Reflected backward stochastic differential equations under stopping with an arbitrary random time

Abstract

This paper addresses reflected backward stochastic differential equations (RBSDE hereafter) that take the form of eqnarray* cases dYt=f(t,Yt, Zt)d(tτ)+ZtdWtτ+dMt-dKt, Yτ=, Y≥ Son 0,τ, ∫0τ(Ys--Ss-)dKs=0 P-a.s..cases eqnarray* Here τ is an arbitrary random time that might not be a stopping time for the filtration F generated by the Brownian motion W. We consider the filtration G resulting from the progressive enlargement of F with τ where this becomes a stopping time, and study the RBSDE under G. Precisely, we focus on answering the following problems: a) What are the sufficient minimal conditions on the data (f, , S, τ) that guarantee the existence of the solution of the G-RBSDE in Lp (p>1)? b) How can we estimate the solution in norm using the triplet-data (f, , S)? c) Is there an RBSDE under F that is intimately related to the current one and how their solutions are related to each other? We prove that for any random time, having a positive Az\'ema supermartingale, there exists a positive discount factor E that is vital in answering our questions without assuming any further assumption on τ, and determining the space for the triplet-data (f,, S) and the space for the solution of the RBSDE as well.