Regularity of Weak Solutions for Singular Elliptic Problems Driven by m-Laplace Operator

Abstract

We obtain optimal regularity in the Sobolev space W01,τ() for the unique solution of -m u=K(x)u-p in , u=0on∂ . Here ⊂ RN is a smooth and bounded domain, m>1, p≥ 0 and K∈ C() is a positive function that behaves like dist(x,∂)-q for some q≥ 0 with p+q< 2-1-pm. We obtain that the unique weak solution to the above problem belongs to W01,τ() for m≤ τ<m+p-1p+q-1 ifp+q>1, and m≤ τ<∞ ifp+q=1. The above range of τ is optimal.