On singular problems associated with mixed operators under mixed boundary conditions

Abstract

In this paper, we study the following singular problem associated with mixed operators (the combination of the classical Laplace operator and the fractional Laplace operator) under mixed boundary conditions equation* 1 \ aligned Lu &= g(u), u > 0 in , u &= 0 in Uc, Ns(u) &= 0 in N, ∂ u∂ &= 0 in ∂ N, aligned . Pλ equation* where U= ( N (∂N)), ⊂eq RN is a non empty open set, D, N are open subsets of RN such that D N= RN, D N= and N is a bounded set with smooth boundary, λ >0 is a real parameter and L= -+(-)s,~ for~s ∈ (0, 1). Here g(u)=u-q or g(u)= λ u-q+ up with 0<q<1<p≤ 2*-1. We study (Pλ) to derive the existence of weak solutions along with its L∞-regularity. Moreover, some Sobolev-type variational inequalities associated with these weak solutions are established.