Regularity results for solutions of mixed local and nonlocal elliptic equations

Abstract

We consider the mixed local-nonlocal semi-linear elliptic equations driven by the superposition of Brownian and L\'evy processes equation* \ arrayll - u + (-)s u = g(x,u) & in , u=0 & in Rn. \\ array . equation* Under mild assumptions on the nonlinear term g, we show the L∞ boundedness of any weak solution (either not changing sign or sign-changing) by the Moser iteration method. Moreover, when s∈ (0, 12], we obtain that the solution is unique and actually belongs to C1,α() for any α∈ (0,1).