Least energy sign-changing solution for degenerate Kirchhoff double phase problems
Abstract
In this paper we study the following nonlocal Dirichlet equation of double phase type align* - [ ∫ ( |∇ u |pp + μ(x) |∇ u|qq)\,d x] G(u) = f(x,u) in , u = 0 on ∂, align* where G is the double phase operator given by align* G(u)=div (|∇ u|p-2∇ u + μ(x) |∇ u|q-2∇ u ) u∈ W1,H0(), align* ⊂eq RN, N≥ 2, is a bounded domain with Lipschitz boundary ∂, 1<p<N, p<q<p*=NpN-p, 0 ≤ μ(·)∈ L∞(), (s) = a0 + b0 s-1 for s∈R, with a0 ≥ 0, b0>0 and ≥ 1, and f×R is a Carath\'eodory function that grows superlinearly and subcritically. We prove the existence of two constant sign solutions (one is positive, the other one negative) and of a sign-changing solution which turns out to be a least energy sign-changing solution of the problem above. Our proofs are based on variational tools in combination with the quantitative deformation lemma and the Poincar\'e-Miranda existence theorem.
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