One dimensional reflected BSDEs with two barriers under logarithmic growth and applications

Abstract

In this paper we deal with the problem of the existence and the uniqueness of a solution for one dimensional reflected backward stochastic differential equations with two strictly separated barriers when the generator is allowing a logarithmic growth (|y|||y||+|z|||z||) in the state variables y and z. The terminal value and the obstacle processes (Lt)0≤ t≤ T and (Ut)0≤ t≤ T are Lp-integrable for a suitable p > 2. The main idea is to use the concept of local solution to construct the global one. As applications, we broaden the class of functions for which mixed zero-sum stochastic differential games admit an optimal strategy and the related double obstacle partial differential equation problem has a unique viscosity solution.