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Book & Tutorials. Hein, Schierup & Wiuf : Genealogies, Variation & Evolution. www.stats.ox.ac.uk/hein/lectures www.coalescent.dk (mheide@birc.dk). Contents H: The Basic Coalescent H: The Coalescent with Recombination S: The Coalescent with History, Geography & Selection
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Book & Tutorials Hein, Schierup & Wiuf: Genealogies, Variation & Evolution. www.stats.ox.ac.uk/hein/lectureswww.coalescent.dk (mheide@birc.dk) Contents H: The Basic Coalescent H: The Coalescent with Recombination S: The Coalescent with History, Geography & Selection S: The Coalescent & Gene Mapping H: The Coalescent & Combinatorics W: The Coalescent & Ancestral Analysis W: Parameter Estimation & Hypothesis Testing H: The Coalescent & Human Evolution
The Coalescent with Geography, History, & Selection www.stats.ox.ac.uk/hein/lectureswww.coalescent.dk (mheide@birc.dk) Review: Coalescence/Recombination Geography History Selection Scenarios Detection
Continuous-Time Coalescent 1.0 corresponds to 2N generations Discrete Continuous 2N 1.0 0 0.0 1 4 3 2 6 5
Recombination-Coalescence Illustration Intensities Coales.Recomb. Copied from Hudson 1990 0 1 (1+b) b 3 (2+b) 6 2 3 2 1 2
History Scenarios. Simple Deterministic Models of Population Size. Bottleneck Size jump Exponential growth Logistic growth T LB Bottleneck Severity LB/Ne Bottleneck Age T/Ne Stochastic Fluctuations of Population Size.
The Coalescent & Population Growth Growth will elongate leaf edges relative to deep edges! If the population size is known as function of time N(t), time can be scaled as for exponential growth eat, this gives
Tests of History. Distortion of branch lengths towards the present. Tajima (1989) - Fu and Li (1993) Mismatch Distribution Pairwise Distances Rogers & Harpending,1992. Likelihood Models Beerli & Felsenstein,1999
Mismatch distributions Rogers & Harpending,1992, Slatkin and Hudson, 1991
Watterson’s Estimator ACCTGAACGTAGTTCGAAG ACCTGAACGTAGTTCGAAT ACCTGACCGTAGTACGAAT ACATGAACGTAGTACGAAT ACATGAACGTAGTACGAAT * * * * A B A D C C B D 1 3 2 4 5 Expected Number Segregating Sites: *(1+1/2+ +1/(k-1)) W := Segr/(1+1/2+ +1/(k-1))= 4/ [11/6]=24/11=2.1818 Var(segr) =
1 3 2 4 5 Pairwise Distance Estimator ACCTGAACGTAGTTCGAAG ACCTGAACGTAGTTCGAAT ACCTGACCGTAGTACGAAT ACATGAACGTAGTACGAAT ACATGAACGTAGTACGAAT * * * * 6 B A D C A C 6 B 4 D 4 4 4 4 A mutation on a (n,n-k) branch will be counted n*(n-k) times. I.e. deep branches have higher weights. PD := Average Pairwise Distance (above 2.166) VarPD) = (n+1)/3(n-1) + 2 2(n2+n+3)/9n(n-1)
Tajima’s Test D = (PD -W)/Sd(PD -W) A large value indicates shortened tips A small value indicates shortened deep branches. Mitochondria (Ingman et al. 2000) Remade from McVean 52 complete molecules 521 segregating sites PD = 44.2 W = 115.3 V(D) =31.8 D = -2.23
Geography Scenarios. 2 Demes Same Size Continent & Island N Demes with structure stepping stone: 1- dimension stepping stone: 2 dimensions Continuous Geography 1 Dimension 2 Dimensions
Two Demes: Symmetric: Island/Continent: M1 M2
Distribution of MRCA in d-deme model. d=5 1/d m 2 alleles. T(2,0) time to coalesce if in different demes T(0,1) time to coalesce if in the same demes Recursions Solutions
Distribution of coalescence times within/between demes From Hudson, 1990
Stepping stone models Line (1-Dim) Plane (2-Dim)
Continuous Geography (Wright 43, Malecot 48, Felsenstein 75, Barton 96 02) 1 dimensional 2 dimensional - plane or torus (wrapped rectangle) • These models can be obtained by • A limit of stepping stone models • Directly by a Brownian Motion model of movement. Sequences can only find common ancestors when at the same place. This doesn’t happen in the continuous models for dim >1. A neighborhood has to be defined.
Continuous Geography (Barton & Wilson 96) Several artifacts in this model. Increasing lumping over time.
Testing Geography. Hudson, Boos & Slatkin’s (1990) Permutation test Maddison & Slatkin (1989) Assignment of ancestral geography. Likelihood Bahlo & Griffiths (2000) Pritchard’s Structure (2000) Kuhner et al. (2000)
Selection Scenarios. Alleles: A a Haploid Selection Directional Frequency Dependent Diploid Balancing Selection Directional Selection Allelic Types Fitnesses 1 1-s Fitnesses 1-pA 1-pa Genotypes AA AA aa Fitnesses 1 1+s 1 Fitnesses 1 1+hs 1+s sNs In the coalescent scaling
The 1983 Kreitman Data (M. Kreitman 1983 Nature) from Hartl & Clark, 1997 11 alleles 3200 bp long. 43 segregating sites (columns with variation). 1 amino replacement event 1 insertion-deletion (indel)
Two locus balancing selection model Hudson, Darden & Kaplan,88-89 p q k1 k2 P(A)=p, P(B)=q, we sample k1 A alleles and k2 B alleles Two cases: Strong selection with fixed ancestral frequencies Weaker selection with fluctuating ancestral frequencies.
Local Global Heterogenisation Balancing Selection Geo.Subdivision Homogenisation Selective Sweeps Bottlenecks Geography Selection
The ancestral selection graph Krone & Neuhauser, 1997 Two alleles, A and a, A has an advantage of s Mutation rate between types = u
Recovery of the coalescent tree with directional selection Krone & Neuhauser, 97
AiAj AiAi 1 1-s A Coalescent relating Allele Classes. (Takahata,1990) Examples: Major Histocompatibility Genes Self-incompatibility Alleles in plants.
Allelic genealogy in the self-incompatibility system of Solanaceae From Vekemans, 1998
Tests of Selection Tajima’s D (1989) (Fu’s test) Hudson, Kreitman & Aquade (1987) HKA Kreitman-MacDonald test (1990) Likelihood tests
HKA-Test(Hudson, Kreitman & Aquade) Hudson,Kreitman & Aquade,1987 Gene 2 Gene 1 MRCA2 MRCA1 Speciation, T: Speciation, T: Q2 Q1 Specie 2 Specie 2 Specie 1 Specie 1 The original data set ADH & 5’ prime region, D. sechellia & D.melanogaster d=210(MRCA1)d=18 (MRCA2) S=9 (Lk1*Q1)S=8 (Lk2*Q2) Q1 = 2.7 Q2=0.7 T=13.4Ne Rejection. Are the 2 loci linked or unlinked?
Kreitman/McDonald-Test Kreitman/McDonald,1990 + Eanes, 1994 Replacement Synonymous Between Specie 21 BR 26 BS 36 WS 2 WR Within Specie Specie 2 Specie 1 Rejection Tested by 2*2 indendence in contingency table. Parameter estimation not necessary.
Summary of Coalescent with HGS History Geography Selection Scenarios Detection
References. (Balding,D. et al. (2000) “Handbook of Statistical Genetics” Wiley Articles by Rousset, Nordborg, Stephens, Hudson, Barton,NH, Depaulis & Etheridge (2002) Neutral Evolution in Spatially Continuous Populations Theor.Pop.Biol. 61.31-48. Barton, N. & I.Wilson (1996) “Genealogies and Geography” in New uses for New Phylogenies eds. Harvey et al. OUP Donnelly,P., Nordborg, M. & Joyce,P. (2001) Likelihoods and Simulation Methods for Classes of Non-neutral Population Genetics Models. Genetics 159.853-867. Golding,B. (ed.) (1994) “Non-Neutral Evolution” Chapman & Hall articles by Eanes, Aquadro,.Hudson, McDonald, Hein,JJ (2002) Slides: www.stats.ox.ac.uk/hein/lectures Hudson, Boos & Kaplan (1992) A Statistical Test for Detecting Geographical Subdivision” Mol.Biol.Evol. 9.1.138-151 Hudson, Kreitman & Aquade (1987) A test of Neutral Molecular Evolution Based on Nuclear Data. Genetics 116.153-9 Hudson, Darden & Kaplan (1988) Hudson and Kaplan (1988) “The Coalescent Process in Models with Selection and Recombination” Genetics 120.831-840. Krone & Neuhauser (1997) McVean,G. (2002) course: www.stats.ox.ac.uk/mcvean Neuhauser & Krone (1997) The Genealogy of Samples in Models with Selection Genetics 145.519-534. Nordborg, M.(1997) “Structured Coalescent Processes on Different Time Scales” Genetics 146.1501-1514. Pybus,OG et al(2000) An Integrated Framework for the Inference of Viral Population History from Reconstructed Genealogies. Genetics 155.1429-1437. Schierup, M. et al.(2002) Coalescent Simulator: www.coalescent.dk Slatkin (1991) Inbreeding Coeffecients and Coalescence Times. Genet. Res. Camb. 58.167-175. Slatkin & Hudson (1992) Slade (2000) “Simulation of Selected Genealogies” Theor.Pop.Biol. 57.35-49 Takahata,N.(1990) “A simple genealogical structure of strongly balanced allelic lines of transpecies evolution of polymorphism. PNAS 87.2419-23. Wiuf, C. and J.Hein (2000) “The Coalescent with Gene Conversion” Genetics 155.451-462.
History of Coalescent with HGS Stepping Stone Model introduced by Wright Krone Neuhauser introduces Selection Graph
Evidence against background selection From Aquadro, 1994
Evidence for genetic hitch-hiking From Aquadro, 1994
Variation in recombination rate in Drosophila, chromosome 3 From Aquadro, 1994
Mismatch distributions in human populations Excoffier, 2000
Fu’s Test From Li,1997 External (e) versus Internal () Branches. e and i the number of mutations in external and internal branches. E(e) = 2E(i) = Lk-2 E(e )= V(e )= E(i )= (Lk-2) V(i )= (Lk-2)/(n-1) + c] 1 if n =2 c = b= 2[nLk - 2(n-1)]/(n-1)(n-2)
Waiting intensities in general model of population subdivision
