A Landesman-Lazer type result for periodic parabolic problems on RN at resonance

Abstract

We are concerned with T-periodic solutions of nonautonomous parabolic problem of the form ut = u + V(x) u + f(t,x,u), t >0, x ∈ RN, with V ∈ L∞ (RN)+Lp(RN), p ≥ N and T-periodic continuous perturbation f:RN× R R. The so-called resonant case is considered, i.e. when N:=Ker ( + V) ≠ \0\ and f is bounded by a square-integrable function. We derive a formula for the fixed point index of the associated translation along trajectories operator in terms of the Brouwer topological degree of the time average mapping f: N N being the restriction of f to N. By use of the formula and continuation techniques we show that Landesman-Lazer type conditions imply the existence of T-periodic solutions.