quantitative trait evolution with mutations of large effect
TRANSCRIPT
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Quantitative trait evolution with mutations oflarge effect
Joshua G. Schraiber and Michael J. Landis
May 1, 2014
Joshua G. Schraiber and Michael J. Landis Mutations of large effect
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Quantitative traits
· Traits that vary continuously inpopulations
- Mass- Height- Bristle number (approx)
· Adaption
- Low oxygen tolerance
· Disease
- Obesity
· Agriculture
- Fruit yield
Joshua G. Schraiber and Michael J. Landis Mutations of large effect
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Fisher’s quantitative trait model
· n biallelic loci impacting trait
· Allele j at locus i has effect aij· Phenotype is Xk =
∑i ,j aijzijk
- zijk is number of copies of allele jat locus i in individual k
· E(X̄ ) = 2nE(p)E(a)
· E(Var(X )) = 2nE(p(1− p))E(a2)
· Environmental variation inducesextra variability
1 locus
Trait
Frequency
-1.5 -1.0 -0.5 0.0
0200
600
5 loci
Trait
Frequency
-1 0 1 2 3
050
150
100 loci
Trait
Frequency
-35 -30 -25 -20 -15 -10 -50
50100
150
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Neutral genetic variance
· Equilibrium genetic variance
- E(VA(∞)) = 2NVm
· Vm is the additive variance of newmutations
- Vm ≈ 2µσ2
- µ: is trait-wide mutation rate- σ2: variance of mutant effect size
distribution
· Var(VA(∞)) ≈ 4Nµσ4 (Lynch andHill 1986)
Joshua G. Schraiber and Michael J. Landis Mutations of large effect
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Lande’s Brownian motion model
· Approximation to full model
- Don’t keep track of individual loci- Assume genetic variance constant
in time- Mutations have small effect sizes
· Can incorporate selection viaOrnstein-Uhlenbeck model
· Extremely influential incomparative biology
- c.f. Felsenstein: independentcontrasts
0.0 0.2 0.4 0.6 0.8 1.0
-1.0
-0.8
-0.6
-0.4
-0.2
0.0
0.2
timeX
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Evidence for non-Brownian evolution
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A coalescent model
· Haploid population of size N
· Trait governed by n loci
· Each locus has an independent coalescent tree
· Each locus has mutation rate θ2 (coalescent time units)
· When a mutation happens, effect Y is drawn fromdistribution with density p(y).
Joshua G. Schraiber and Michael J. Landis Mutations of large effect
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Example
Joshua G. Schraiber and Michael J. Landis Mutations of large effect
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Mutational effects
· Common assumption: many loci of very small effect
- Infinitesimal model
Joshua G. Schraiber and Michael J. Landis Mutations of large effect
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Large effect mutations
· In some cases, large effect mutations may occur
- Transcription factor binding sites- Null mutants upstream in pathways
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Characteristic functions
Characteristic function
For a random variable X drawn from the probability measure µ(·),the function
φX (k) = E(e ikX )
=
∫e ikxdµ(x)
is called the characteristic function
Sums of random variables
If X1, . . . ,Xn are independent random variables, and X =∑
i Xi
thenφX (k) =
∏i
φXi(k)
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Compound Poisson process
Definition
Let N(t) be a rate λ Poisson process, and (Yi , i ≥ 1) a sequenceof independent and identically distributed random variables. Then
X (t) =
N(t)∑i=1
Yi
is called a compound Poisson process.
0 1 2 3 4 5
-5-3
-11
t
X(t)
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Characteristic function of a compound Poisson process
CF of a CP process
If X (t) is a rate λ Compound Poisson process, and ψ(k) is thecharacteristic function of the jump distribution, then thecharacteristic function of X is
φt(k) = eλt(ψ(k)−1)
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One locus, sample of size 2
· Condition on T2, thecoalescence time
- X1 and X2 areindependent CP(θ/2)processes run for time T2
- Joint distribution dependson root value
· Consider Z = X2 − X1
- Doesn’t depend on root
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One locus, sample of size 2 (CF)
φZ (k) =
∫ ∞0
E(e ikZ )e−tdt
=
∫ ∞0
E(e ik(X2−X1))e−tdt
=
∫ ∞0
φt(k)φt(−k)e−tdt
=
∫ ∞0
eθ2t(ψ(k)+ψ(−k)−2)e−tdt
=1
1− θ2 (ψ(k) + ψ(−k)− 2)
Joshua G. Schraiber and Michael J. Landis Mutations of large effect
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Phenotype at the root
· The root of the tree must be specified
· A new individual could coalesce more anciently than thecurrent root
- For each n, there is a fixed root- Ensuring consistency could be hard
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The root problem
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Getting rid of the root
Normalization
If X = (X0, . . . ,Xn−1) are the trait values in the sample, then therandom vector
Z = (Z1, . . . ,Zn−1)
= (X1 − X0, . . . ,Xn−1 − X0)
does not depend on the root value
· ”Normalizing” by an arbitrary individual makes n unimportant
- Intuition: now every sample has to follow the path through thetree to individual 0, so the root doesn’t matter
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One locus, sample of size 3
Characteristic function for n = 3, and symmetric mutational effects
φZ1,Z2(k1, k2) =
11+θ(1−ψ(k1)) + 1
1+θ(1−ψ(k2)) + 11+θ(1−ψ(k1+k2))
3− θ2 (ψ(k1) + ψ(k2) + ψ(k1 + k2)− 3)
· Sketch of derivation:
- Condition on topology (each of 3 topologies equally likely)- Compute characteristic function for each topology while
conditioning on coalescence times- Integrate over coalescence times- Take weighted sum of characteristic functions for each
topology
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Sending the number of loci off to infinity
· We would like some nice limit as the number of loci increases
- Trivial result: “uniform on R” or δ(x)
· Need to decrease the effect size or mutation rate of each locus
· Three nontrivial limits
- Mutation rate per locus decreases but effect sizes remainconstaint
- Mutation rate per locus remains constant but effect sizesdecrease and effect size distribution does not have fat tails
- Mutation rate per locus remains constant but effect sizedecreases and effect size distribution has fat tail
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Decreasing mutation rate
Correlated CPP limit
As n ↑ ∞ and θ ↓ 0 such that nθ → Θ,
φZ1,Z2(k1, k2)→ eΘ2
(ψ(k1)+ψ(k2)+ψ(k1+k2)−3)
which is the characteristic function of two correlated compoundPoisson processes.
· Perhaps not very biologically relevant
· Will ignore for rest of talk
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Small effect mutations
Bivariate Gaussian limit
As n ↑ ∞ and the second moment of the effect distrbution, τ2, ↓ 0such that nτ2 → σ2,
φZ1,Z2(k1, k2)→ e−θ2σ2(k2
1 +k1k2+k22 )
which is the characteristic function of a Bivariate Gaussiandistribution with mean vector (0, 0) and variance-covariance matrix
Σ = θσ2
[1 1/2
1/2 1
]
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Large effect mutations
Bivariate stable distribution
Assume that p(y) ∼ κ|y |−(α+1) and sett = κπ (sin(απ/2)Γ(α)α)−1. As n ↑ ∞ and t ↓ 0 such thatnt → c ,
φZ1,Z2(k1, k2)→ e−12θc(|k1|α+|k2|α+|k1+k2|α)
where c = c̃ πsin(απ
2 ), which is the characteristic function of a
bivariate α-stable distribution
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de Finetti’s theorem
Theorem
If (X1,X2, . . .) is an infinitely exchangeable random vector, thenthe probability density of (X1 = x1, . . .Xn = xn) is a mixture overi.i.d. probability densities. That is,
p(x1, . . . , xn) =
∫ ∏i
pθ(xi )ν(dθ)
· Suggests that we can find a de Finetti measure such that allour normalized samples are i.i.d.
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A guess in the normal case
· Given the mean, the trait is distributed N (0, θ2σ2)
· The mean is itself distributed N (0, θ2σ2)
· Law of total variance gives Var(X ) = 2Nµσ2
- Same as classical derivation
φ(k1, k2) =
∫ (∫ 2∏l=1
e iklxl1√πθσ2
e−(m−xl )
2
θσ2 dxl
)1√πθσ2
e−m2
θσ2 dm
= e−θ4σ2(k2
1 +k22 )∫
e im(k1+k2) 1√πθσ2
e−m2
θσ2 dm
= e−θ4σ2(k2
1 +k22 )e−
θ4σ2(k1+k2)2
= e−θ2σ2(k2
1 +k1k2+k22 )
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Tempting interpretation and conjecture
· Conditioning on the amount of evolution “exclusive to sample0”
- Integrate over whether sample 1 or sample 2 coalesces withsample 0 first
· Suggests that this can be extended to arbitrary sample sizes
Conjecture about larger samples (Gaussian limit)
When the mutation kernel has only small effect mutations, thelimit distribution is normal with variance θ
2σ2 and random mean.
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Testing the Gaussian conjecture
· Simulate quantitative traits according to the coalescent model· Use KS test to assess convergence in the limit
22
23
24
25
26
27
28
21 22 23 24 25 26 27 28# loci
# sa
mpl
es
same
diffvalue
Normal, KS D
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Conjecture for the stable limit
· Bivariate case
- Independently α-stable with random median- Analogous to Gaussian limit
Conjecture about larger samples (Stable limit)
When the mutation kernel has large mutational effects, the limit
distribution is α-stable with scale(θ2c)1/α
and random median.
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Testing the stable conjecture
· Simulate quantitative traits according to the coalescent model· Use KS test to assess convergence in the limit
22
23
24
25
26
27
28
21 22 23 24 25 26 27 28# loci
# sa
mpl
es
same
diffvalue
Stable, KS D
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More randomness than expected
-1.0 -0.5 0.0 0.5 1.0
02
46
8
Trait value
Density
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Stable limit for sample of size 4
· Tedious computation
- Need to average over 18 trees.
· Conjecture would require
φZ1,Z2,Z3(k1, k2, k3)→ e−θ2c(|k1|α+|k2|α+|k3|α+|k1+k2+k3|α)
Trivariate characteristic function
For a sample of size three, under the same conditions as thebivariate limit,
φZ1,Z2,Z3 (k1, k2, k3)→ exp{−θ3c(|k1|α + |k2|α + |k3|α
+1
2|k1 + k2|α +
1
2|k1 + k3|α +
1
2|k2 + k3|α
+ |k1 + k2 + k3|α)}
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Extremely weak conjecture for large effect mutations
Conjecture (Stable limit)
When the mutation kernel has large mutational effects, the limitdistribution is α-stable with random parameters
· Not even sure that this is true
- A mixture of stable distributions?
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Empirical data
· Neurospora crassa mRNA-seq
- Ellison et al (2011), PNAS- Restrict to genes with FPKM > 1
· For each gene fit normal distribution, α-stable distribution
· Bootstrap likelihood ratio test (H0 : α = 2 vs. H1 : α < 2)
· Preliminary!
- Only analyzed 346 genes
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Distribution of p-values
p−value
Fre
quen
cy
0.0 0.2 0.4 0.6 0.8 1.0
050
100
150
200
· 54 genes significant at FDR of 32%
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Distribution of α in significant genes
α̂
Fre
quen
cy
1.4 1.5 1.6 1.7 1.8 1.9
02
46
8
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Cherry-picked examples
NCU09477
log(FPKM)
Den
sity
−1.0 −0.5 0.0 0.5
0.0
0.5
1.0
1.5
NCU00484
log(FPKM)
Den
sity
−0.2 0.0 0.2 0.4
01
23
NCU02435
log(FPKM)
Den
sity
−0.6 −0.4 −0.2 0.0 0.2 0.4
01
23
4
NCU07659
log(FPKM)
Den
sity
−1.0 −0.5 0.0 0.5
0.0
1.0
2.0
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Conclusions
· Introduced a coalescent model of quantitative trait evolution
- Provided exact formulas for the characteristic functions forsamples of size 2, 3, 4
- Found limiting distributions as the number of loci becamelarge in each case
- Conjectured about extending these limits to larger samples
· Extensions
- Samples not contemporaneous- Population structure- Diploids
· Why a neutral model?
- Analytically tractable calculations- Intuition for what to expect with weak selection- Null model
Joshua G. Schraiber and Michael J. Landis Mutations of large effect