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Hans Metz Michel Durinx On the Canonical Equation of (directional) Adaptive Dynamics for Physiologically Structured Populations ADN, IIASA
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a few words about - adaptive dynamics - (physiologically) structured populations the canonical equation - derivation for structured populations some final methodological comments
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Adaptive Dynamics Example illustrating the individual-based justification. Where in the hierarchy of abstractions? Scope. The fitness landscape picture of evolution: it is a seascape!
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reproduction death faithful mutated (The agent-based version of a so-called Lotka-Volterra model, with mutation added.)
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P P
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these determine the resident environment consequence: s X (X) = 0
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The fitness landscape picture of evolution: Evolution proceeds through uphill movements in a fitness landscape that keeps changing so as to keep the fitness of the resident types at exactly zero. resident trait value(s) x evolutionary time 0 0 0 0 0 fitness landscape: s X 1... X k (Y) mutant trait value y
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Physiologically Structured Populations Population dynamical equilibria: demography with density dependence Invasion by mutants: back to standard classical demography again
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Calculating equilibria for physiologically structured populations After Diekmann, Gyllenberg & Metz (2003) Theor Pop Biol 63: 309-338 : b = L(I)b, I = F(O), O = G(I) b equilibrium birth rate per unit of area environmental input, i.e., the environment as perceived by the individuals per capita lifetime impingement on the environment next generation operator (i.e., L ij is the lifetime number of births in state i expected from a newborn in state j) population output, i.e., impingement on the environment
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Start with the case where b is a scalar i.e., everybody is born equal, but for the inherited traits. Individuals do not inherit state variables like fat reserves, or social status
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Calculating mutant invasion rates for physiologically structured populations with r Y (I X ) the solution of = 1 with Invasion fitness: (unique) Laplace transform of birth kernel (Lotka’s equation, scalar version) the so-called birth kernel of the invader Y in environment I X [i.e., Y (I X,a) is the expected number of invaders produced up to age a by a newborn invader]. L Y (I X ) = Y (I X,∞)
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the Canonical Equation
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derivation for general Physiologically Structured Populations For ODE population models: Dieckmann & Law (1996) J Math Biol 34: 579-612 Champagnat, Ferrière & Ben Arrous (2001) Selection 2
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mean evolutionary step per time unit: probability of mutation per birth event (average) population size (average) pro capita birth rate Mutants arrive singly. Therefore we have to account for the intrinsic stochasticity of the invasion process. probability density of mutation steps
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In an ergodic environment:
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Q = Q R 0 < 1 R 0 > 1 with := R 0 - 1 ≈ ln(R 0 ) : lifetime number of kids g
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characteristic equation: take logarithms: to first order of approximation: /R0/R0
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mean evolutionary step per time unit: probability of mutation per birth event (average) population size (average) pro capita birth rate probability density of mutation steps
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For ODE population models: 2 = 2 T f = T s
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Finitely many different birth states: (e.g. multiregional models) The previous results immediately extend to this case with appropriate definitions for 2, T f, and T s (although it was a bit of a hassle to get the formulas right). For the case of infinitely many birth states the required branching process results have not yet been proven.
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Finitely many different birth states: A second application is to periodic environments: Take the phase (of the oscillation) at which an individual is born as its birth state. (The proof still has to be worked out in all its gory technical detail.) NB The idea of a proof works only for discrete time models due to the lack of hard results for continua of birth states. (Ulf Dieckmann has additional heuristic results for simple ODE community models that apply to mutant invasion in any type of ergodic attractor.)
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To round of: What happens near branching points? This depends on the local geometrical structure of the function s X (Y). For one-dimensional trait spaces we have a full classification of what happens around any type of “singular point”, like Evolutionarily Stable Strategies or branching points. For higher dimensional trait spaces we have so far only proved that: Any model in the class treated in this talk locally around a singular point has the same evolutionary properties as some appropriately chosen so-called (simple!) Lotka-Volterra model. ?
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Some final methodological remarks: In this case it was possible to do an analytical model reduction for a large class of eco-evolutionary models. Therefore simple members of that class give a good indication of particular dynamical options within the larger class. By embedding those special models into a (vastly) larger class, and working through the reduction procedure, they can be connected to the “real world”. (Therefore, in this case, toy models are good metaphors.) However, to see which properties survive as universal within an appropriate larger class, one has to do the embedding-reduction exercise. Sobering aside: Within evolutionary biology we have by now had close to a century to hone our mathematical tools. Yet, the results that I just discussed are so new that they are still unpublished.
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The End (for today)
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