On subhomogeneous indefinite p-Laplace equations in supercritical spectral interval
Abstract
We study the existence, multiplicity, and certain qualitative properties of solutions to the zero Dirichlet problem for the equation -p u = λ |u|p-2u + a(x)|u|q-2u in a bounded domain ⊂ RN, where 1<q<p, λ∈R, and a is a continuous sign-changing weight function. Our primary interest concerns ground states and nonnegative solutions which are positive in \x∈ : a(x)>0\, when the parameter λ lies in a neighborhood of the critical value λ* = ∈f\∫ |∇ u|p \, dx/∫ |u|p \, dx: u∈ W01,p() \0\,\ ∫ a|u|q\,dx ≥ 0\,\. Among main results, we show that if p>2q and either ∫ apq\,dx=0 or ∫ apq\,dx>0 is sufficiently small, then such solutions do exist in a right neighborhood of λ*. Here p is the first eigenfunction of the Dirichlet p-Laplacian in . This existence phenomenon is of a purely subhomogeneous and nonlinear nature, since either in the superhomogeneous case q>p or in the sublinear case q<p=2 the nonexistence takes place for any λ ≥ λ*. Moreover, we prove that if p>2q and ∫ apq\,dx>0 is sufficiently small, then there exist three nonzero nonnegative solutions in a left neighborhood of λ*, two of which are strictly positive in \x∈ : a(x)>0\.
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