H
Hung V. Tran
Researcher at University of Wisconsin-Madison
Publications - 103
Citations - 1088
Hung V. Tran is an academic researcher from University of Wisconsin-Madison. The author has contributed to research in topics: Hamilton–Jacobi equation & Homogenization (chemistry). The author has an hindex of 20, co-authored 91 publications receiving 925 citations. Previous affiliations of Hung V. Tran include University of Chicago & University of California.
Papers
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Selection problems for a discount degenerate viscous Hamilton–Jacobi equation
Hiroyoshi Mitake,Hung V. Tran +1 more
TL;DR: In this article, it was shown that the solution of the discounted approximation of a degenerate viscous Hamilton-Jacobi equation with convex Hamiltonians converges to the corresponding ergodic problem.
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Viscosity solutions of general viscous Hamilton–Jacobi equations
Scott N. Armstrong,Hung V. Tran +1 more
TL;DR: In this article, the authors present comparison principles, Lipschitz estimates and study state constraints problems for degenerate, second-order Hamilton-Jacobi equations with respect to state constraints.
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Stochastic homogenization of nonconvex Hamilton-Jacobi equations in one space dimension
TL;DR: In this paper, the authors prove stochastic homogenization for a general class of coercive, nonconvex Hamilton-Jacobi equations in one space dimension, and some properties of the effective Hamiltonian arising in the non-Convex case are also discussed.
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Stochastic homogenization of viscous Hamilton–Jacobi equations and applications
Scott N. Armstrong,Hung V. Tran +1 more
TL;DR: In this paper, the authors present stochastic homogenization results for viscous Hamilton-Jacobi equations using a new argument which is based only on the subadditive structure of maximal subsolutions (solutions of the "metric problem").
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Stochastic homogenization of a nonconvex Hamilton-Jacobi equation
TL;DR: In this paper, the authors present a proof of qualitative stochastic homogenization for a nonconvex Hamilton-Jacobi equation by introducing a family of sub-equations and controlling solutions of the original equation by the maximal subsolutions of the latter, which have deterministic limits.