Linking progressive and initial filtration expansions

TL;DR

This paper explores the relationship between progressive and initial filtration expansions with random times, providing new methods to derive semimartingale decompositions and extending results to multiple random times without restrictions.

Contribution

It introduces a natural link between progressive and initial expansions, enabling new derivations and generalizations for multiple random times in filtration theory.

Findings

Established a link between progressive and initial expansions after a random time.

Extended methods to multiple random times without ordering restrictions.

Provided insights into filtration shrinkage and potential generalizations.

Abstract

In this paper we study progressive filtration expansions with random times. We show how semimartingale decompositions in the expanded filtration can be obtained using a natural link between progressive and initial expansions. The link is, on an intuitive level, that the two coincide after the random time. We make this idea precise and use it to establish known and new results in the case of expansion with a single random time. The methods are then extended to the multiple time case, without any restrictions on the ordering of the individual times. Finally we study the link between the expanded filtrations from the point of view of filtration shrinkage. As the main analysis progresses, we indicate how the techniques can be generalized to other types of expansions.