On some weakly coercive quasilinear problems with forcing

Abstract

We consider the forced problem -p u - V(x)|u|p-2 u = f(x), where p is the p-Laplacian (1<p<∞) in a domain ⊂ RN, V 0 and QV (u) := ∫ |∇ u|p\, dx - ∫ V|u|p\,dx satisfies the condition (A) stated at the beginning of the paper. We show that this problem has a solution for all f in a suitable space of distributions. Then we apply this result to some classes of functions V which in particular include the Hardy potential and the potential V(x)=λ1,p(), where λ1,p() is the Poincar\'e constant on an infinite strip.