2010
DOI: 10.1002/cpa.20336
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A deterministic‐control‐based approach to fully nonlinear parabolic and elliptic equations

Abstract: We show that a broad class of fully nonlinear, second-order parabolic or elliptic PDEs can be realized as the Hamilton-Jacobi-Bellman equations of deterministic two-person games. More precisely: given the PDE, we identify a deterministic, discrete-time, two-person game whose value function converges in the continuous-time limit to the viscosity solution of the desired equation. Our game is, roughly speaking, a deterministic analogue of the stochastic representation recently introduced by Cheridito, Soner, Touz… Show more

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Cited by 53 publications
(50 citation statements)
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References 47 publications
(72 reference statements)
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“…This is actually proved for the anisotropic Allen-Cahn equation by Giga et al [61] when the driving force term is spatially homogeneous but in arbitrary dimensions. It is interesting to study recent differential game approximation by Kohn and Serfaty [79,80] of a solution although approximation scheme for singular interfacial energy is not yet given. For example it is interesting to give a differential game interpretation for crystalline curvature flow.…”
Section: Approximationmentioning
confidence: 99%
“…This is actually proved for the anisotropic Allen-Cahn equation by Giga et al [61] when the driving force term is spatially homogeneous but in arbitrary dimensions. It is interesting to study recent differential game approximation by Kohn and Serfaty [79,80] of a solution although approximation scheme for singular interfacial energy is not yet given. For example it is interesting to give a differential game interpretation for crystalline curvature flow.…”
Section: Approximationmentioning
confidence: 99%
“…From the results of [1,2,6] and the above calculations we expect that v is a viscosity subsolution of (7), (8). Fortunately, we need not care about the correctness of this conclusion, which is not evident in the present context.…”
Section: Prediction Game and The Limiting Pdementioning
confidence: 80%
“…In the case p = 1 the game is naturally related to the mean curvature flow [8] and functions of least gradient. Other extensions include the obstacle problems [15], finite difference schemes [2], equations with right hand side f = 0, mixed boundary data [1,3] and parabolic equations [9,14].…”
Section: Further Resultsmentioning
confidence: 99%