Random walk approximation of BSDEs with Hölder continuous terminal condition
Geiss, C., Labart, C., & Luoto, A. (2020). Random walk approximation of BSDEs with Hölder continuous terminal condition. Bernoulli, 26(1), 159-190. https://doi.org/10.3150/19-BEJ1120
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BernoulliDate
2020Copyright
© 2020 ISI/BS
In this paper, we consider the random walk approximation of the solution of a Markovian BSDE whose terminal condition is a locally Hölder continuous function of the Brownian motion. We state the rate of the L2-convergence of the approximated solution to the true one. The proof relies in part on growth and smoothness properties of the solution u of the associated PDE. Here we improve existing results by showing some properties of the second derivative of u in space.
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International Statistical InstituteISSN Search the Publication Forum
1350-7265Keywords
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https://converis.jyu.fi/converis/portal/detail/Publication/33652003
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