Local behaviour and existence of solutions of the fractional (p,q)-Laplacian

Abstract

In this paper, we consider the regularity of weak solutions (in an appropriate space) to the elliptic partial differential equation equation* (-p)s u + (-q)s u = f(x) in RN, equation* where 0<s<1 and 2 ≤ q ≤ p < N/s. We prove that these solutions are locally in C0,α(RN), which seems to be optimal. Furthermore, we prove the existence of solutions to the problem equation* (-p)s u + (-q)s u = u p*s-2u + λ g(x) u r-2u \,\,\, in \,\,\,\, RN, equation* where 1 < q≤ p < N/s, λ is a parameter and g satisfies some conditions of integrability. We also show that, if g is bounded, then the solutions are continuous and bounded.