In this paper we consider a class of anisotropic (p(->), q(->))-Laplacian problems with nonlinear right-hand sides that are superlinear at +/-infinity. We prove the existence of two nontrivial weak solutions to this kind of problem by applying an abstract critical point theorem under very general assumptions on the data without supposing the Ambrosetti-Rabinowitz condition.
Amoroso, E., Sciammetta, A., Winkert, P. (2024). Anisotropic $ (\vec{p}, \vec{q}) $-Laplacian problems with superlinear nonlinearities. COMMUNICATIONS IN ANALYSIS AND MECHANICS, 16(1), 1-23 [10.3934/cam.2024001].
Anisotropic $ (\vec{p}, \vec{q}) $-Laplacian problems with superlinear nonlinearities
Amoroso, Eleonora;Sciammetta, Angela;Winkert, Patrick
2024-01-08
Abstract
In this paper we consider a class of anisotropic (p(->), q(->))-Laplacian problems with nonlinear right-hand sides that are superlinear at +/-infinity. We prove the existence of two nontrivial weak solutions to this kind of problem by applying an abstract critical point theorem under very general assumptions on the data without supposing the Ambrosetti-Rabinowitz condition.
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