On the Fredholm-type theorems and sign properties of solutions for (p,q)-Laplace equations with two parameters

Abstract

We consider the Dirichlet problem for the nonhomogeneous equation -p u -q u = α |u|p-2u + β |u|q-2u + f(x) in a bounded domain, where p ≠ q, and α, β ∈ R are parameters. We explore assumptions on α and β that guarantee the resolvability of the considered problem. Moreover, we introduce several curves on the (α,β)-plane allocating sets of parameters for which the problem has or does not have positive or sign-changing solutions, provided f is of a constant sign.