Critical double phase problems involving sandwich-type nonlinearities
Abstract
In this paper we study problems with critical and sandwich-type growth represented by align* -div(|∇ u|p-2∇ u + a(x)|∇ u|q-2∇ u)= λ w(x)|u|s-2u+θ B(x,u) in , u= 0 ∂ , align* where ⊂RN is a bounded domain with Lipschitz boundary ∂, 1<p<s<q<N, qp<1+1N, 0≤ a(·)∈ C0,1(), λ, θ are real parameters, w is a suitable weight and B × R is given by align* B(x,t) :=b0(x)|t|p*-2t+b(x)|t|q*-2t, align* where r*:=Nr/(N-r) for r∈\p,q\. Here the right-hand side combines the effect of a critical term given by B(·,·) and a sandwich-type perturbation with exponent s ∈ (p,q). Under different values of the parameters λ and θ, we prove the existence and multiplicity of solutions to the problem above. For this, we mainly exploit different variational methods combined with topological tools, like a new concentration-compactness principle, a suitable truncation argument and the Krasnoselskii's genus theory, by considering very mild assumptions on the data a(·), b0(·) and b(·).
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