Filtration shrinkage by level-crossings of a diffusion

Abstract

We develop the mathematics of a filtration shrinkage model that has recently been considered in the credit risk modeling literature. Given a finite collection of points x1<...<xN in R, the region indicator function R(x) assumes the value i if x∈(xi-1,xi]. We take F to be the filtration generated by (R(Xt))t≥0, where X is a diffusion with infinitesimal generator A. We prove a martingale representation theorem for F in terms of stochastic integrals with respect to N random measures whose compensators have a simple form given in terms of certain L\'evy measures Fji, which are related to the differential equation Au=λ u.