We study a partial differential inclusion, driven by the p-Laplacian operator, involving a p-superlinear nonsmooth potential, and subject to Neumann boundary conditions. By means of nonsmooth critical point theory, we prove the existence of at least two constant sign solutions (one positive, the other negative). Then, by applying the nonsmooth Morse identity, we find a third non-zero solution.

Three solutions for a Neumann partial differential inclusion via nonsmooth Morse theory

Iannizzotto, Antonio;
2017-01-01

Abstract

We study a partial differential inclusion, driven by the p-Laplacian operator, involving a p-superlinear nonsmooth potential, and subject to Neumann boundary conditions. By means of nonsmooth critical point theory, we prove the existence of at least two constant sign solutions (one positive, the other negative). Then, by applying the nonsmooth Morse identity, we find a third non-zero solution.
2017
Morse theory; P-Laplacian; Partial differential inclusion; Analysis; Statistics and probability; Numerical analysis; Geometry and topology; Applied mathematics
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11584/243002
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