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A continuous time tug-of-war game for parabolic $p(x,t)$-Laplace type equations

2019

We formulate a stochastic differential game in continuous time that represents the unique viscosity solution to a terminal value problem for a parabolic partial differential equation involving the normalized $p(x,t)$-Laplace operator. Our game is formulated in a way that covers the full range $1<p(x,t)<\infty$. Furthermore, we prove the uniqueness of viscosity solutions to our equation in the whole space under suitable assumptions.

050208 financeLaplace transformApplied MathematicsGeneral MathematicsTug of warProbability (math.PR)010102 general mathematics05 social sciencesMathematical analysisType (model theory)01 natural sciencesParabolic partial differential equationTerminal valueMathematics - Analysis of PDEs0502 economics and businessDifferential gameFOS: Mathematics91A15 49L25 35K650101 mathematicsViscosity solutionMathematics - ProbabilityAnalysis of PDEs (math.AP)Mathematics
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