On The Weak Representation Property in Progressively Enlarged Filtrations with an Application to Exponential Utility Maximization

Abstract

In this paper we show that the weak representation property of a semimartingale X with respect to a filtration F is preserved in the progressive enlargement G by a random time τ avoiding F-stopping times and such that F is immersed in G. As an application of this, we can solve an exponential utility maximization problem in the enlarged filtration G following the dynamical approach, based on suitable BSDEs, both over the fixed time horizon [0,T], T>0, and over [0,Tτ].