On the differentiability of the solutions of non-local Isaacs equations involving 12-Laplacian

Abstract

We derive C1,σ-estimate for the solutions of a class of non-local elliptic Bellman-Isaacs equations. These equations are fully nonlinear and are associated with infinite horizon stochastic differential game problems involving jump-diffusions. The non-locality is represented by the presence of fractional order diffusion term and we deal with the particular case of 12-Laplacian, where the order 12 is known as the critical order in this context. More importantly, these equations are not translation invariant and we prove that the viscosity solutions of such equations are C1,σ, making the equations classically solvable.