On doubly critical polyharmonic double phase problems: Existence and non-existence of solutions

Abstract

In this article, we investigate the existence and nonexistence of weak solutions to higher-order doubly critical elliptic problems with weights, driven by a polyharmonic double phase operator. More precisely, we deal with the following problem equation cases Lmp,q(u) = f(x,u) ~&in Ω,\\[6pt] u=∇ u=·s∇m-1 u=0 &on ∂Ω, cases equation where Ω⊂ RN with N ≥ 2 is a smooth bounded domain with Lipschitz boundary ∂Ω, m ∈ N, 1 < p < q < Nm with (N-1)q≤ Np, the nonlinear term fΩ×R R is a Carathéodory function, which has doubly critical growth, and Lmp,q represents a polyharmonic double phase operator. By establishing new compactness results within a suitable Musielak--Orlicz--Sobolev framework and applying variational methods, we prove the existence of nontrivial weak solutions. In addition, we derive nonexistence results under appropriate assumptions by establishing a Pohozaev-type identity for higher--order derivatives. Our approach extends classical techniques to capture the intricate features of the double-phase operator for higher--order derivatives, and addresses the difficulties arising from critical nonlinearities, in particular extending the results of [F. Colasuonno, K. Perera, J. Differ. Equ., 422 (2025), 426--488] in a polyharmonic double phase setup overcoming the non-closedness of truncations in higher-order Sobolev spaces.