A new class of stochastic processes with great potential for interesting applications

Abstract

This paper contributes to the study of a new and remarkable family of stochastic processes that we will term class r(H). This class is potentially interesting because it unifies the study of two known classes: the class () and the class M(H). In other words, we consider the stochastic processes X which decompose as X=m+v+A, where m is a local martingale, v and A are finite variation processes such that dA is carried by \t≥0:Xt=0\ and the support of dv is H, the set of zeros of some continuous martingale D. First, we introduce a general framework. Thus, we provide some examples of elements of the new class and present some properties. Second, we provide a series of characterization results. Afterwards, we derive some representation results which permit to recover a process of the class r(H) from its final value and of the honest times g=\t≥0:Xt=0\ and γ=H. In final, we investigate an interesting application with processes presently studied. More precisely, we construct solutions for skew Brownian motion equations using stochastic processes of the class r(H).