Regularity results for Choquard equations involving fractional p-Laplacian

Abstract

In this article, first we address the regularity of weak solution for a class of p-fractional Choquard equations: equation* \;\;\; .arrayrl (-)psu&=(∫F(y,u)|x-y|μdy)f(x,u),5mmx∈ , u&=0,35mmx∈ RN , array \ equation* where ⊂ RN is a smooth bounded domain, 1<p<∞ and 0<s<1 such that sp<N, 0<μ<\N,2sp\ and f:× R R is a continuous function with at most critical growth condition (in the sense of Hardy-Littlewood-Sobolev inequality) and F is its primitive. Next, for p≥2, we discuss the Sobolev versus H\"older minimizers of the energy functional J associated to the above problem, and using that we establish the existence of the local minimizer of J in the fractional Sobolev space W0s,p(). Moreover, we discuss the aforementioned results by adding a local perturbation term (at most critical in the sense of Sobolev inequality) in the right-hand side in the above equation.