Linear reflected backward stochastic differential equations arising from vulnerable claims in markets with random horizon

Abstract

This paper considers the setting governed by (F,τ), where F is the "public" flow of information, and τ is a random time which might not be F-observable. This framework covers credit risk theory and life insurance. In this setting, we assume F being generated by a Brownian motion W and consider a vulnerable claim , whose payment's policy depends essentially on the occurrence of τ. The hedging problems, in many directions, for this claim led to the question of studying the linear reflected-backward-stochastic differential equations (RBSDE hereafter), equation* split &dYt=f(t)d(tτ)+ZtdWtτ+dMt-dKt, Yτ=,\\ & Y≥ Son 0,τ, ∫0τ(Ys--Ss-)dKs=0 P-a.s..split equation* This is the objective of this paper. For this RBSDE and without any further assumption on τ that might neglect any risk intrinsic to its stochasticity, we answer the following: a) What are the sufficient minimal conditions on the data (f, , S, τ) that guarantee the existence of the solution to this RBSDE? b) How can we estimate the solution in norm using (f, , S)? c) Is there an F-RBSDE that is intimately related to the current one and how their solutions are related to each other? This latter question has practical and theoretical leitmotivs.