Abstract
We introduce a new formulation of Dirichlet problem for a class of first order, nonlinear equations containing the minimum time problem, whose solution is expected to be discontinuous. We prove existence, uniqueness and representation formulas for the solution in the sense of viscosity solutions. Our method relies on a new way of prescribing the boundary condition, the use of recent ideas of Barron-Jensen [8] and Barles [5] , and the derivation of a backwards dynamic programming principle. We use the same ideas to prove uniqueness for the usual Dicchlet type formulation, following Ishii [13] and Bales-Perthame [6], under additional regularity conditions on the domain.
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