Quadratic Reflected BSDEs with Unbounded Obstacles
Abstract
In this paper, we analyze a real-valued reflected backward stochastic differential equation (RBSDE) with an unbounded obstacle and an unbounded terminal condition when its generator has quadratic growth in the -variable. In particular, we obtain existence, comparison, and stability results, and consider the optimal stopping for quadratic -evaluations. As an application of our results we analyze the obstacle problem for semi-linear parabolic PDEs in which the non-linearity appears as the square of the gradient. Finally, we prove a comparison theorem for these obstacle problems when the generator is convex or concave in the -variable.
Keywords
Cite
@article{arxiv.1005.3565,
title = {Quadratic Reflected BSDEs with Unbounded Obstacles},
author = {Erhan Bayraktar and Song Yao},
journal= {arXiv preprint arXiv:1005.3565},
year = {2011}
}
Comments
Key Words: Quadratic reflected backward stochastic differential equations, convex/concave generator, $\th$-difference method, Legenre-Fenchel duality, optimal stopping problems for quadratic $g$-evaluations, stability, obstacle problems for semi-linear parabolic PDEs, viscosity solutions