Evolutionary Games on the Torus with Weak Selection

Abstract

We study evolutionary games on the torus with N points in dimensions d 3. The matrices have the form G = 1 + w G, where 1 is a matrix that consists of all 1's, and w is small. As in Cox Durrett and Perkins CDP we rescale time and space and take a limit as N∞ and w 0. If (i) w N-2/d then the limit is a PDE on Rd. If (ii) N-2/d w N-1, then the limit is an ODE. If (iii) w N-1 then the effect of selection vanishes in the limit. In regime (ii) if we introduce a mutation μ so that μ /w ∞ slowly enough then we arrive at Tarnita's formula that describes how the equilibrium frequencies are shifted due to selection.