apply.†Corresponding author : Alessandro Nuvolari, Scuola Superiore Sant’Anna, Pisa, Italy. Postal address: c/o Institute
of Economics, Scuola Superiore Sant’Anna, Piazza Martiri 33, 56127, Pisa, Italy. E-mail : [email protected].
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1 Introduction
Technical change has traditionally occupied a central place in the historiography of the Indus-
trial Revolution. Not surprisingly, both contemporaries and historians have regarded technological
progress as one of key-factors shaping the dramatic economic and social transformations taking place
in England during XVIII and XIX centuries. This interest in technical change has resulted in a very
rich qualitative literature which has provided detailed descriptions of technological advances both in
a broad, comprehensive perspective (Landes 1969; Mokyr 1990; Trinder 2013) and at the level of spe-
cific technologies, such as steam power (Hills, 1989), textiles (Hills, 1970) and iron production (Hyde,
1977).
In this context, the distinction between microinventions and macroinventions originally proposed
by Mokyr (1990) has established itself as a particularly useful notion for providing an insightful
characterization of the patterns of technical change. In Mokyr’s original formulation, microinventions
are “[. . . ] small, incremental steps that improve, adapt and streamline existing techniques already in
use, reducing costs, improving form and function, increasing durability, and reducing energy and raw
material requirements”, whereas macroinventions are “[. . . ] those inventions in which a radical new
idea, without clear precedent, emerges more or less ab nihilo” (Mokyr 1990, p. 13). The distinction
between micro- and macroinventions is intuitively appealing and is consistent with many qualitative
accounts of the contours of technical change during the Industrial Revolution (Landes 1969; Mathias
1969). However, at closer inspection, the notions of microinventions and macroinventions appears of
difficult empirical operationalization, especially if one is interested in reconstructions of broad patterns
of technical change spanning more than one specific technology or industry.
In this respect, an established tradition in economic history has resorted to patents to provide
quantitative assessments of the rate and scope of technical change (Sullivan 1989, 1990; Khan and
Sokoloff 1993). However, one of the well-known limitations of simple patent counts is that they
do not take into account the different quality of the inventions in question (O’Brien et al., 1995),
thus preventing a straightforward empirical identification of macroinventions. For modern patents,
economists of innovation have addressed this issue by designing a number of indicators of patent
quality based on the use of patent citations, geographical coverage (i.e., size of the patent family)
and renewals (Van Zeebroeck, 2011). These indicators are not immediately applicable to the case of
the English patent system during the Industrial Revolution. Remarkably, when writing The Lever
of Riches in 1990, Mokyr pessimistically concluded that “[. . . ] patent statistics [in the Industrial
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Revolution period] do not permit us to distinguish between radical and minor inventions” (Mokyr
1990, p. 82).
In this paper, we introduce a new composite indicator of the quality of English patents for the
period 1700-1850. Our indicator of patent quality is a substantial refinement of the bibliographic
indicator proposed by Nuvolari and Tartari (2011) based on Bennet Woodcroft’s Reference Index
of Patents of Invention, 1617-1852. We construct our new composite indicator by complementing
Woodcroft’s Reference Index with information collected from a wide array of modern sources on the
history of technology. These different sources of information concerning the quality of each individual
patent are aggregated using the approach introduced by Lanjouw and Schankerman (2004). The
resulting Bigliographic Composite Index (BCI) that we propose provides a reliable selection of the
most revolutionary technological breakthroughs of the period, and we validate its reliability through
extensive robustness checks. The integration of multiple sources allows the construction of an index
of patent quality that provides the opportunity for a large-scale empirical operationalization of the
notions of micro- and macroinventions, at least for the subset of patented inventions. In turn, this will
lead us to reappraise a number of interpretative conjectures on the sources and effects of macro- and
microinventions and on their interconnections (Allen 2009; Mokyr 2010; Crafts 2011; Allen 2018).
We find evidence that the distinction between macro- and microinventions is supported by the
patent evidence, with the series of macroinventions showing characteristics remarkably close to the
original theorizing of Mokyr (1990). In particular, the series of macroinventions shows statistical
properties that are consistent with a significant role of serendipity in determining their occurrence.
Vice versa, microinventions tend to come after the appearance of major breakthroughs, and to be
correlated with the economic cycle. We also document that macroinventions were characterized by
a labor-saving bias which is consistent with the High Wage Economy interpretation of the Industrial
Revolution proposed by Allen (2009). However, unlike what has been suggested by Allen (2009),
macroinventions were not the result of the activities of “outsiders”, that is inventors working in
different industrial sectors. A detailed study of patents in mechanical engineering further allows to
test speculations of the historical literature on the role of machine users in innovation (MacLeod and
Nuvolari, 2009), which we find were mostly responsible of minor improvements.
Our work is connected also to the ongoing efforts on the construction of indices of historical
technological progress. In this field, one traditional approach has been the estimation of indices
of labour productivity or TFP (Crafts and Harley 1992; Crafts 2014), which however are indirect
measures of technical change, often based on fragile data, and fraught with difficulties (Nelson, 1973).
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Our efforts are closer in spirit to the recent attempts to construct direct proxies of technical change
pioneered by Alexopoulos (2011), who proposed an indicator based on the number of new book titles
in different fields of technology, and Kelly et al. (2018), who employed textual analysis of US patent
documents to develop a new index of patent quality that can be used as a measure of technological
change.1
2 Literature review
The English patent system did not undergo major changes from the adoption of the Statute of
Monopolies in 1624 to the reform of 1852. This relative uniformity, coupled with the precise recording
of the date and details of the patents granted, makes patents an invaluable source to investigate the
dynamics of innovation during the Industrial Revolution (Sullivan 1989, 1990).
Still, historical patent data suffer from several pitfalls that can make their use problematic (MacLeod,
1988). The first major limitation is that obviously not all inventions were patented (Nuvolari 2004;
Moser 2005). But as aptly noted by Schmookler (1966), this should stimulate research efforts on in-
dicators of unpatented inventions that can usefully integrate the patent evidence, rather than leading
to a dismissal of patents as an insightful source.
A second important issue is the heterogeneity of patents in terms of their technological and eco-
nomic significance, i.e. what we can refer to as their relative “quality”. This, of course, applies to
modern patents as well (Scherer and Harhoff, 2000). However, the patent system of the time had
some features that exacerbated this problem. The English system was one of registration and not of
examination and this means that patents were not subjected to any systematic check concerning their
novelty or relevance. Sometimes patents lacked technological feasibility altogether, as the relatively
high number of “perpetual motion” machines patented testifies (MacLeod et al., 2003).
Accordingly, constructing a plausible index capable to weight each patent according to its techno-
logical and economic significance is a crucial step to use patents for assessing the contours of technical
change in this period. Unfortunately, standard modern indicators of patent quality, such as patent
citations and data on renewals (Van Zeebroeck, 2011) are not available: the early English patent
system neither prescribed to document prior art by citing other patents, nor it required renewal fees.
It is necessary, therefore, to devise new approaches.
In a seminal paper, Khan and Sokoloff (1993) have pioneered the assessment of the quality of
1For the period of the Industrial Revolution, there have been also attempts to develop indicators of technical changeat industry level, see Kelly and O Grada (2016) and Kelly and O Grada (2019).
4
historical patents by collecting systematic data on the patenting activity of American “great inventors”,
where by this term they understood the inventors included in the Dictionary of American Biography.
The underlying assumption is that their inventions were presumably more valuable from a technological
or economic point of view than those of all other inventors. In particular, they systematically compare
the patents of great inventors with the remainder of the patent corpus as a way to test the differences
between macro- and microinventions. Using this method, they find that there were no significant
differences between the two kinds of invention. Khan (2018) has recently carried out a similar exercise
for the English case using the evidence from the Oxford Dictionary of National Biography.
In a different vein, Nuvolari and Tartari (2011) have argued that the Reference Index of Patents of
Invention, 1617-1852 edited by Bennet Woodcroft can be employed to construct a plausible indicator
of the quality of English patents before 1852. The Reference Index was a component of a larger set of
indexes that were published on requests of the Patent Office Commissioners after the patent reform
of 1852.2 The Reference Index is structured in chronological order and for each single patent it gives
a list of all the sources in the contemporary technical and legal literature that discussed the details of
the patent in question. In this way, the number of references listed in the Reference Index captures the
“visibility” of each patent in the contemporary specialized literature, providing a reasonable proxy for
its relative technical and economic significance. The basic intuition is akin to modern bibliographical
indexes of research impact based on citations. The approach of Nuvolari and Tartari (2011) is to use
the time-adjusted count of references as a score for each patent (dubbed as WRI*).3
The index proposed by Nuvolari and Tartari (2011) has been used in a number of recent studies
as a suitable indicator of patent quality (e.g. Squicciarini and Voigtlander 2015, Zeev et al. 2017,
Dowey 2017), while Hanlon (2015) has adopted the same approach to construct a quality indicator
for cotton patents in the period 1855-1876. Furthermore, in his research Sean Bottomley has found
that patents litigated were characterized by higher values of the WRI* index compared with regular
patents, whereas patents granted also in Scotland and Ireland were characterized by higher values of the
2Before the reform of 1852, a patent application could be lodged in anyone of these three Public Offices in London:Rolls Chapel Office, Petty Bag Office and Enrolment Office. The system lacked an effective search catalogue providingeasy access to the specifications of existing patents. With the reform of the patent system, the new Patent OfficeCommissioners decided to address this problem by funding a major publication of indexes and abridgments of the patentsgranted from 1617 to 1852. The Commissioners entrusted this task to Bennet Woodcroft, professor of machinery, patentagent and himself an inventor. Together with the Reference Index, Woodcroft and his team of clerks published anAlphabetical Index of Patentees, a Chronological Index of Patents and a Subject Index of Patents. The publication ofthese indexes was followed by a further attempt to summarize and classify by subject all the existing patent specificationsby publishing a series of Abridgments of Patent Specifications. Each of these volumes contained a succinct descriptionof all the patent specifications pertaining to a specific technological subject (Nuvolari and Tartari, 2011).
3The fixed-effect time adjustment is necessary in order to take into account the different age of patents and, accordingly,their different exposure to citations/referencing. Note that a similar approach is also routinely used for patent citationsin modern patents (Hall et al., 2002).
5
WRI* index compared with patents granted only in England (Bottomley 2014a, 2014b). All together
this evidence represents a significant corroboration of the intuition underlying the construction of the
index.
At the same time, it is worth acknowledging that the WRI* is not immune from limitations and
that there is room for significant improvements. The compilers of the Index had to examine a wide
and highly heterogeneous corpus of literature without the benefit of hindsight, therefore it is not
surprising that a few patents covering important breakthroughs such as the John Kay’s flying shuttle
or Henry Cort’s puddling process resulted in a low number of references. Indeed, it is hard to tell,
in each specific case, if the low number of references is due either to a minor impact of the patent
in the literature or to some biases in the sifting process from the side of the compilers. The bulk of
the literature considered by the examiners appeared in early years of the 19th century, which might
explain why some older important inventions ended up being short-changed. On the other hand, the
compilers’ view reflected the spirit of the time, being attracted by curious or seemingly promising
inventions that in actual terms did not fulfill their promise. A case in question is patent number 556
granted to Jonathan Hulls for a steamboat, which raised a good deal of attention by contemporaries,
but it was of extremely limited practical significance.4
In this paper, we construct a new composite indicator of patent quality that overcomes these
shortcomings. After extensive search, we assembled a suitable corpus of authoritative modern reference
texts on the history of science and technology and biographical dictionaries of scientists and inventors
that can be used to integrate Woodcroft’s Reference Index. These new data sources can plausibly
capture complementary dimensions of patent quality, and we combine them to create a single composite
index that improves the signal-to-noise ratio of the WRI*.
3 The construction of the Bibliographic Composite Index
3.1 Data Sources
We have constructed a dataset consisting of three patent quality indicators for the 13,070 English
patents granted in the 1700-1850 period. First, we consider the visibility of each patent in the contem-
porary engineering and legal literature, as summarized in Woodcroft’s Reference Index (henceforth,
WRI). This indicator has been originally proposed by Nuvolari and Tartari (2011) and it counts the
4Considered the pioneer of steam navigation, Jonathan Hulls (1699-1758) was a British inventor that obtained thefirst patent for a steam-propelled ship. Hulls’ patent achieved a certain popularity and was certainly of inspiration forthe subsequent work of Symington and other inventors, but there is no evidence that his steam tugboat ever led topractical trials or applications (Robinson, 2004).
6
number of times each patent was mentioned in specialized publications. A typical entry of the WRI
is reported here as Figure 1. The patent in question (patent 913) is the one granted in 1769 to James
Watt for the separate condenser. Not surprisingly, Watt’s breakthrough invention is mentioned in
a significantly higher number of references than the comparatively incremental improvement to the
making of small shot (making it more “solid, round, and smooth”) patented by William Watts in 1782
(patent 1347 in Figure 2). An interesting feature of the Reference Index as quality indicator is that
the centralized process of collection of references carried out by Woodcroft and his clerks should limit
possible biases arising from heterogeneity in citations behavior and strategic considerations that afflict
modern patent citations.
[Figure 1 about here]
[Figure 2 about here]
Our second patent quality indicator is based on the relative visibility of each patent in modern
reference books on the history of science and technology. This approach is similar to the one adopted
originally by Schmookler (1966) who compiled lists of “important inventions” for a number of industries
on the basis of a scrutiny of specialized historical and engineering references. In our case we considered
ten reference books (the full list is reported in Appendix A). For each patent we count the total
number of times it is mentioned in this set of sources, obtaining in this way a quality score that we
call Patent Eminence (PAT EM). This procedure was adopted by Kleinknecht (1990) for constructing
a quality indicator based on the integration of different lists of radical innovations. We find that our
set of sources has a high degree of internal consistency (Cronbach’s alpha coefficient=0.829)5 and it
effectively singles out the most eminent patents without noteworthy omissions (see Appendix B).
The third quality indicator considers the relative visibility of the patentee in biographical dictio-
naries and other similar sources. Khan and Sokoloff (1993) have first used this approach for identifying
the inventors responsible for the most historically significant inventions in the US case. More recently,
Nicholas (2011) used this empirical strategy to find the subset of US patents with higher technological
relevance, while Khan (2018) has carried out a study of British “great inventors” using the same
method. We collected data from nine biographical dictionaries and ad hoc lists comprising the most
prominent inventors of the Industrial Revolution (details again in Appendix A). This third quality
indicator, which we term Inventor Eminence (INV EM), is constructed in an analogous way to the
previous ones by counting the number of sources that mentions each patentee, and it shows again
a high degree of internal consistency (Cronbach’s alpha coefficient=0.884). Table 1 summarizes the
5On the interpretation of the Cronbach’s alpha coefficient, see for instance Bland and Altman (1997).
7
number of patents and inventors cited by each of the sources used.
[Table 1 about here]
The three quality indicators that we have constructed can plausibly capture complementary di-
mensions of patent quality. We suggest that the references retrieved from Woodcroft’s Reference Index
should be better equipped to assess relatively unknown microinventions, while measures of patent and
inventor eminence are better suited to gauge macroinventions thanks to the benefit of hindsight. Table
2 shows that the three indicators display significant positive correlations but their Spearman’s rank
correlation coefficients are rather low, confirming that they are indeed capturing different features
of patent quality. In other words, Table 2 suggests that these lists reflect a number of relatively
independent assessments of the historical significance of inventions.
[Table 2 about here]
As expected, the use of quality indicators derived from modern bibliographic sources substantially
mitigates some idiosyncrasies of the original WRI* proposed by Nuvolari and Tartari (2011). For
instance, the new quality indexes we assembled are able to downplay the role of curious or absurd
patents that received attention for reasons beyond their genuine technological or economic significance.
Table 3 compares two patents granted in 1736. These are Jonathan Hulls’ patent for a steam-boat
mentioned before and John Kay’s patent for the flying shuttle (which has a surprisingly low value
of WRI). The table shows that, in this case, Patent and Inventor Eminence provide a more reliable
assessment of the relative quality of these two inventions.
[Table 3 about here]
Similarly, Table 4 compares Richard Arkwright’s famous patents for the water-frame and the
carding machine. The first was the breakthrough invention that revolutionized the cotton spinning
industry, while the second is a patent that was at the centre of spirited legal controversy and that was
eventually revoked after a legal trial. The heated discussion around this contentious patent explains
the higher number of references of this patent in the Reference Index, relatively to the water-frame.
In this case, the Patent Eminence indicator is the quality indicator which seems more in line with the
established wisdom.
[Table 4 about here]
3.2 Index construction
The combinations of individual indicators into a single composite variable is an intuitively appealing
approach to retain the common information signalling patent quality while removing the noise and
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idiosyncrasies of specific individual sources (Van Zeebroeck, 2011). Accordingly, we adapt the approach
pioneered by Lanjouw and Schankerman (2004) to our sample of historical patents.
Figure 3(a) contains the average number of references per year or per decade in Woodcroft’s
Reference Index, whereas figure 3(b) shows the average scores of Patent and Inventor Eminence per
decade. Due to the expansion of the specialized literature discussing patent specifications, the average
number of references per patent recorded in the Reference Index displays an increasing trend. On
the contrary, the average number of citations by modern sources is slightly decreasing during the
last decades considered. Taken together, Figure 3 suggests that using the raw number of references
as indicators to compare patents granted in different years would lead to potentially biased results.
Further, it is also likely that the number of references would be affected by the type of technology
covered in the patent. Note, however, that these types of problems are present in modern patent data
as well: for example, the computerization of patent databases during the 1980s enhanced the search of
prior art for inventors and patent examiners leading to an increase in the average number of citations
per patent. Hence, as it is done with citations for contemporary patents, it is important to adjust the
indicator for time and industry effects (Hall et al., 2002).
[Figure 3 about here]
In order to account for systematic temporal and sectoral effects, we estimate the following three
separate Poisson regressions with robust standard errors:6
WRIi = e(α+∑M
m=1 βmDyearm+∑N
n=1 δnDsectorn)
PAT EMi = e(α+∑M
m=1 βmDyearm+∑N
n=1 δnDsectorn)
INV EMi = e(α+∑M
m=1 βmDyearm+∑N
n=1 δnDsectorn)
where Dyearm are the dummies for the decades from 1700 to 1850 (M = 15), Dsectorn are the
sectoral dummies (N = 21), and WRIi, PAT EMi, INV EMi are the the raw reference scores to
patent i and its inventor, respectively. In practice, each quality indicator is regressed against industry
and time dummies in order to eliminate the systematic effects discussed above. The residuals of each
regression capture the share of variance attributable to the “intrinsic” quality of the patent.
As a final step, we extract from these residuals a latent common factor using a structural equation
model (SEM) represented in Figure 4 (Lanjouw and Schankerman, 2004).7 This is tantamount to
estimating a multiple-indicator model with one latent common factor:
6As a robustness check, we also run negative binomial regressions finding nearly identical results.7As a matter of fact, this approach reaches the same results of a confirmatory factor analysis where the number of
retained factors has been constrained to one (Schreiber et al., 2006).
9
yki = αk + λkqi + εki
where yki indicates the value of the kth indicator for the ith patent (k = 1, 2, 3 and i = 1, . . . , 13070)
and q is the common factor with factor loadings λk. From the estimation of this structural equation
model, we derive the value of the latent factor for each patent (qi). As discussed by Lanjouw and
Schankerman (2004), the common factor gathers the unobserved characteristic of patents that influ-
ences all the indicators used. Accordingly, we consider the latent common factor q as a composite
measure of patent quality that we label Bibliographic Composite Index (BCI). The factor loadings λ
of the common factor are reported in Table 5.
[Figure 4 about here]
[Table 5 about here]
The distribution of the BCI is shown in Figure 5. The index is extremely skewed with a very long
tail, which is consistent with the notion of the bulk of the distribution concentrated on microinventions
alongside with a restricted set of macroinventions.
This result is in line with the distribution of patent value found in modern patents (Silverberg and
Verspagen, 2007), and the replication of this stylized fact has often been considered as a preliminary
validation of composite indexes of patent quality (De Rassenfosse and Jaffe, 2015). In any case, in
this paper, we prefer to adopt a very cautious approach and use our composite quality index in an
ordinal rather than cardinal way, considering only the relative ranking of the patents according to
the index. Note that the rankings we obtained are robust to many other aggregation procedures not
reported here (factor analysis; Borda ranking; nonlinear SEM specifications). Similarly, constructing
the BCI using Poisson residuals of regressions that employ different sets of time and industry controls
produces highly overlapping sets of the top quality patents, confirming the general robustness of the
procedures used to construct the index (Table 20 in the Appendix).
[Figure 5 about here]
3.3 Index validation
We validate our composite indicator by performing several robustness checks. First, the list of
top-quality patents seems, prima facie, to offer a very plausible selection of the most revolutionary
inventions of the Industrial Revolution (Table 22 in the Appendix B). Among the most important
inventions, our indicator correctly lists Watt’s separate condenser, Wheatstone’s telegraph, the spin-
ning jenny of Hargreaves. Notably, the Bibliographic Composite Index is also effective in gauging the
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relative importance of lesser known inventions. Consider for instance the case of the power loom, de-
scribed in detail by Allen (2018). While the macroinvention developed by Cartwright was a functioning
prototype but with still limited economic application, the major refinements that led to productiv-
ity improvements were the result of R&D by skilled mechanics such as Thomas Johnson and later
Richard Roberts. The importance of these technical improvements is finely captured by the BCI, that
collocates these patents in the 95th percentile of the quality distribution.
As a further validation exercise, we compared the BCI with some independent measures of patent
quality. We consider the patents whose inventors paid an extra fee to extend their coverage to Scotland
and Ireland (Bottomley, 2014b). Also, we assembled lists of patents that were litigated in court
(Bottomley, 2014a) and patents for which patentees petitioned the Parliament asking a time extension.
The rationale of using these variables is based on empirical studies showing that modern valuable
patents tend to have larger families (Lanjouw et al., 1998), are likely to be involved in court cases
(Lanjouw and Schankerman, 2001) and are renewed for longer lifespans (Lanjouw et al., 1998). By
means of Fligner-Policello test of stochastic equality we show that patents with large geographical
scope, that requested time extensions or that were the object of lawsuits are characterized by higher
scores of the BCI (Table 6). We also present the test for the subsets of patents filed after 1734 (when
the specification became a universal requirement) and after the famous ruling on Liardet v. Johnson
(1778), which further elaborated on the specification requirements (Nuvolari and Tartari, 2011). All
the results hold if we employ Mann-Whitney-Wilcoxon test.
[Table 6 about here]
Furthermore, the BCI is a significant improvement when compared with the WRI* index of Nu-
volari and Tartari (2011). The BCI is better equipped for discriminating true breakthroughs from
patents which garnered many references for reasons not connected to their intrinsic quality. Using
again the Fligner-Policello of stochastic equality, we show in Table 7 that the BCI is able to individuate
“bad” patents. In this case, we look at patents in steam engineering and we use as samples of flawed
patents the list of patents covering perpetual motion machines scorned by Dircks (1861) and the set
of technically unfeasible steam engines discussed by MacLeod et al. (2003). The table also shows that
the WRI* indicator is less effective in these cases.
[Table 7 about here]
Finally, some important innovations of the industrial revolution such as the boring machine, the
spinning jenny and the rolling process for metalworking were characterized by very low WRI* scores
(Table 8). With the benefit of hindsight of the components measuring patent and inventor eminence,
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the BCI gives a very plausible collocation of these patents in the highest quality percentile. The
same goes for the patents contained in Table 3 discussed before. In this case, the BCI recognizes the
breakthrough character of Kay’s flying shuttle (placing it among the very top inventions, while Hulls’
patent is only in the 75th percentile of the index distribution).
[Table 8 about here]
To conclude, the BCI as a composite indicator combining both contemporaries’ assessments and
modern perspectives seems to provide a fairly reliable assessment of the quality of inventions of the
English patents in the 1700-1850, effectively improving the signal-to-noise ratio with respect to the
WRI*.
4 Patterns of Innovation during the Industrial Revolution
The conceptualization of inventive activities in terms of macro- and microinventions originally pro-
posed by Mokyr (1990) has featured prominently in the recent debates on the origins of the Industrial
Revolution. For example, the distinction between microinventions and macroinventions has been used
in several studies in order to account for the dynamics of productivity during the Industrial Revolution
(Crafts 1995; Allen 2009; Broadberry and Gupta 2009).
Following the original formulation, a number of interpretative conjectures on the sources and
effects of macro- and microinventions and on their interconnections has emerged in the literature
(Allen 2009; Meisenzahl and Mokyr 2011; Crafts 2011; Allen 2018). Mokyr (1990) originally claimed
that macroinventions, being result of serendipitous findings, did not respond to economic incentives
(Yaqub, 2018). This is in contrast with Allen (2009), who has argued that macroinventions actually
responded to economic signals by substituting capital and energy for high-wage labour (the high wage
economy conjecture); put differently, macroinventions can be interpreted as innovations induced by
a peculiar wage and price configuration (Allen 2009, p. 141).8 Allen’s point is that macroinventions
did require major investments in terms of time and economic resources in order to transform inchoate
ideas into viable prototypes. These investments were likely to be undertaken only in response to major
profit opportunities which explains the sensitivity of macroinventions to economic signals.
Allen also suggested that microinventions resulted from local learning efforts of “insiders” to the
industry, while true breakthroughs were largely due to “outsiders” (Allen 2009, p. 149). This theme
seems to resonate with MacLeod and Nuvolari (2009), who conjectured that, in the field of machinery,
8The possible role played by high wages in precipitating the breakthrough of the Industrial Revolution was alsoconsidered by Habakkuk (1962, pp. 132-137 and 144-151) and Crouzet (1983, pp. 37-43 and 92-96).
12
the inventive efforts of professional machine makers typically generated small incremental inventions;
in this account, machine users facing actual industrial bottlenecks were responsible for the more radical
inventions.
The Bibliographic Composite Index permits to operationalize empirically the distinction between
micro- and macroinventions. In particular, we follow the literature on breakthrough patents and use
the distribution of our quality indicator to single out the upper tail of macroinventions (Kelly et al.,
2018). The absolute value of the BCI drops rapidly when one moves away from the best inventions,
thus we considered the very top patents (top 0.5% percentile) as the threshold for defining the set of
macroinventions (Table 22 in the Appendix B).9
4.1 Time dynamics of invention
Mokyr’s view is that micro- and macroinventions are actually the outcome of different generating
processes (Mokyr 1990, p. 295). In particular, macroinventions are conceptualized as the unfolding of
an essentially serendipitous arrival process. On the contrary, microinventions are the systematic and
cumulative improvement of new technologies and as such should display strong temporal persistence.
To investigate this conjecture, we test whether the arrival process of macroinventions shows any kind
of time clustering. This kind of exercise is common in the classic literature that has investigated the
Schumpeterian hypothesis according to which basic inventions (a concept analogous to macroinven-
tions) tend cluster overtime (e.g. Sahal 1974, Kleinknecht 1990). Assuming that innovations are count
data generated by a point process, we follow Silverberg and Verspagen (2003) and employ Poisson and
negative binomial regressions with time trends to predict the yearly number of macroinventions and
microinventions (see Appendix C for technical details). In particular, the Poisson process is the sta-
tistical description of a process characterized by complete randomness (Cameron and Trivedi, 1998).
The negative binomial model is a generalization of Poisson distributions because it permits to model
overdispersion, that is a situation where the variance of the distribution is not equal to the mean.
We generalized this framework by controlling whether the arrival rate of the distributions follows
time trends of various orders. Finally, we also carried out a Box-Ljung test of autocorrelation of the
standardized residuals to further test the explanatory power of the models (Silverberg and Verspagen,
2003).
9Our findings are robust to other definitions of the set of macroinventions, such as taking the first 100 patents orthe top 1% of them (whose results we also report). Although there is no exact cut-off point to determine breakthroughinnovations, it is standard in the literature adopting a rather arbitrarily high threshold (for instance, Ahuja and Lampert(2001) use the top 1% patents).
13
Our results (Tables 9 and 10) show that macroinventions neither display over-dispersion nor auto-
correlation in the residuals of the model.10 This basically suggests that the occurrence of macroinven-
tions does not display clustering in the sense of random spells of high and low innovation activity. On
the contrary, for microinventions the hypothesis of equidispersion is rejected, favouring the negative
binomial specification. The series of microinventions shows strong time autocorrelation, suggesting
that their generating process is driven by some mechanisms that induces time persistence.11
[Tables 9 and 10 about here]
Furthermore, we find that microinventions are positively correlated with the economic cycle. The
Pearson’s correlation coefficient between the growth rates of microinventions and the annual change
in the GDP series (Broadberry et al., 2015) is equal to 0.1715 and it is significant at a 5% level,
while no such correlation exists in the case of macroinventions. All in all, the dynamics of macroin-
ventions appears to be described well by a simple Poisson point process. Figure 6 shows that the
Poisson regression model that we estimated is able to almost perfectly reproduce the pattern of the
observed data.12 Indeed, in Figure 7 we offer an impressionistic graphical representation of the dif-
ferent processes governing micro- and macroinventions, as defined using the Bibliographic Composite
Index.
[Figure 6 about here]
[Figure 7 about here]
Figure 8 charts the cumulative distribution of patents over time. The black in each subfigure
represents the cumulative distribution of macroinventions vis-a-vis microinventions for a different set
of patents (textiles, engines, machinery, and all sectors together). More specifically, the curve in each
sub-figure shows the proportion of macroinventions over the period 1700-1850 that already occurred
when a certain proportion of microinventions is reached. For instance, the upper-left quadrant shows
10Results are robust to alternative definitions of macroinventions (e.g. first 100 patents, top 1% inventions) and tothe inclusion of sectoral dummies in these regressions. One might fear that the procedure through which we cleansedthe raw indicators might mechanically lead to this absence of time clustering. However, this is not the case, because theranking of the most relevant inventions of the Industrial Revolution is extremely robust even if we do not control fortime or if directly build the BCI using the raw indicators (Table 20 in the Appendix). As a further proof that this resultis not due to the way we accounted for time trends in the raw indicators, note that one would symmetrically expect asimilar absence of concentration of macroinventions across industries, given that we controlled for industry dummies inthe same way we did for time decades. However, in unreported results we find that macroinventions show remarkablesectoral concentration, and three sectors alone (engines, textiles, metallurgy) account for half of them.
11In their sample of important inventions, Silverberg and Verspagen (2003) find instead time clustering in the formof overdispersion, a difference possibly due to the later time period they consider (second half of XIX century and XXcentury). An alternative way to analyze the difference between micro- and macroinventions is by means of time seriesanalysis. In unreported augmented Dickey-Fuller tests, we found that the test strongly rejects the null hypothesis ofpresence of a unit root in the macroinventions series. Macroinventions follow a stable mean reverting process, a clue ofthe exogenous nature of the arrival of macroinventions first suggested by Crafts (1977 and 1995).
12Our finding echoes the early study of Sahal (1974), who also showed how this result is not simply due to a statisticalartifact of rare events.
14
that by the year 1800, over half of all the macroinventions that spurred the Industrial Revolution had
already appeared, while only 16% of the ensuing microinventions were there. In a sense, these graphs
represent Lorenz curves of the “time inequality” in the distribution of micro- and macroinventions:
a perfectly equal time distribution of the two arrival processes would be depicted by a straight line
with a 45 degrees slope. The figure suggest that the majority of macroinventions occurred in the
fifty years between 1750 and 1800, consistently with the traditional chronology of the Industrial
Revolution (Landes 1969; Sullivan 1990). Overall, the cumulative distribution of macroinventions
tends to anticipate the cumulative distribution of microinventions. This is again consistent with
Mokyr’s suggestion that the two processes are complementary features of technological progress, with
macroinventions prompting cumulative streams of microinventions, albeit with varying lags. Note
also that this finding is robust across sectors: if anything, for the more technological dynamic sectors
of steam engines and textile machinery this pattern is even more pronounced, possibly because the
potential of prototype macroinventions required a longer period to be fully exploited.
[Figure 8 about here]
4.2 Characteristics of micro- and macroinventions
Allen (2009, p. 136) has argued that macroinventions radically changed factor proportion by
substituting capital and energy for high-wage labour. In this account, the high wages prompted the
search for labour-saving new technologies; microinventions, on the contrary, were the result of cu-
mulative learning processes and thus they are not biased in any specific directions. In other words,
microinventions were a stream of continuous productivity improvements that increased overall effi-
ciency of both capital and labour (Allen 2009, p. 148). This point of view is in contrast with the
interpretation of Mokyr (1992, 2010), who argues that macroinventions were not sensitive to economic
inducements (Crafts, 2011). To check these conjectures, we exploit the summary description of the
patents contained in Woodcroft’s Titles of Patents of Invention Chronologically Arranged, 1617-1852
(1854), which is an excerpt of the specification filed by the inventor: for many patents granted before
1800, it is possible to surmise from this description the stated aims of the inventor (see Table 11 for
three examples).13
[Table 11 about here]
We follow the approach of MacLeod (1988) and from the description of each invention we identify
13Obviously this exercise neglects inventions that consisted in entirely new products or services, like canned food,and that as such did not entail any kind of bias per se (Kelly et al., 2014). However, more than 85% of our set ofmacroinventions pertain to improvements in production processes, mostly ways to improve quality or reduce costs.
15
two main goals. If only one aim is clearly described, we count this goal once and mark as unspecified
the second aim. This ensures comparability between our results and the original assessment that
MacLeod carried out for the entire sample of patents. Table 11 presents the results of this approach
for three representative patents.
Table 12 compares the stated aims of invention for our selection of macroinventions with the
results of MacLeod on all patents in the period 1700-1799. We find that microinventions were indeed
mostly concerned with saving capital, raw materials and other inputs. Interestingly enough, among
macroinventions the share of inventions with the same goal is significantly smaller, while the incidence
of other motivations is very similar. However, the results of Table 12 must be interpreted with
care: not surprisingly, in this period, inventors were reluctant to explicitly boast the labor saving
potential of their inventions (MacLeod 1988, p. 166). Hence, it is likely that the share of labour
saving inventions in Table 12 underestimates the actual phenomenon. Therefore, following again the
approach of MacLeod (1988), we try to discern from the patent description also the actual labour
saving effects of the inventions (beyond what is explicitly stated in the specification).14 Table 13
compares the labor-saving potential (defined in this broader meaning) of micro- and macroinventions.
In this case, we find a much stronger labour-saving character for macroinventions (38% of top 0.5%
patents) than for microinventions (15% of all patents). The reason of this difference is that a large
share of macroinventions consisted of machines: they account for almost half of the highest quality
patents, while little more than 20% of microinventions was related to machines. Overall, these findings
appear consistent with Allen’s view of a structural difference in the factor-saving biases between macro
and micro-inventions and, in particular, with the notion that macroinventions displayed a significant
labour saving bias (Allen, 2009).15
[Table 12 about here]
[Table 13 about here]
Allen (2009) has also suggested that microinventions resulted from local learning efforts of in-
ventors who were “insiders” to trade, while true breakthroughs were largely due to “outsiders” who
14More precisely the approach of MacLeod is the following: labour saving inventions are classified as “[. . . ] thoselabour-saving machines and technique which contemporaries generally identified as such, e.g. spinning, carding, orthreshing machines and power looms”. However, in the labour-saving category are not included “[. . . ] machines andtechniques whose labour saving potential was commonly overlooked by contemporaries, unless a particular inventionwould increase its labour productivity further. Thus, wind, water, horse and steam engines were excluded as weree.g. handlooms, the majority of stocking frame attachments, sugar mills, the printing press (but not mechanical textileprinting)” MacLeod 1988, p. 257).
15Our evidence, however, does not allow to discriminate whether the impetus towards mechanization in macroinventionswas actually prompted by high wages or by the limitations of traditional techniques and production systems, which isone of the issues currently debated by Humphries and Schneider (2019) and Allen (2019).
16
could rely on insights originating from “outside the immediate industrial experience” (Allen 2009,
p. 149). According to the data on the occupations of the patentees reported in Woodcroft (1862),
Allen’s hypothesis is not corroborated: the results of Table 14 show that the share of macroinventions
actually ascribable to outsiders is always below 30%.16 In terms of differences between macro- and
microinventions, the first two columns of the table highlight a higher incidence of outsiders in patents
for the former: especially after 1760, around a quarter of macroinventions was invented by people with
an “outsider” background, whereas for total patents this share is around 17%. However, this differ-
ence disappears almost entirely if one removes Cartwright’s patents from the computations, showing
that the results are actually sensitive to this specific case. Indeed, Cartwright is the outsider for
excellence: a clergyman with a penchant for poetry, he started his quest for for the mechanization of
weaving out of intellectual curiosity (O’Brien, 1997).17 His inventions are among the most important
breakthroughs of the Industrial Revolution, and are rightly classified by our BCI among the most
valuable patents. To sum up, our evidence suggests that macroinventions required specialized skills
and competences (Mokyr, 2010), rather than simple insights outside the prevailing trade practices.
[Table 14 about here]
We expand the analysis by concentrating on machinery patents. Following von Hippel (1988),
MacLeod and Nuvolari (2009) suggested that macroinventions in machinery were mostly made by
machine users, with professional machine-makers being responsible of incremental improvements. The
reasons to expect a pattern in which the user-inventor made the initial technological breakthrough
are at least two, rooted in the different incentives of users and makers (MacLeod, 1992). First, there
was a differential in the risk factor: besides the technical challenges, makers incurred the commercial
uncertainty involved in selling radically new inventions. On the contrary, users were the ones profiting
in first person from riskier technical advances. Second, and relatedly, building one’s own machinery
offered the opportunity for its deployment in secret, arguably an appropriation strategy more effective
than the imperfect patent system of the time.18
We explore the merits of this hypothesis in Table 15. Contrarily to the prediction, the most
important patents covering machinery were due to professional engineers and millwrights, while users
16Note however that the data reported in Table 14 should be considered a conservative approximation of the trueincidence of outsiders in patenting during the Industrial Revolution (since doubtful cases of outsiders are not counted).
17In the reconstruction of O’Brien (1997), Cartwright started his quest for the mechanization of weaving after a dinnerin Manchester where businessmen warned him on the impossibility of doing so. After years of work and huge investmentsin R&D, he eventually tried to open a business based on his invention, but the venture immediately failed because hismain interests were purely technical and not commercial. Indeed, Cartwright himself was aware of the potential effectson jobs of his new inventions (to the point that he even proposed to the Parliament to self-contain sales of his newmachine).
18Of course, we cannot assess this second argument because our data comprises only patented inventions.
17
of industrial machinery were mostly active in microinventions. Again, this findings points towards the
critical role of specialized competences in macroinvention.
[Table 15 about here]
4.3 A tentative interpretation
Crafts (2011) has provided a perceptive analysis of the different conceptualizations of macro- and
microinventions proposed by Allen (2009) and Mokyr (1990). In Craft’s view, Allen and Mokyr focus
on different stages of the innovation process, which runs “linearly” from ideas (1), to R&D efforts (2),
to incremental improvements (3). Mokyr considers macroinventions as pertaining mostly to the first
stage, hence he stresses the role of individual creativity and serendipity (Yaqub, 2018). For Allen,
macroinventions encompass both the first and the second stage, and in particular, the role of the large
investment outlays required to transform the original idea into a fully-fledged prototype.19 From this
perspective, clearly, economic inducements come to play an important role.
In our interpretation, which is actually somewhat similar to the one sketched by Crafts, the
evidence presented in this section suggests that Allen and Mokyr are actually focusing on two different
complementary dimensions of inventive activities. Figure 9 illustrates our attempt of summarizing
Allen and Mokyr’s perspective on macroinventions in a unified framework.
[Figure 9 about here]
On the horizontal axis of Figure 9 there is the principal dimension considered by Allen, namely
investment in R&D activities, whereas on the vertical axis there is degree of serendipity surrounding
the search activity of inventors which is the feature highlighted by Mokyr. Our framework makes
clear that Mokyr and Allen are pointing to necessary but not sufficient conditions for the emergence
of macroinventions. In terms of Figure 9, both serendipity and extensive investment in search activities
are actually distinguishing and complementary features of macroinventions.
This fits well with the findings of this section on the different patterns of macro- and microinventive
activity. The occurrence of macroinventions can be accounted for by a homogeneous Poisson process
and this is in line with the notion of a significant role of chance and serendipity, which on the other
hand remains somewhat impervious to economic factors. Economic factors instead seem to shape the
actual character of macroinventions. One can imagine that economic factors will determined which
areas of the space of technological opportunities will be searched, while serendipity will condition the
success of the search process in this preselected domain. The findings concerning the role of insiders
19In this respect, Allen cites approvingly Edison’s quip that “invention is 1% inspiration and 99% perspiration”.
18
and of specialized engineers and mechanics point to the key role of specialized skills and competences
together with other resources for a successful search of the space of technological opportunities.20
5 Conclusions
In this paper, we have introduced a new composite indicator of the quality of English patents
in the period 1700-1850. Our Bibliographic Composite Index (BCI) synthesizes two different but
complementary assessments of patent quality: the technical and economic importance perceived by
contemporaries and measured by the number of references in Woodcroft (1862), and the historical
significance as assessed by the modern history of technology literature with the benefit of hindsight.
We have carried out a thorough examination of the properties of BCI and tested its ability to identify
the most important patents of the Industrial Revolution. The results are rather encouraging and
it would seem that this new composite indicator may represent a very useful proxy for the quality
of English patents in the 1700-1850 period, improving the WRI* index introduced by Nuvolari and
Tartari (2011).
Next, we have employed the new composite indicator of patent quality to study the patterns of
innovation during the British Industrial Revolution. In particular, we have focused on the distinction
between micro- and macroinventions. Our findings provide robust evidence in favor of the existence
of two related but different processes governing the occurrence of macro- and microinventions. Fur-
thermore, we have found limited incidence of outsiders or machine users in macroinventions, but we
have confirmed the existence of a significant labour-saving bias in macroinventions, a conjecture that
is one of the key points of the high wage interpretation of the Industrial Revolution proposed by Allen
(2009).
Our findings resonate with Crafts’ (2011) assessment of the Allen-Mokyr debate who found that
the two accounts of the Industrial Revolution actually pointed to distinct but complementary features
of innovation processes of that period. An intriguing research agenda for the immediate future would
be to consider whether the tentative characterizations of the patterns of innovation proposed in this
paper can actually be developed in a new synthesis as adumbrated by Crafts (2011).
20This perspective is reminiscent of the interpretation originally put forward by Crafts (1977, p. 437) who regardedmacroinventions as the outcome of a “stochastic search processes in which both economic inducements and scientific,supply-side considerations play a part.”
19
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6 Figures and Tables
Figure 1: Entry in Woodcroft’s Reference Index for James Watt’s patent of the separate condenser(1769)
Note: the entry gives references to technical and legal literature where the patent is mentioned, while the last line of thetable indicates in which office the specification was lodged (in this case Rolls Chapel). The Index also notes of the FireEngines Patent Act (1775) that extended the patent to 1800.
Figure 2: Entry in Woodcroft’s Reference Index for William Watts’ patent for making better smallshots (1782)
Note: Not surprisingly, Watt’s separate condenser received a much higher number of citations than the incrementalimprovements patented by William Watts.
25
(a) Average number of references per patents in Woodcroft (1862), yearlyand by decade.
(b) Average number of references per patents by decade.
Figure 3: Average number of references per patents over time
Patent Quality
WRI PAT EM INV EM
ε1 ε2 ε3
Figure 4: Structural equation model used to extract a latent common factor from the residuals ofPoisson regressions that control for time and industry effects.
Figure 5: Empirical distribution of the Bibliographic Composite Index; the box in the top-right of thefigure reports the upper-tail of the distribution for visual clarity.
26
Figure 6: Frequency of years characterized by a certain number of macroinventions, actual vs predictedby the Poisson model.
Note: the unit of observation is the year and the graph shows the frequency of years with zero to three macroinventions.The Poisson model is estimated using a quadratic time trend.
Figure 7: Number of micro- and macroinventions per year
Note: dots plot the yearly number of macroinventions (patents in the 99.5th percentile of quality) while the line showsthe number of microinventions patented each year.
27
(a) All patents (b) Textile sector
(c) Engine sector (d) Machines
Figure 8: Lorenz curves of microinventions vs macroinvention shares over time.
Note: patents related to engine and textile sectors are taken from the classification of Nuvolari and Tartari (2011);machines are identified from the title of the patent in Woodcroft (1854).
Table 1: Summary of the sources consulted to construct the variables on Patent and Inventor Eminence
Patent Eminence Inventor Eminence
Source Inventors Patents Source Inventors Patents
Baker (1976) 123 150 Oxford DNB 291 893Carter (1978) 201 266 Allen (2009) 76 234Desmond (1987) 128 157 Day and McNeil (1996) 240 708Inkster (1991) 27 44 Abbott (1985) 57 246Dudley (2012) 33 55 Murray (2003) 54 199Challoner (2009) 41 49 De Galiana (1996) 102 333Bridgman (2002) 33 38 Mokyr and Meisenzhal (2010) 536 1519Bunch and Hellemans (2004) 71 93 Benson (2012) 59 206Ochoa and Corey (1997) 23 24 Gergaud et al (2016) 179 595Lilley (1948) 28 33
Note: This table reports the number of patents and inventors mentioned in each source. The left side pertains sources grouped into theindicator of Patent Eminence, while on the right side there are those concerning Inventor Eminence.
28
Serendipity
Investmentsin R&D
Low MicroinventionsMacroinventions
(Allen, 2009, 2018)
High
Macroinventions
(Mokyr, 1990, 2010)
Low
HighMacroinventions
(our interpretation)
Figure 9: Macro- and microinventions: a suggested interpretation
Table 2: Spearman’s rank correlation coefficients of the raw quality indicators
Woodcroft Patent Eminence Inventor Eminence
Woodcroft 1Patent Eminence 0.0710*** 1Inventor Eminence 0.0645*** 0.3001*** 1
Note: *** denotes significance at 0.1% level.
Table 3: Comparison of references for Kay and Hulls’ patents
Patent N° Year Inventor Invention Woodcroft References Patent Eminence Inventor Eminence
542 1736 John Kay Flying shuttle 1 10 8556 1736 Jonathan Hulls Steam-propelled ship 9 0 5
Table 4: Comparison of references for two of Arkwright’s patents
Patent N° Year Invention Woodcroft References Patent Eminence Inventor Eminence Patent case
931 1769 Water frame 3 10 9 01111 1775 Carding machine 15 3 9 1
29
Table 5: Factor loadings of the Bibliographic Composite Index (BCI) resulting from the SEM estima-tion
Residuals WRI Residuals PAT EM Residuals INV EM
λ 1 1.1746*** 1.8698***- (0.1401) (0.2619)
Note: *** denotes significance at 0.1% level. λk are the factor loadings on thecommon factor q, representing the BCI. Standardized root mean squared resid-ual= 0.000; Coefficient of determination= 0.698.
Table 6: Fligner-Policello tests of stochastic equality
Extended to Scotland Extended to all UK Time Extension Litigated Patents
Entire sample (1700-1850)Fligner-Policello statistics 17.166*** 11.072*** 15.292*** 35.430***Year>1734Fligner-Policello statistics 16.910*** 10.905*** 16.539*** 35.310***Year>1778Fligner-Policello statistics 14.503*** 9.267*** 19.045*** 34.158***
Note: *** denotes significance at 0.1% level. The Fligner-Policello test determines whether for two random variables X and Y it is statisticallysignificant that Prob[X > Y ] > 0.5. The test resembles the widely used Mann-Whitney-Wilcoxon test of median equality, but entails less restrictivehypotheses on variance and shape of the distributions. In all cases, the null hypothesis of stochastic equality is rejected at a high significance level.Data for geographical coverage are taken from Bottomley (2014a) (3504 patents extended to Scotland and 1247 extended to the entire UnitedKingdom), while the lists of patents that were litigated (355 cases) and for which a time extension was petitioned (95) are taken from Woodcroft(1862). All the results hold if we employ Mann-Whitney-Wilcoxon median test.
Table 7: Fligner-Policello tests of stochastic equality, comparison between WRI* and the BibliographicComposite Index
Perpetual Motion “Impossible” Engines
BCI WRI* BCI WRI*
Entire sample (1700-1850)Fligner-Policello statistics -5.062*** -0.887 -2.765** 1.822Year>1734Fligner-Policello statistics -5.088*** -0.890 -2.808** 1.793Year>1778Fligner-Policello statistics -5.305*** -0.857 -3.200** 1.685
Note: *,**,*** denote significance at 5%, 1% and 0.1% level. Data for perpetual motionmachines are taken from Dircks (1861) (23 patents), while the lists of 83 engines that werenot technically feasible is the same employed by MacLeod et al. (2003). A negative signof the Fligner-Policello statistics indicates that patents in the list considered are of loweraverage value than the excluded remainder. All the results hold if we employ Mann-Whitney-Wilcoxon median test.
Table 8: Selection of very important patents for which the Bibliographic Composite Index addresseslimitations of Nuvolari and Tartari’s WRI*
Patent N° Inventor Invention N°Woodcroft Refs WRI* Percentile WRI* BCI Percentile BCI
542 John Kay Flying shuttle 1 0.578 20 5.006 99.5550 John Hadley Octant 1 0.578 20 2.783 99.5962 James Hargreaves Spinning jenny 2 1.140 68 5.221 99.51063 John Wilkinson Boring machine 2 1.165 69 4.700 99.51351 Henry Cort Rolling of metals 2 1.072 67 4.525 99.5
30
Table 9: Regression results, Poisson and negative binomial models with arrival rate for macroinventionsas a function of time.
Model Patents c β1 β2 β3 α LR test logL Wald test Pseudo R2 Q test
Poisson Top 0.5% -0.8429*** -131.402 50.936***(0.1319)
Neg Bin Top 0.5% -0.84292*** 0.3107 NOT reject -130.869 50.936***(0.1321)
Poisson Top 0.5% -1.809*** 0.011*** -124.187 19.13*** 0.055 30.1501*(0.2879) (0.0026)
Neg Bin Top 0.5% -1.8285*** 0.0114*** 0.1280 NOT reject -124.071 13.60*** 0.052 30.1211*(0.3307) (0.0032)
Poisson Top 0.5% -3.689*** 0.064** -0.030**a -118.626 14.07*** 0.097 23.0980(0.8409) (0.0193) (0.0104)a
Neg Bin Top 0.5% -3.689*** 0.064** -0.030**a 0.0048c NOT reject -118.626 24.49*** 0.094 23.0985(0.8013) (0.0185) (0.0101)a
Poisson Top 0.5% -3.045* 0.0312 0.0144a -0.0178c -118.381 21.08*** 0.099 25.8504(1.1938) (0.0505) (0.0628)a (0.0024)b
Neg Bin Top 0.5% -3.045** 0.0312 0.0143a -0.0179c 0.0001a NOT reject -118.381 24.98*** 0.095 25.8504(1.129) (0.0485) (0.0633)a (0.0025)b
Note: *,**,*** denote significance at 5%, 1% and 0.1% level. c, β1, β2 and β3 are the coefficients on the constant and the polynomials of time (first, second and thirddegree, respectively). Estimated coefficients are sometimes multiplied by the following factors: a=100, b=1000, c=10000. α is the parameter for overdispersion in thenegative binomial model for which a likelihood-ratio test (LR test) of H0 : α = 0 (i.e. no overdispersion) is carried out. The last column give the Box-Ljung Q statisticson the standardized residuals of H0: no time autocorrelation. In this case, a significant value of the test statistics means that we reject H0. Following Silverberg andVerspagen (2003), we set k = 20 (see Appendix C). The period considered is 1700-1850 (151 observations).
Table 10: Regression results, Poisson and negative binomial models with arrival rate for microinven-tions as a function of time.
Model Patents c β1 β2 β3 α LR test logL Wald test Pseudo R2 Q test
Poisson All -4.4608*** -10950.859 1091.1466***(0.1211)
Neg Bin All 4.461*** 1.827 reject -803.643 1091.1466***(0.1103)
Poisson All 0.4222*** 0.038*** -824.490 1993.45*** 0.9247 159.5699***(0.0957) (0.0009)
Neg Bin All 0.641*** 0.036*** 0.0585 reject -572.144 463.00*** 0.2881 193.2231***(0.0724) (0.0006)
Poisson All 1.127*** 0.023*** 0.073***b -789.415 3047.81*** 0.9279 122.4661***(0.1468) (0.0034) (0.0018)a
Neg Bin All 0.851*** 0.030*** 0.034*b 0.0565 reject -570.130 467.03*** 0.2906 146.7201***(0.1249) (0.0030) (0.0016)a
Poisson All 0.310 0.059*** -0.037**a 0.016**c -765.420 2777.19*** 0.9301 92.4250***(0.2766) (0.0114) (0.0001) (0.0054)c
Neg Bin All 0.795*** 0.033*** -0.001a 0.0018c 0.0559 reject -570.047 467.19*** 0.2907 135.6694***(0.1875) (0.0086) (0.0115)a (0.0045)c
Note: *,**,*** denote significance at 5%, 1% and 0.1% level. c, β1, β2 and β3 are the coefficients on the constant and the polynomials of time (first, second and thirddegree, respectively). Estimated coefficients are sometimes multiplied by the following factors: a=100, b=1000, c=10000. α is the parameter for overdispersion in thenegative binomial model for which a likelihood-ratio test (LR test) of H0 : α = 0 (i.e. no overdispersion) is carried out. The last column give the Box-Ljung Q statisticson the standardized residuals of H0: no time autocorrelation. In this case, a significant value of the test statistics means that we reject H0. Following Silverberg andVerspagen (2003), we set k = 20 (see Appendix C). The period considered is 1700-1850 (151 observations).
Table 11: Examples of stated aims of invention for three macroinventions.
Patent N° Year Inventor Invention Excerpt from Woodcroft (1854) Stated aims
962 1770 James Hargreaves Spinning jenny
“[. . . ] making an engine [. . . ] to be managedby one person only, which will spin, draw, andtwist 16 or more threads at a time by a motionof one hand and a draw of the other”
Save labour;save time
1420 1784 Henry Cort Puddling process
“[. . . ] manufacturing iron and steel into bars[. . . ] of purer quality, in larger quantity, by amore effectual application of fire and machinery,and with greater yield”
Save capital andraw materials;improve quality
1645 1788 Andrew Meikle Threshing machine“[. . . ] the corn is thereby separated from thestraw in less time, and in more effectual mannerthan by threshing or any other manner”
Save time;improve quality
Note: Data are taken from Woodcroft (1854) and stated aims are classified using the methodology of MacLeod (1988).
31
Table 12: Patentees’ stated aims of invention, 1700-1799.
Stated aim Top 0.5% Top 1% Top 2% All patents
Create employment 0 1.7 1.2 1.9Improve working conditions 0 0 2.3 1.4Save labour 2.9 3.4 4.7 4.2Save time 11.8 8.5 7 5.2Save capital and raw materials 8.8 5.1 7 30.8Reduce consumer price 5.9 5.1 3.5 3.7Improve quality 32.4 27.1 25.6 29.3Import substitution 0 1.7 1.2 3.6Government revenue 0 0 0 1Other government benefits 5.9 3.4 2.3 2.1
Note: Columns 2, 3 and 4 report the share of patents in that percentile of quality that mention each of the listedaims of invention. Figures are expressed as a percentage of the 34, 59 and 86 patents respectively granted formacroinventions in the period 1700-1799 (see text for details). The last column is taken from MacLeod (1988),Table 9.1 p. 160, who considered 2240 patents in the period from 1660 to 1799. This means that unfortunatelythe data are not strictly comparable, but given the low number of patents granted before 1700 (on average, lessthan four per year) and that the only major macroinvention that we excluding is Thomas Savery’s steam engineof 1698, the comparison presented remains informative.
Table 13: Patents for inventions intended to save labour, 1700-1799.
Patent aim Top 0.5% Top 1% Top 2% All patents
Labour-saving stated 2.9 3.4 4.7 3.9Effectively labour-saving 38.2 38.9 38.4 15.3
Note: The last column is taken from MacLeod (1988), Table 9.2 p. 170. Unfortunately, the data are notstrictly comparable because MacLeod considered the entire period from 1660 to 1799 (see the note to Table12). The methodology used to find patents covering inventions effectively labour saving is described in thetext and is the same of MacLeod (1988, pp. 170 and 257).
Table 14: The incidence of “outsiders” in macroinventions
Including Cartwright Excluding Cartwright
1700-1850 1760-1850 1700-1850 1760-1850
All patents 17.4% 17.4% 17.3% 17.3%Top 0.5% 24.6% 28.6% 19.7% 23.1%Top 1% 22.1% 24.2% 17.1% 18.8%
Note: the variable has been constructed in such a way to consider only the casesin which the invention was clearly not connected with the occupation of thepatentee. When this dummy variable takes a value of 0 this does not mean thatthe inventor in question is an insider; this is also the case for all those inventorslisted as “esquire”, “gentleman” or “baronet”. We also excluded from the countof outsiders patent agents and inventions imported from abroad, thus we shouldconsider these ratios as very conservative estimates.
32
Table 15: Number of patents covering inventions in machinery and their share granted to users ormakers.
Machines Users Makers Others
Period considered: 1700-1850
Top 0.5% 30 (46.2%) 3.3% 63.3% 33.3%Top 1% 64 (48.9%) 14.1% 54.7% 31.3%
Period considered: 1780-1850
Top 0.5% 22 (47.8%) 0% 63.6% 36.4%Top 1% 54 (50.5%) 11.1% 55.5% 33.3%All patents 2649 (21.7%) 40.5% 26.8% 32.7%
Note: the first column displays the total number of machinery patentsat different percentiles of patent quality, and in parentheses their shareover the total. The remaining columns are the shares of the machinerypatents of the first column that were assigned to users or makers (thusthey sum to 100%). The figures for the last row are taken from MacLeodand Nuvolari (2009), and are available only for the period from 1780 to1850.
33
A Appendix: Sources used for constructing the patent quality in-
dicator.
Sources used for the Patent Eminence (PAT EM) indicator:
1. Baker, R. (1976): New and Improved... Inventors and Inventions that Have Changed the Modern
World, London: British Library.
2. Carter, E. F. (1969): Dictionary of Inventions and Discoveries, London: F. Muller.
3. Desmond, K. (1987): The Harwin chronology of inventions, innovations, discoveries: From pre-
history to the present day, London: Constable.
4. Inkster, I. (1991): Science and technology in history: an approach to industrialisation, London:
Macmillan.
5. Bridgman, R. (2014): 1000 inventions and discoveries, New York: Dorling Kindersley Ltd.
6. Bunch, B. H. and A. Hellemans (2004): The History of Science and Technology, New York:
Houghton Mifflin.
7. Ochoa, G. and M. Corey (1997): The Wilson chronology of science and technology, New York:
HW Wilson.
8. Dudley, L. (2012): Mothers of innovation: How expanding social networks gave birth to the
Industrial Revolution, Newcastle upon Tyne: Cambridge Scholars Publishing.
9. Lilley, S. (1948): Men, machines and history: a short history of tools and machines in relation
to social progress, London: Cobbett Press.
10. Challoner, J. (2016): 1001 inventions that changed the world, Sydney: Pier 9.
Sources used for the Inventor Eminence (INV EM) indicator:
1. Matthew H. and B. Harrison (2004): Oxford Dictionary of National Biography, Oxford: Oxford
University Press (www.oxforddnb.com).
2. Allen, R. (2009): The British Industrial Revolution in Global Perspective, Cambridge: Cam-
bridge University Press.
34
3. Day, L. and I. McNeil (1996): Biographical dictionary of the history of technology, London:
Routledge.
4. Abbott, D. (1985): The Biographical Dictionary of Scientists, Engineers and Inventors, London:
F. Muller.
5. Murray, C. (2003): Human accomplishment: The pursuit of excellence in the arts and sciences,
800 BC to 1950, London: Harper Collins.
6. Benson, A. K. (2012): Inventors and inventions. Great lives from history, Pasadena: Salem
Press.
7. De Galiana, T. and M. Rival (1996): Dictionnaire des inventeurs et inventions, Paris: Larousse.
8. Meisenzahl, R. R. and J. Mokyr (2011): “The rate and direction of invention in the British
Industrial Revolution: Incentives and institutions,” in The rate and direction of inventive activity
revisited, ed. by J. Lerner and S. Stern, Chicago: University of Chicago Press, pp. 443-479.
9. Gergaud, O., M. Laouenan, and E. Wasmer (2016): “A Brief History of Human Time. Exploring
a database of ‘notable people’,” LIEPP Working Paper, Sciences Po.
The following tables show the highest ranking patents and inventors according to Patent Eminence
and Inventor Eminence indicators. Next, we show the relative overlapping between patents and inven-
tors mentioned in the sources we considered. Finally, in Figure 10 we plot the empirical distribution
of the resulting indicators.
Table 16: Patents achieving the highest scores of Patent Eminence
Patent N° Year Inventor Invention Patent Eminence
542 1733 John Kay Flying shuttle 10913 1769 James Watt Separate condenser 10931 1769 Richard Arkwright Water frame 10962 1770 James Hargreaves Spinning jenny 107390 1837 Charles Wheatstone Telegraph 101063 1774 John Wilkinson Boring machine 91351 1783 Henry Cort Rolling of metals 91470 1785 Edmund Cartwright Power loom 92599 1802 Andrew Vivian, Richard Trevithick High pressure steam engine 91298 1781 Jonathan Hornblower Compound steam engine 81565 1786 Edmund Cartwright Power loom 81645 1788 Andrew Meikle Threshing machine 82045 1795 Joseph Bramah Bramah’s lock 89382 1842 James Nasmyth Steam hammer 8
35
Table 17: Inventors achieving the highest score of Inventor Eminence
Inventor Inventor Eminence
Andrew Vivian 9Edmund Cartwright 9Henry Bessemer 9Henry Maudslay 9James Hargreaves 9James Nasmyth 9James Watt 9John Kay 9Richard Arkwright 9Richard Trevithick 9Thomas Savery 9William Murdock 9
Table 18: Overlap between the sources used for Patent Eminence
Source (1) (2) (3) (4) (5) (6) (7) (8) (9) (10)
(1) Baker (1976) 150(2) Carter (1978) 48 266(3) Desmond (1987) 45 68 157(4) Inkster (1991) 21 29 20 44(5) Dudley (2012) 29 37 26 27 55(6) Challoner (2009) 31 28 29 14 20 49(7) Bridgman (2002) 22 26 24 16 18 18 38(8) Bunch and Hellemans (2004) 39 52 31 19 27 23 23 93(9) Ochoa and Corey (1997) 16 15 17 12 13 10 11 15 24(10) Lilley (1948) 21 24 17 21 21 14 15 17 12 33
Note: This table shows the number of patents cited in every sources along with the number of these that are alsomentioned in each of the other sources used. The diagonal cells contain the total number of patents in each of theselists, while cells outside the diagonal show the number of patents mentioned simultaneously in both sources.
(a) Patent Eminence (b) Inventor Eminence
Figure 10: Empirical distributions of the quality proxies Patent and Inventor Eminence
36
Table 19: Overlap between the sources used for Inventor Eminence
Source (1) (2) (3) (4) (5) (6) (7) (8) (9)
(1) Oxford DNB 292(2) Allen (2009) 45 77(3) Day and McNeil (1996) 105 50 241(4) Abbott (1985) 41 29 48 58(5) Murray (2003) 32 29 35 28 55(6) De Galiana (1996) 60 36 66 40 35 103(7) Mokyr and Meisenzhal (2010) 153 55 178 45 39 75 538(8) Benson (2012) 38 28 38 26 27 37 45 60(9) Gergaud et al (2016) 86 22 66 29 25 45 84 36 135
Note: This table shows the number of inventors cited in every sources along with the number of these thatare also mentioned in each of the other sources used. The diagonal cells contain the total number of inventorsin each of these lists, while cells outside the diagonal show the number of inventors mentioned simultaneouslyin both sources.
Table 20: Overlap between Top 0.5% patents when changing the time and industry controls employedin Poisson regression.
(1) (2) (3) (4) (5) (6)
(1) 65(2) 63 65(3) 62 63 65(4) 63 64 62 65(5) 62 63 62 63 65(6) 62 63 62 63 63 65
Note: This table shows the number oftop 0.5% patents (65 patents) that over-lap when the Bibliographic Composite In-dex is constructed using residuals of the rawproxies coming from different sets of regres-sions. In particular: (1) preferred specifica-tion, controls for time decade and indus-try (2) control for time windows of 50 yearsand industry (3) control for time windowsof 25 years and industry (4) control for timedecades only (5) control for industry only(6) no controls at all.
37
Table 21: Descriptive statistics of quality indicators, detailed by sector of economic activity as defined by Nuvolari and Tartari (2011)
Industry Patents Woodcroft Reference Index Patent Eminence Inventor Eminence
Mean Median Std Dev Min Max Mean Median Std Dev Min Max Mean Median Std Dev Min Max
Agriculture 432 2.5717 2 1.3433 1 7 0.0856 0 0.5655 0 8 0.2152 0 0.8300 0 7Carriages 812 2.8140 2 1.6593 1 15 0.0615 0 0.3384 0 4 0.3645 0 1.1752 0 9Chemicals 1118 2.9758 3 1.6713 1 19 0.0286 0 0.2009 0 2 0.2504 0 0.9759 0 9Clothing 322 2.3074 2 1.3814 1 13 0.0465 0 0.3879 0 6 0.2732 0 0.9952 0 6Construction 640 2.8687 3 1.6238 1 16 0.025 0 0.2078 0 3 0.3078 0 1.1135 0 9Engines 1637 2.7874 3 1.5135 1 21 0.0989 0 0.6136 0 10 0.5534 0 1.5464 0 9Food 716 2.6955 2 1.6118 1 17 0.0488 0 0.3873 0 7 0.1955 0 0.8743 0 9Furniture 659 2.4962 2 1.5021 1 18 0.0515 0 0.3313 0 4 0.1638 0 0.8124 0 9Glass 123 2.8130 2 1.5436 1 9 0.0569 0 0.3213 0 3 0.5934 0 1.7547 0 9Hardware 834 2.6163 2 1.5798 1 13 0.0611 0 0.3948 0 7 0.2170 0 0.8385 0 8Instruments 598 2.5953 2 1.4642 1 13 0.1371 0 0.6833 0 10 0.5083 0 1.3815 0 8Leather 218 2.6559 2 1.3799 1 9 0.0137 0 0.1511 0 2 0.1605 0 0.7840 0 6Manufacturing 685 2.6087 2 1.6064 1 16 0.0701 0 0.3797 0 4 0.2919 0 1.0328 0 8Medicines 288 2.1527 2 1.1404 1 10 0.0243 0 0.1754 0 2 0.1423 0 0.6443 0 7Metallurgy 682 3.1568 3 1.9808 1 23 0.1114 0 0.6520 0 9 0.6436 0 1.6546 0 9Military 252 2.4603 2 1.2944 1 11 0.1111 0 0.7221 0 9 0.4246 0 1.2264 0 7Mining 81 2.9876 3 1.9202 1 14 0.0987 0 0.5149 0 4 0.4691 0 1.0849 0 5Paper 480 2.9041 3 1.6648 1 14 0.1 0 0.4266 0 4 0.5812 0 1.3683 0 9Pottery 277 2.8483 3 1.5738 1 12 0.0649 0 0.4030 0 4 0.2454 0 0.9465 0 9Ships 590 2.8932 3 1.8280 1 17 0.0355 0 0.3302 0 7 0.3067 0 0.9935 0 9Textiles 1626 2.5645 2 1.6636 1 19 0.0805 0 0.6451 0 10 0.5405 0 1.3496 0 9
Total sample 13070 2.7223 2 1.6161 1 23 0.0695 0 0.4797 0 10 0.3774 0 1.2031 0 9
38
B Appendix: Ranking of Macroinventions (Top 0.5% Patents) ac-
cording to the Bigliographic Composite Index
Rank Patent number Year Patentee Invention
1 913 1769 James Watt Separate condenser2 7390 1837 Charles Wheatstone Telegraph3 931 1769 Richard Arkwright Water frame4 962 1770 James Hargreaves Spinning jenny5 542 1733 John Kay Flying shuttle6 2599 1802 Andrew Vivian, Richard Trevithick High pressure steam engine7 1470 1785 Edmund Cartwright Power loom8 1063 1774 John Wilkinson Boring machine9 1351 1783 Henry Cort Rolling of metals10 9382 1842 James Nasmyth Steam hammer11 2045 1795 Joseph Bramah Hydraulic press12 1565 1786 Edmund Cartwright Power loom13 1645 1788 Andrew Meikle Threshing machine14 1298 1781 Jonathan Hornblower Compound steam engine15 1876 1792 Edmund Cartwright Wool-combing machine16 1430 1784 Joseph Bramah Bramah’s lock17 5701 1828 James Beaumont Neilson Hot blast furnace18 7104 1836 Francis Pettit Smith Screw propeller19 3372 1810 Peter Durand Tin cans20 8842 1841 William Henry Fox Talbot Calotype21 3887 1815 George Stephenson Locomotive22 4804 1823 Charles MacIntosh Macintosh waterproof cloth23 1321 1782 James Watt Double acting steam engine24 2772 1804 Arthur Woolf Improvements in steam engines25 5990 1830 Edwin Budding Lawnmower26 550 1734 John Hadley Octant27 1306 1781 James Watt Rotary crank28 4136 1817 David Brewster Kaleidoscope29 4081 1816 Robert Stirling Stirling air engine30 1420 1784 Henry Cort Iron puddling31 6909 1835 Samuel Colt Revolving firearm32 722 1758 Jedediah Strutt Stocking rib33 380 1707 Abraham Darby Iron casting34 4067 1816 George Stephenson Half-lap joint for railways35 562 1738 Lewis Paul Spinning machine36 2196 1797 Joseph Bramah Beer pump37 6159 1831 William Bickford Safety fuse38 5803 1829 Charles Wheatstone Concertina39 2708 1803 John Gamble Paper making machine (Foudrinier)40 5949 1830 Richard Roberts Self-acting mule41 636 1748 Lewis Paul Spinning machine42 939 1769 Josiah Wedgwood New method for decorating earthenware43 1111 1775 Richard Arkwright Carding machine44 6733 1834 Joseph Hansom Hansom cab45 1105 1775 Alexander Cumming Flush toilet46 5022 1824 Joseph Apsdin Portland cement47 1177 1778 Joseph Bramah Watercloset48 2202 1797 Edmund Cartwright Steam engine49 6014 1830 Andrew Ure Thermostat50 395 1714 Henry Mill Typewriter51 3611 1812 Joseph Bramah High-pressure hydraulic mains52 3105 1808 William Newberry Scroll bandsaw53 2652 1802 Joseph Bramah Making gun stocks54 6675 1834 Henry Shrapnel Fire-arms55 5138 1825 Richard Roberts Self-acting mule56 721 1758 John Dollond Lenses for telescopes57 8447 1840 George Richards Elkington Electroplatingprocess.58 1478 1785 Joseph Bramah Screw propeller59 896 1768 Andrew Meikle Machine for dressing grain60 1112 1775 Jesse Ramsden Astronomic telescope61 734 1759 Jedediah Strutt Derby patent rib machine62 10990 1845 Robert William Thomson Carriage wheel (pneumatic tyre)63 3032 1807 Alexander John Forsyth Fulminate-primed gun firing mechanism64 3041 1807 William Cubitt Self-regulating windmill sails65 1833 1791 John Barber Gas turbine
39
C Appendix: Testing the Differences between Micro- and Macroin-
ventions
The count nature of patent data requires the adoption of ad hoc statistical methods. A commonly
used way to deal with this kind of data is given by the Poisson process, with probability mass function
given by:
Prob(Y = y|µ) =e−µµy
y!(1)
where y ∈ N and µ is the rate parameter (i.e. the arrival rate of the Poisson process). The first two
moments of the Poisson are exactly equal to the rate: E(Y ) = V ar(Y ) = µ. This shows the equality
of mean and variance, the well-known equidispersion property of the Poisson distribution (Cameron
and Trivedi, 1998).
The parameter µ can be set as a function of a vector of independent variables x, for instance
µ = ex′β. In this way, one derives the Poisson regression model which uses the exponential mean
parametrization to ensure that µ > 0. Following Silverberg and Verspagen (2003), we estimated
ln(µ) = c+ β1t+ β2t2 + β3t
3, where t is a time trend. This approach allows us to test the hypothesis
that the Poisson process is time-homogeneous by imposing β = 0 (i.e. all its element equal to zero,
β1 = β2 = β3 = 0), and then gradually inserting the higher-order time trends. This is done starting
from the first rows of Table 9 and 10, where the rate of the Poisson is fixed equal to the constant c
(Silverberg and Verspagen, 2003), and gradually inserting time trends in the subsequent rows.
The Poisson regression model is usually too restrictive for count data since the assumption of
equidispersion is often rejected in practice. A simple adjustment that leads to a more flexible model
may be obtained by adding an unobserved random effect υ to the mean of the Poisson distribution,
hence y ∼ Poisson(y|µυ). It is easy to show that the addition of υ allows to model overdispersion,
that is V ar(Y |x) > E(Y |x). In the special case in which υ is gamma distributed, υ ∼ Gamma(1, α),
one obtains the negative binomial distribution whose probability mass function is:
Prob(Y = y|µ, υ) =Γ(α−1 + y)
Γ(α−1)Γ(y + 1)
(α−1
α−1 + µ
)α−1 (µ
α−1 + µ
)y(2)
Where Γ(.) specifies the gamma integral and α is the variance parameter of the distribution
(Cameron and Trivedi, 1998). A test of the Poisson against the negative binomial distribution can be
implemented by means of a Likelihood Ratio test of the null hypothesis α = 0.
40
Beside overdispersion, we also analysed the correlation structure of the residuals. Raw residuals
from Poisson regression are inherently nonstationary (Cameron and Trivedi, 1998), so they need to
be standardized before performing the test of serial correlation. This problem can be avoided by
employing the standardised residuals: zt = yt−mt√σt
where yt is the observed value, mt is the residual
from a regression model such as Poisson, and σt is equal to the sample variance. If zt is standardized
to have constant variance, at least asymptotically, we can apply the Box-Ljung statistics to test the
null hypothesis that all autocorrelations of the residuals up to lag k are zero.
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