multiparticle production processes from the information theory point of view grzegorz wilk
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Multiparticle production processes from the Information Theory point of view Grzegorz Wilk The Andrzej So ł tan Institute for Nuclear Studies Warsaw, Poland. Content:. (*) Why and When of information theory in - PowerPoint PPT PresentationTRANSCRIPT
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Multiparticle production processesfrom the
Information Theory point of view
Grzegorz WilkThe Andrzej Sołtan Institute for Nuclear Studies
Warsaw, Poland
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Content:
(*) Why and When of information theory in multiparticle production
(*) How to use it: - ”extensively” - ”nonextensively” (*) Examples of applications to p p, AA, e +e -
collisions
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Why and When of information theory in multiparticle production
New experimental results
Model I.................
Model II
Model III
Model IV
Model V
... all models are”good”... ...which is the ”correct one”?...
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The Truth
is
here !
- to some extend –
..........................
All of them!
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(*) To quantify this problem one uses notion of
information
(*) and resorts to
information theory
based on Shannon information entropy
S = - pi ln pi
where {pi} denotes probability distribution of quantity of
interest
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This probability distribution must satisfy the following:
(*) to be normalized to unity: pi =1
(*) to reproduce results of experiment: pi Rk(xi ) =<Rk>
(*) to maximize (under the above constraints) information
entropy
pi = exp[ - ∑k•Rk(xi)]
with k uniquely given by the experimental constraint equations
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The Truth
is
here !
pi = exp[ - ∑k• Rk(xi) ]
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pi = exp[ - ∑k• Rk(xi )]
This is distribution which:
(*) tells us ”the truth, the whole truth” about our experiment,
i.e., it reproduces known information
(*) tells us ”nothing but the truth” about our experiment,
i.e., it conveys the least information (= only those which
is given in this experiment, nothing else)
it contains maximum missing information
G.Wilk, Z.Włodarczyk, Phys. Rev. 43 (1991) 794
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pi = exp[ - ∑k• Rk(xi )]
If some new data occur and they
turn out to disagree with
it means that there is more information
which must be accounted for :
(a) either by some new λ= λk+1
(b) or by recognizing that system is
nonextensive and needs a new
form of exp(...) → expq(...)
(c) or both ...........
Notice:
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Some examples
(*) Knowledge of only <n> the most probable P(n) is:
and that particles are:
distinguishable geometrical (Bose-Einstein)
nondistinguishable Poissonian
coming from k
independent, equally
strongly emitting sources Negative Binomial
(*) Knowledge of <n> the most probable P(n) is
and <n2> Gaussian
Additional information converts the resultant P(n) from the most broad
to the most narrow : geometrical (D≈<n>) Poissonian (D≈√<n>)
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Example (from Y.-A. Chao, Nucl. Phys. B40 (1972) 475)
Question: what have in common such successful models as:
(*) multi-Regge model
(*) uncorrelated jet model
(*) thermodynamical model
(*) hydrodynamical model
(*) ..................................
Answer: they all share common (explicite or implicite) dynamical
assumptions that:
(*) only part of initial energy of reaction is used for production
of particles ↔ existence of inelasticity of reaction, K~0.5
(*) transverse momenta of produced secondaries are cut-off ↔
dominance of the longitudinal phase-space
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Suppose we hadronize mass M into N secondaries with
mean transverese mass μT each in longitudinal phase space:
pd
Edpd
Ndy
dN
Nyf
T
N
N 3
211)(
(*) we are looking for
)(ln)( yfyfdySNN
Y
Y
M
M
(*) by maximizing
1)(
yfdyN
MY
MY
N
MyfydyyfEdy
NTN
MY
MY
MY
MY
)()cosh()(
2/1
2
2
'
411
2
'ln
M
MY T
T
M
(*) under conditions:
where
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yZ
yfTN
coshexp1
)(
As most probable distribution we get
where ydyNMZZTT
MY
MY
coshexp),,(
and β=β(M;N,μT) is obtained by solving equation:
0)cosh(exp)cosh(0
y
N
Mydy
T
T
MY
Notice: Z and β are not free parameters, therefore this is
not a thermal model!
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From: G.Wilk, Z.Włodarczyk, Phys. Rev. 43 (1991) 794
(*) for N→2 one has β→- ∞ and f(y)=(1/2)[ δ(y-YM)+δ(y+YM) ]
(*) for N=N0=N0(M;N,μT) ≈ 2 ln[M/μT] = 2ln(Nmax) one has β=0 and f(y) = const
(*) for N>N0 one has β>0 and
E
y
Zyf T
N
)cosh(exp
1)(
Scaling !
(*) for N → Nmax one has β → (3/2μT)[1/(1-N/Nmax)] and f(y) → δ(y)
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0-YMYM
-
+
-
= 0
= 0
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0-YMYM
-
+
-
= 0
= 0
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(*) Fact: In multiparticle production processes many observables follow simple exponential form:
f(X) exp[ - X/ ] ”thermodynamics” (i.e., T)? (*) Reason: because:
in an event many particles are produced but only a part of them is registered out of which usually only one is analysed (inclusive distributions of many sorts...)
the rest acts therefore as a kind of heat bath
Other point of view .........
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h
Heat bath
T
N-particle system
N-1 particle ”heath bath”
and 1 observed particle
L.Van Hove, Z.Phys. C21 (1985) 93, Z.Phys. C27 (1985) 135.
T
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(*) Nonextensivity – what it is and why to bother about it ...more...
However, in real life:
(*) in ”thermodynamical” approach :
one has to remember tacit assumptions of infinity and homogenity concerning introduction of the ”heath bath” concept, otherwise it will not be characterised by only one parameter - the ”temperature” T
(*) in information theory approach :
one has to remember that there are other measures of information (other entropy functionals) possible
(*) in both cases it means departure from the simple exponential form as given above
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(*) Nonextensivity – its possible origins .... ”thermodynamics”
T6
T4T2
T3T1
T5
T7
Tk
h
T varies
fluctuations...
T0=<T>, q
q - measure of fluctuations
Heat bathT0, q
T0=<T>
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(*) Nonextensivity – its possible origins .... information theory approach
... Other measures of information possible in addition to Shannon entropy accounting for some features of the physical systems, like:(*) existence of long range correlations(*) memory effect(*) fractality of the available phase space(*) intrinsic fluctuations existing in the system(*)..... others ....In particular one can use Tsallis entropy
Sq = - (1-piq)/(1-q)
=> - pi ln pi (for q 1)
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(*) This leads to: Non Extensive Statistics
a
qa
qa
a p
pp~
aa
a
aa
a
Np~N
Ep~E
1q
p1S a
qa
(*) Tsallis entropy :
q-biased probabilities:
is nonextensive because
)B(S)A(S)1q()B(S)A(S)BA(S
q-biased averages:
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Historical example:
(*) observation of deviation from the expected exponential behaviour(*) successfully intrepreted (*) in terms of cross-section fluctuation:
(*) can be also fitted by:
(*) immediate conjecture: q fluctuations present in the system
Depth distributions of starting pointsof cascades in Pamir lead chamberCosmic ray experiment (WW, NPB (Proc.Suppl.) A75 (1999) 191
(*) WW, PRD50 (1994) 2318
2.02
22
3.1;)1(1
exp
1
1
qT
qconstdT
dN
Tconst
dT
dN
q
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Summarizing: ‘extensive’ ‘nonextensive’
0
expx
L
xx
L qq expexp0
2
22
1
11
11
q
where q measures amound of
fluctuations
and
<….> denotes averaging over
(Gamma) distribution in (1/λ)
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(*) Possible origin of q: fluctuations present in the system...final
(*) Where gamma function comes from? WW, PRL 84 (2000) 2770; Chaos,Solitons and Fractals 13/3 (2001) 581
(*) In general: Superstatistics (with other forms of function f) C.Beck, E.G.D. Cohen, Physica A322 (2003) 267
(*) Fluctuations of temperature: =T if we allow for energy dependent T=T(E) =T0+a(E-E0 ) with a=1/CV, then the equation on probability P(E) that a system A interacting with the heat bath A’ with temperature T has energy E changes in the following way (q=1+a):
q
T
EEqEP
EEaT
dEEPd
T
EEP
T
dEEPd
11
0
0
00
)1(1)()(
)](ln[
exp)()](ln[
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Some comments on T-fluctuations:
(*) Common expectation: slopes of pT distributions information on T
(*) Only true for q=1 case, otherwise it is <T>, |q-1| provides us additional information
(*) Example: |q-1|=0.015 T/T 0.12
(*) Important: these are fluctuations existing in small parts of the hadronic system with respect to the whole system rather than of the event-by-event type for which T/T =0.06/N 0 for large N
Utyuzh et al.. JP G26 (2000)L39
Such fluctuations are potentially very interesting because they provide a direct measure of the totalheat capacity of the system
11)(
2
2
qC
Prediction: C volume of reaction V, therefore q(hadronic)>>q(nuclear)
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Rapidity distributions:
qTqq
qTq
q
yqdyZ
yqZdy
dN
11
11
cosh)1(1
cosh)1(11
Features:(*) two parameters: q=1/Tq and q shape and height are strongly correlated(*) in usual application only =1/T - but in reality ()
1/Zq=1 is always used as another independent parameter height and shape are fitted independently(*) in q-approch they are correlated
() T.T.Chou, C.N.Yang, PRL 54 (1985)
510; PRD32 (1985) 1692
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q=1 q>1
NUWW PRD67 (2003) 114002
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q
ypydys
NE
s
NK
N
sypydy
yZdy
dN
Nyp
qmY
mY qTqq
qqq
qTmY
mY
Tqq
3)(cosh
)(cosh
coshexp11
)(
(*) Input: s, T, <Ncharged>(*) Fitted parameter: q, q-inelasticity q
(*) Inelasticity K:= fraction of the total energy s, which goes into observed secondaries produced in the central region of reactionvery important quantity in cosmic ray research and statistical models
NUWW PRD67 (2003) 114002
q
2
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NUWW PRD67 (2003) 114002
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NUWW PRD67 (2003) 114002
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NUWW PRD67 (2003) 114002
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(5)
Navarra et al.., NC 24C (2001)
))(,(;cosh)1(1)(
2
31
1
sNsyqZ
sN
dy
dNq
T
The only parameter here is q
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NUWW PRD67 (2003) 114002
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Possible meaning of parameter q in rapidity distributions
NUWW PRD67 (2003) 114002
(*) From fits to rapidity distribution data one gets systematically q>1 with some energy dependence (*) What is now behind this q?(*) y-distributions ‘partition temperature’ TK ·s/N(*) q fluctuating T fluctuating N
(*) Conjecture: q-1 should measure amount of fluctuation in P(N)(*) It does so, indeed, see Fig. where data on q obtained from fits are superimposed with fit to data on parameter k in Negative Binomial Distribution!
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Parameter q as measure of dynamical fluctuations in P(N)
(*) Experiment: P(N) is adequately described by NBD depending on <N> and k (k1) affecting its width:
(*) If 1/k is understood as measure of fluctuations of <N> then
with
(*) one expects: q=1+1/k what indeed is observed
NN
N
k
1)(12
2
nk
k
kkn
kn
nk
k
nn
n
nnndNP
1)()1(
)(
)(
)exp(
!
)exp()(
1
0
n
k 1)(
)(1
2
2
qn
nnD
k
(P.Carruthers,C.C.Shih,Int.J.Phys. A4 (1989)5587)
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Multiplicity Distributions: (UA5, DELPHI, NA35)
Kodama et al..
e+e-
90GeVDelphi
SS(central)200GeV
<n> = 21.1; 21.2; 20.8D2 = <n2>-<n>2 = 112.7; 41.4; 25.7 Deviation from Poisson: 1/k
1/k = [D2-<n>]/<n2> = 0.21; 0.045; 0.011
0 10 20 30 40 50 60n
0.0001
0.001
0.01
0.1
1
Pn
C harged Partic le M ultip lic ity D istribution
U A5 s1/2 = 200 G eV
Poisson(Boltzm ann)
UA5200GeV
0 10 20 30 40 50 60n
0.0001
0.001
0.01
0.1
1
10
100
Pn
(%)
C harged Partic le M ultip lic ity D istributionD elphi 90 G eV
Po isson(Boltzm ann)
0 10 20 30 40n
0.0001
0.001
0.01
0.1
Pn
N egative Partic le M ultip lic ity D istributionN A35 S+S (centra l) 200 G eV/A
Po isson(Boltzm ann)
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Recent example from AA -(1) (RWW, APP B35 (2004) 819)
Dependence of the NBD parameter 1/k onthe number of participants for NA49 andPHENIX data
With increasing centralityfluctuations of the multiplicitybecome weaker and the respective multiplicitydistributions approachPoissonian form. ???Perhaps: smaller NW smallervolume of interaction Vsmaller total heat capacity Cgreater q=1+1/C greater1/k = q-1
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Recent example from AA – (2) (RWW, APP B35 (2004) 819)
Dependence of the NBD parameter 1/k on the number of participants for NA49 and PHENIX data
In this case it can be shown that:
56.0/)(
/)(
33.0)1(
)1()()1()(1
22
22
2
2
EE
SSR
qR
qRNDqRN
ND
k
( Wróblewski law )
( for p/e=1/3)
q1.59 which apparently (over)saturates the limit imposed by Tsallis statistics: q1.5 . For q=1.5 one has: 0.33 0.28 (in WL) or 1/3 0.23 (in EoS)
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-2 0 20
20
40
60
80
100
120
140
160
NA49 plab
= 80 GeV
dN-/dy
y
Example of use of MaxEnt method
applied to some NA49 data for π –
production in PbPb collisions
(centrality 0-7%) - (I) :
(*) the values of parameters used:
q=1.164
K=0.3
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-2 0 20
20
40
60
80
100
120
140
160
180
200
NA49 plab
= 158 GeV
dN-/dy
y
Example of use of MaxEnt method
applied to some NA49 data for π –
production in PbPb collisions (centrality
0-7%) - (I) :
(*) the values of parameters used (red line)
q=1.2
K=0.33
(*) q=1, two sources of mass M=6.34 GeV located at |y|=0.83
this is example of adding new
dynamical assumption
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NUWW, Physica A340 (2004) 467
Transverse momentuspectra from UA1 withTT=1/βT and qT equal to:(0.134;1.095 ) for E=200 GeV(0.135;1.105) 540(0.14; 1.11) 900Notice: qT < qL
q≈qL
12
22
2
22
T
TT
T
TqTqq TLTTLL
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-7 -6 -5 -4 -3 -2 -1 0 1 2 3 4 5 6 70.0
0.5
1.0
1.5
2.0
2.5
3.0
3.5
4.0
y = 1.8q = 0.35
y = 0q=0.53
ALEPH91.2 GeV
dN c
h/dy
y
y = 0q=0.35
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M.Gaździcki et al.., Phys. Lett. B517 (2001) 250 : Power law in hadron production (I)
(a) (b)
(a) Mean multiplicity of neutral mesons (full dots) scaled to (m)=C·m –P and T spectra of 0
mesons (full triangles) scaled to (mT)=C·mT –P produced in pp interactions at s=30 GeV; different quarkonia spectra at s=1800GeV.
(b) The (mT)=C·mT –P spectra for pp at s=540 GeV (solid line, dashed line show the corresponding fits to the results at 30 GeV and 1800 GeV).
P=7.7 (for quarkonia at 1800 GeV) to 10.1 (for neutral mesons at 30 GeV). In all cases considered the values of the constant C were the same (important!).
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M.Gaździcki et al.., Phys. Lett. B517 (2001) 250 : Power law in hadron production (II)
(*) Authors: ‘...The Boltzmann function exp(-E/T) appearing in the standard statistical mechanics has to be substituted by a power-law function (-E/T)-P.’
(*) What does it mean? Our proposition: look at the nonextensive statistics where P1/(q-1) (or q1+1/P = 1.1 – 1.13) and treat this result as a new, strong imprint of nonextensivity present in multiparticle production processes.
(*) Can this result be explained in some dynamical way? Our answer: yes, provided we are willing to accept novel view of the hadron production process and treat it as formation of specific stochastic network (WW APPB 35(2004) 2141)
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Summary (I)
(*) In many places one observes simple “exponential” or
“exponential-like” behaviour of some selected distributions
(*) Usually regarded to signal some “thermal” behaviour they
can also be considered as arising because insufficient information
which given experiment is providing us with
(*) When treated by means of information theory methods (MaxEnt
approach) the resultant formula are formally identical with those
obtained by thermodynamical approach but their interpretation
is different and they are valid even for systems which cannot
be considered to be in thermal equilibrium.
(*) It means that statistical models based on this approach have
more general applicability then naively expected.
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Summary (II)
(*) Therefore: Statistical models of all kinds are widely used as source of some quick reference distributions. However, one must be aware of the fact that, because of such (interrelated) factors as: - fluctuations of intensive thermodynamic parameters - finite sizes of relevant regions of interaction/hadronization - some special features of the „heath bath” involved in a given process the use of only one parameter T in formulas of the type
exp[ - x/T]
is not enough and, instead, one should use two (... at least...) parameter formula
expq[ - x/T0] =[1-(1-q) x/T0]1/(1-q)
with q accounting summarily for all factors mentioned above.(*) In general, for small systems, microcanonical approach would be preferred (because in it one effectively accounts for all
nonconventional features of the heat bath...) (D.H.E.Gross, LNP 602)
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The end
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Possible connection with networks ...(I) (WW, APP B35(2004) 2141)
(*) Prompted by the observation of the power-like behaviour of the mT spectrawe have considered a possibility that :they can be a reflection not so much of any special kind of equilibrium (resulting in some specific statistics) but rather of the formation process resembling the free network formation pattern discussed widely in the literature (Barabasi et al.. RMP 74 (2002) 47; WW, APP B35 (2004) 871)(*) The power-law behaviour of spectra emerges naturally when: - hadrons are formed in process ofqq linking themselves by gluons - one identifies vertices in such network as (qq) pairs and gluons as links - one assumes that the observed mT of hadrons reflects somehow the number of links k (i.e., gluons) in such network ( - diffusion parameter):
mT k
The distribution of number of links in the network has form:
P(k) k - (with 5) As result one gets:
P(mT) mT - ; = 1+(-1)/
where =1+ and is parameter defining the rate of growth of our network.
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Possible connection with networks ...(II)
(*) The power-like distribution P(k) k - corresponds to large excitations where probability of connecting a new quark to the one already existing in the system depends on the number of the actual connections realised so far large number of connections results in large excitations large emission of gluons enhances chances of connection to such a quark. (*) If one assumes instead that the new quark attaches itself to the alreadyexisting one with equal probability (a case of small excitations, i.e., small pT)then one gets instead exponential distribution of links:
P(k) exp[ - k/<k> ]which results in P(mT) ranging from:
P(mT) exp[ - mT2/ <mT
2> ] for =1/2
when the full fledged diffusion is allowed, to
P(mT) exp[ - mT/ <mT> ] for =1
where there is no diffusion (this would be the case of quarks located on theperiphery of the hadronization region in which case they could interact onlywith interior quarks mT k).
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Insertion on networks - beginning
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Erdös-Rényi model (1960)
- Democratic
- Random
Pál ErdösPál Erdös (1913-1996)
Connect with probability p
p=1/6 N=10
k ~ 1.5 Poisson distribution
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k ~ 6
P(k=500) ~ 10-99
NWWW ~ 109
N(k=500)~10-90
What did we expect?
We find:
Pout(k) ~ k-out
P(k=500) ~ 10-6
out= 2.45 in = 2.1
Pin(k) ~ k- in
NWWW ~ 109 N(k=500) ~ 103
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What does it mean?Poisson distribution
Exponential Network
Power-law distribution
Scale-free Network
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Most real world networks have the same internal
structure:
Scale-free networks
Why?
What does it mean?
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Scale-free model(1) GROWTH : At every timestep we add a new node with m edges (connected to the nodes already present in the system).
(2) PREFERENTIAL ATTACHMENT : The probability Π that a new node will be connected to node i depends on the connectivity ki of that node
A.-L.Barabási, R. Albert, Science 286, 509 (1999)
jj
ii k
kk
)(
P(k) ~k-3
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Mean Field Theory
γ = 3
t
k
k
kAk
t
k i
j j
ii
i
2)(
ii t
tmtk )(
, with initial condition mtk ii )(
)(1)(1)())((
02
2
2
2
2
2
tmk
tm
k
tmtP
k
tmtPktkP ititi
33
2
~12))((
)(
kktm
tm
k
ktkPkP
o
i
A.-L.Barabási, R. Albert and H. Jeong, Physica A 272, 173 (1999)
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Networks from the Tsallis’ point of view...(WW, APP B35 (2004) 871)
The probability distribution of connections in the WWW networkfitted by Tsallis formula with q=1.65 and 0 =1.91. It reproducesthe observed mean <k>= 0 /(2-q)=5.45 and leads to the asymptoticpower-like distribution k - with =q/(q-1) =2.54(dotted line).
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Insertion on networks - end
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Simple Cascade ModelSimple Cascade Model
M11M12
M
M21M22 M23 M24
M31 M31 M31 M31 M31 M31 M31
1k M 2k M
1 2 1k k
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Other posible interpretation of q-parameter (Kodama et al..)
(*) Proposition of yet another dynamical origin of power-laws (Kodama et al.., cond-mat/0406732 and 36): supercorrelated systems q-clusters(*) Motivated by observation (Berges et al.., hep-ph/0403234) that dynamics ofquantum scalar fields exhibits a prethermalization behaviour : thermodynamicalrelations become valid long before the real thermal equilibrium is attained.(*) Possible realisation: strong correlations among some variables (leading toclustration): Example: system composed of N particles with strong correlation among any q of them and with dynamical evolution such that, for a given number of q-clusters, the configuration of the system tries to minimize the energy of the correlated subsystem (i.e., the system first generates correlations among particles minimizing the energy in the clusters) power law distribution discussed before with the same q-parameter .
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(Kodama et al.. cond-mat/046732)
Example how the existence of dynamical correlations leads to a preequilibrium stateof the system:
(a) (b)
Energy spectrum after a given number of collisions per particle, startingfrom a distribution peaked at E=125 GeV:(a) correlated system non-Boltzmann distribution fitted by Tsallis distribution with =0.39 GeV –1
and q=1.42(b) uncorrelated system Boltzmann distribution (equilibration needs 10 times more steps now!)
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Explanations of results from NUWW, hep-ph/0312136 (Physica A344(2004)568)
(a) Fit to pp data as before: q=1.05 – 1.33 going from E=20 GeV to E=1800GeV whereas ‘partition temperature’ Tq =1.76 GeV – 62.57 GeV
(b) PHOBOS most central data (on pseudorapidity distributions ) fitted with Kq=1 and (q;E)=(1.29; 19.6 GeV), (1.26; 130 GeV), (1.27; 200 GeV). The structure visible at the centre can be fitted only with more sophisticated approaches discussed before (cf. NA49 data)
(c) ALEPH data for e+e – annihilations at 91.2 GeV. Here: - by definition Kq=1 only - only q<1 (here: q=0.6) gives reasonably fit - minimum at y=0 cannot be fitted in simplest approach
Possible explanation of q<1: In this case temperature T does not reach an equilibrium state because now T=T0-(1-q)E, instead of remaining constant: T=T0, as is the case for q>1. We have a kind of dissipative transfer of energy from the region where T is higher (here: from q-jets to gluons and qq pairs) to observed hadrons.
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NUWW, hep-ph/0312136 (Physica A344(2004))568)
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Examples of some special y-distributions
(*) Nonextensive spectra obtained for different parameter q practically coincide with extensive spectra produced by masses M*=M/(3-2q) Fig. (a)
(*) Extensive spectra obtained for composition of smaller masses producing,
respectively, smaller number of secondaries practically coincide if M/N=const Fig. (b); otherwise differ drastically Fig. (c)
(*) The pT growing towards the centre of rapidity phse space (‘minijets’?) hasdramatic effect on spectra Fig. (d) (q=1)
(*) The effect of momentum-dependent residual interactions (q=1):
Fig. (e) (Schenke, Greiner, J.Phys. G30 (2004) 597)
(*) Example of effect of two superimposed sources separated in rapidity by 2y with combined energies and masses equal M Fig. (f)
|sinh|coshexp1
)( yyZ
ypTT
N
Pypydy
T
||)(|sinh|
NUWW, Physica A340 (2004) 467
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Explanations of results from NUWW, hep-ph/0312166 (Nukleonika 49 (2004) S19)
Scheme of the CAS model: it visualizes the possible fractal structure of hadronizationprocess (hadronizing source) and encompasses a large variety of <N(s)>.
(UWW, PRD61 (1999) 034007
Confrontation of e+e – annihilationdata with two different generalschemes:
(*) general statistical approach: gives only distribution in the phase space once initial energy M and multiplicity N are given
(*) general cascade model: once initial energy M is given it provides both: - the multiplicity N and - distribution in the phase space
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CAS
MaxEnt
Kq=1q=0.6
(UWW, PRD61 (1999) 034007
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Potentially very important result from AA collisions concerningfluctuations (MRW, nucl-th/0407012)
for AA collisions theusual superpositionmodel does not workwhen applied to fluctuations (signalfor the phase transitionto Quark-Gluon-Plasmaphase of matter?...)
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Examples of some special y-distributions
(*) Nonextensive spectra obtained for different parameter q practically coincide with extensive spectra produced by masses M*=M/(3-2q) Fig. (a)
(*) Extensive spectra obtained for composition of smaller masses producing,
respectively, smaller number of secondaries practically coincide if M/N=const Fig. (b); otherwise differ drastically Fig. (c)
(*) The pT growing towards the centre of rapidity phse space (‘minijets’?) hasdramatic effect on spectra Fig. (d) (q=1)
(*) The effect of momentum-dependent residual interactions (q=1):
Fig. (e) (Schenke, Greiner, J.Phys. G30 (2004) 597)
(*) Example of effect of two superimposed sources separated in rapidity by 2y with combined energies and masses equal M Fig. (f)
|sinh|coshexp1
)( yyZ
ypTT
N
Pypydy
T
||)(|sinh|
NUWW, Physica A340 (2004) 467
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NUWW, Physica A340 (2004) 467 M=200 GeV; N=60; <pT>=0.4 GeV/c
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