Multiplicity of clines for systems of indefinite differential equations arising from a multilocus population genetics model

Abstract

We investigate sufficient conditions for the presence of coexistence states for different genotypes in a diploid diallelic population with dominance distributed on a heterogeneous habitat, considering also the interaction between genes at multiple loci. In mathematical terms, this corresponds to the study of the Neumann boundary value problem equation* cases \, p1''+λ1 w1(x,p2) f1(p1) = 0, &in , \, p2''+λ2 w2(x,p1) f2(p2) = 0, &in , \, p1'=p2'=0, &on ∂, cases equation* where the coupling-weights wi are sign-changing in the first variable, and the nonlinearities fi[0,1][0,+∞[ satisfy fi(0)=fi(1)=0, fi(s)>0 for all s∈]0,1[, and a superlinear growth condition at zero. Using a topological degree approach, we prove existence of 2N positive fully nontrivial solutions when the real positive parameters λ1 and λ2 are sufficiently large.