Uniqueness of values of Aronsson operators and running costs in "tug-of-war" games

Abstract

Let AH be the Aronsson operator associated with a Hamiltonian H(x,z,p). Aronsson operators arise from L∞ variational problems, two person game theory, control problems, etc. In this paper, we prove, under suitable conditions, that if u∈ W1,∞ loc() is simultaneously a viscosity solution of both of the equations AH(u)=f(x) and AH(u)=g(x) in , where f, g∈ C(), then f=g. The assumption u∈ Wloc1,∞() can be relaxed to u∈ C() in many interesting situations. Also, we prove that if f,g,u∈ C() and u is simultaneously a viscosity solution of the equations ∞ u |Du|2=-f(x) and ∞u |Du|2=-g(x) in then f=g. This answers a question posed in Peres, Schramm, Scheffield and Wilson [PSSW] concerning whether or not the value function uniquely determines the running cost in the "tug-of-war" game.