Post on 21-Dec-2015
Evolutionary significance of stochastic forces and small
populations
Coyne JA, Barton NH and Turelli M. 1997. A critique of Sewall Wright’s shifting balance theory of evolution. Evolution 51:643-671
Genetic differentiation
• Evidence for population differentiation in plants is indisputable.– Deterministic forces (Natural selection)– Stochastic processes (Genetic drift)
Drift causes random changes in allele frequencies
Simulated population; N = 10
Determinants of drift
• small population size (N)
• restricted dispersal (m)N
N
N
N
N
population
neighbourhood
Effective population size, Ne
- a standardized measure of population size - size of an ‘idealized’ population with the same
strength of genetic drift as the target population. - the census number (N), adjusted for skewed sex
ratio, perenniality, selfing, persistent seed bank, ploidy, non-random variation in fecundity etc.
- most cases, Ne is less than the actual count of individuals in the population (N)
How important is chance?
• Darwin (1859): acknowledged that historical accidents and chance could oppose the forces of natural selection
• Gulick (1872): Hawaiian land snails• Hagedoorn, A. L. and Hagedoom, A.
C. The Relative Value of the Processes Causing Evolution. Pp. 294. Martinus Nijhoff. The Hague, 1921.
Wright and Fisher
Fisher: adaptive evolution results simply from Darwinian mass selection.
Wright: adaptation cannot be explained by selection alone. Stochastic processes such as genetic drift often play an important role.
Shifting Balance Theory
Genotype/phenotype
Fitn
ess
selection
drift
Fitness landscape
selection
Coyne, Barton and Turelli 1997
“….it seems unreasonable to consider the shifting balance process as an important explanation for the evolution of adaptation”
Role of small populations and genetic drift in the evolution of mating systems
in Eichhornia paniculata
Eichhornia paniculata
•Pontederiaceae•short-lived perennial/annual•insect pollinated
Ephemeral water bodies in Brazil, Cuba, Jamaica, parts of Central America
•3 mating types• mating is disassortative and outcrossing• stable state: frequency-dependent selection maintains equal morphs frequencies
Tristyly
N = 167 populations
Estimate mating type frequencies
Trimorphic = 118
Dimorphic = 42
Monomorphic = 7
Mating type structure
•Trimorphic populations near 1:1:1, or low on S•Most dimorphic pops missing the S morph;•All monomorphic pops are M
How is mating system measured?
1. Need 8-10 half sib offspring from each of 20-30 mothers
2. Genotype mothers and offspring using genetic markers (allozymes, microsatellites, AFLPs)
3. Infer the genetic contribution of the paternal parent
ABAA?ABAB
Mother = AA
4. Estimate the rate of outcrossing (t) that produces the distribution of offspring observed. S = 1-t
Population outcrossing rate varies with mating type diversity
Self-fertilizing1 mating type
Cross-fertilizing3-mating types
Selfing variant of the M morph
• Natural selection against the S morph, perhaps related to pollinator x mating type interactions
• Stochastic events associated with small, short-lived populations
What evolutionary forces have caused the the loss of mating types and the transition from a stable outcrossing breeding system to self-fertilization?
Hypotheses
Selection
• Pollinator limitation: long-tongued solitary bees; may be unpredictable in small pops; S morphs may be most vulnerable
Fertility in the field
0
10
20
30
40
50
60
70
80
90
100
L M S
Style Morph
Fruit set (% of flowers)
but S < M,L in 3 of 6 popsF = 0.31, p > 0.50
Effective Population Size (Ne)
•Individual-based simulations of tristylous populations• When Ne < 40, drift can overcome selection and cause the loss of mating types.• Ne < 10, more likely to lose two mating types.
Mating types not lost equally
S morph - most likely to be lost
ssmm ssMm
ssMM
SsMm
SsMM
SSMm
SSMM
• frequency-dependent selection resists loss of morphs•if 1:1:1, all morphs equally likely to disappear due to sampling error• however, S allele is only carried by S morphs and thus cannot segregate from remaining L and M.
Effective population size in 10 populations of E. paniculata
Genetic methodSample allele frequencies over at least 2 years
Var
ian
ce i
n a
llel
e fr
eq.
Ne
V(p) =
€
p(1− p)[1− 1−1
2Ne
⎛
⎝ ⎜
⎞
⎠ ⎟
t
]
Ne - Demographic method
Five estimates1. Estimate # of individuals2. N, corrected for variation in among
years3. N, corrected for variance in flower
production4. N, corrected for mating type frequency5. N, corrected for self-fertilization
Ne
Mean N = 763 (range 30.5 - 5040)Mean Ne = 15.8 (range 3.4 - 70.6) Mean Ne / N = 0.106
Ne < 40 in 120 of 167 pops
0
20
40
60
80
100
120
140
160
0 20 40 60 80
Ne-genetic
Ne-demographic
Ne/N DemographyTemporal var = 0.47Reprod effort = 0.42Selfing rate = 0.98Morph freq = 0.95
Effect of drift onSpatial variation in morph structure
Predictions
Effective population size
Dimorphic/monomorphicTrimorphic
Spatial variation in mating type structure
Temporal variation in frequency of S mating type
S morph lost from pops
0
0.1
0.2
0.3
0.4
0.5
1-25 26-50 51-150 151-500 501-1500
Population size (N)
Change in morph diversity / yr
Obs Exp
Temporal variation in S as a function of N
What accounts for the loss of the L morph?
• Reproductive assurance: ability to self-fertilize in the absence of pollinators favours selfing M morph
0
10
20
30
40
50
60
70
80
90
100
L M
Style Morph
Fruit set (% of flowers)
F=2.8, p = 0.13
Why doesn’t the M morph spread in trimorphic populations?
• pollinators not scarce in large pops• siring advantage doesn’t exist when S is present
Genotype/phenotype
Fitn
ess
selection
drift
Fitness landscape
selectionoutcrossing
selfing