Existence and L∞-estimates for elliptic equations involving convolution

Abstract

In this paper, with a fixed p∈ (1,+∞) and a bounded domain ⊂ RN whose boundary ∂ fulfills the C1 regularity, we study a boundary value problem involving a nonlocal operator assigning to u the convolution E(u) of with E(u), where is an integrable function on RN and E is an extension operator related to . Under verifiable conditions, we prove the existence of a (weak) solution to our problem by using the surjectivity theorem for pseudomonotone operators. Moreover, through a modified version of Moser iteration up to the boundary, we show that (any) weak solution to our problem is bounded.