Higher Sobolev regularity on the mixed local and nonlocal p-Laplace equations

Abstract

We develop a systematic study of the interior Sobolev regularity of weak solutions to the mixed local and nonlocal p-Laplace equations. To be precise, we show that the weak solution u belongs to W2, ploc and even W2, 2 loc Sobolev spaces in the subquadratic case, while |∇ u|p-22∇ u is of the class W1, 2loc in the superquadratic scenario, both of which coincide with that of the classical p-Laplace equations. Moreover, an improved higher fractional differentiability and integrability result u∈ W1+β, qloc is proved in the full range p∈ (1, ∞) for any q∈ [\p, 2\, ∞) and β∈(0, 2q). The main analytical tools are the finite difference quotient technique, suitable energy method and tail estimates. As far as we know, our results are new within the context of such mixed problems.