Existence of Eigenvalues for Anisotropic and Fractional Anisotropic Problems via Ljusternik-Schnirelmann Theory

Abstract

In this work, our interest lies in proving the existence of critical values of the following Rayleigh-type quotients Q p(u) = \|∇ u\| p\|u\| p, Q s, p(u) = [u] s, p\|u\| p, where p = (p1,…,pn), s=(s1,…,sn) and \|∇ u\| p = Σi=1n \|uxi\|pi is an anisotropic Sobolev norm, [u] s, p is a fractional version of the same anisotropic norm, and \|u\| p is an anisotropic Lebesgue norm. Using the Ljusternik-Schnirelmann theory, we prove the existence of a sequence of critical values and we also find an associated Euler-Lagrange equation for critical points. Additionally, we analyze the connection between the fractional critical values and its local counterparts.