C1,α regularity for the normalized p-Poisson problem
Abstract
We consider the normalized p-Poisson problem -Np u=f in . The normalized p-Laplacian pNu:=|D u|2-pp u is in non-divergence form and arises for example from stochastic games. We prove C1,αloc regularity with nearly optimal α for viscosity solutions of this problem. In the case f∈ L∞ C and p>1 we use methods both from viscosity and weak theory, whereas in the case f∈ Lq C, q>(n, p2,2), and p>2 we rely on the tools of nonlinear potential theory.
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