Backward stochastic differential equations with random stopping time and singular final condition

Abstract

In this paper we are concerned with one-dimensional backward stochastic differential equations (BSDE in short) of the following type: \[Yt= -∫t ττYr|Yr|q dr-∫t ττZr dBr, t≥ 0,\] where τ is a stopping time, q is a positive constant and is a Fτ-measurable random variable such that P( =+∞)>0. We study the link between these BSDE and the Dirichlet problem on a domain D⊂ Rd and with boundary condition g, with g=+∞ on a set of positive Lebesgue measure. We also extend our results for more general BSDE.