Nonlocal refuge model with a partial control

Abstract

In this paper, we analyse the structure of the set of positive solutions of an heterogeneous nonlocal equation of the form: ∫ K(x, y)u(y)\,dy -∫ K(y, x)u(x)\, dy + a0u+λ a1(x)u -β(x)up=0 in × where ⊂ n is a bounded open set, K∈ C(n× n) is nonnegative, ai,β ∈ C() and λ∈. Such type of equation appears in some studies of population dynamics where the above solutions are the stationary states of the dynamic of a spatially structured population evolving in a heterogeneous partially controlled landscape and submitted to a long range dispersal. Under some fairly general assumptions on K,ai and β we first establish a necessary and sufficient criterium for the existence of a unique positive solution. Then we analyse the structure of the set of positive solution (λ,uλ) with respect to the presence or absence of a refuge zone (i.e ω so that β|ω 0).