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Abstract
In this paper, we examine the existence of multiple solutions of parametric fractional equations involving the square root of the Laplacian in a smooth bounded domain
(
) and with Dirichlet zero-boundary conditions, i.e.
The existence of at least three -bounded weak solutions is established for certain values of the parameter
requiring that the nonlinear term f is continuous and with a suitable growth. Our approach is based on variational arguments and a variant of Caffarelli–Silvestre’s extension method.
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Notes
No potential conflict of interest was reported by the authors.
Additional information
Funding
The paper has been carried out under the auspices of the INdAM - GNAMPA Project 2016 titled: Problemi variazionali su varietà Riemanniane e gruppi di Carnot and the Slovenian Research Agency [grant number P1-0292-0101], [grant number J1-7025-0101], [grant number J1-6721-0101], [grant number J1-5435-0101].