Thin-thick approach to martingale representations on progressively enlarged filtrations

Abstract

We study the predictable representation property in the progressive enlargement Fτ of a reference filtration F by a random time τ. Our approach is based on the decomposition of any random time into two parts, one overlapping F-stopping times (thin part) and the other one that avoids F-stopping times (thick part). We assume that the F-thin part of τ is nontrivial and prove a martingale representation theorem on Fτ. We thus extend previous results dealing with F-avoiding random times. We collect some examples of application to the enlargement of the natural filtration of a L\'evy process.