Tomasz Klimsiak, Andrzej Rozkosz
Published 2013-01-24, updated 2015-01-13Version 2
We consider the obstacle problem with two irregular reflecting barriers for the Cauchy-Dirichlet problem for semilinear parabolic equations with measure data. We prove the existence and uniqueness of renormalized solutions of the problem and well as results on approximation of the solutions by the penaliztion method. In the proofs we use probabilistic methods of the theory of Markov processes and the theory of backward stochastic differential equations.
Obstacle problem for evolution equations involving measure data and operator corresponding to semi-Dirichlet form
Renormalized solutions of semilinear equations involving measure data and operator corresponding to Dirichlet form
Convergence rates for Poisson learning to a Poisson equation with measure data
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