Game-theoretic approach to H\"older regularity for PDEs involving eigenvalues of the Hessian

Abstract

We prove a local H\"older estimate with an exponent 0<δ< 12 for solutions of the dynamic programming principle u (x) =Σj=1n αj∈f(S)=jv∈ S\\ |v|=1 u (x + v) + u (x - v)2. The proof is based on a new coupling idea from game theory. As an application, we get the same regularity estimate for viscosity solutions of the PDE Σi=1n αiλi(D2u)=0, where λ1(D2 u)≤·s≤ λn(D2 u) are the eigenvalues of the Hessian.

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