Ljusternik-Schnirelmann eigenvalues for the fractional m-Laplacian without the 2 condition

Abstract

In this work we analyze the eigenvalue problem associated to the fractional m-Laplacian, defined as (-m)s u(x):=2p.v.∫ Rn m(|u(x)-u(y)||x-y|s)(u(x)-u(y))|u(x)-u(y)|dy|x-y|n+s, This operator serves as a model for nonlocal, nonstandard growth diffusion problems. In contrast to previous analyses, we explore the eigenvalue problem without presuming the 2 condition on M -- the primitive function of m. Our results show the existence of a sequence of eigenvalues λk∞. This research contributes to advancing our understanding of nonlocal diffusion models, specifically those characterized by the fractional m-Laplacian, by relaxing the constraints imposed by the 2 condition.