We consider the initial and progressive enlargements of a filtration generated by a marked point process (called the reference filtration) with a strictly positive random time. We assume Jacod's equivalence hypothesis, that is, the existence of a strictly positive conditional density for the random time with respect to the reference filtration. Then, starting with the predictable integral representation of a martingale in the initially enlarged reference filtration, we derive explicit expressions for the coefficients which appear in the predictable integral representations for the optional projections of the martingale on the progressively enlarged filtration and on the reference filtration. We also provide similar results for the optional ...
The strong predictable representation property of semi-martingales and the notion of enlargement of ...
AbstractThe preservation of the semi-martingale property in progressive enlargement of filtrations h...
AbstractLet M be a purely discontinuous martingale relative to a filtration (Ft). Given an arbitrary...
We consider the initial and progressive enlargements of a filtration generated by a marked point pro...
We consider the initial and progressive enlargements of a filtration generated by a marked point pro...
In this paper, we consider two kinds of enlargements of a Brownian filtration F: the initial enlarge...
We consider the initial and progressive enlargements of a Brownian filtration with a random time, th...
Let X be a point process and let F denote the filtration generated by X. In this paper we study mart...
This work is concerned with the theory of initial and progressive enlargements of a refere...
We treat an extension of Jacod's theorem for initial enlargement of filtrations with respect to rand...
We study problems related to the predictable representation property for a progressive enlargement G...
In this article, we define the notion of a filtration and the related notion of the usual hypotheses...
In this paper, we construct strictly positive conditional probability densities with respect to the ...
Let X and Y be an m-dimensional F-semi-martingale and an n-dimensional H-semi-martingale, respective...
AbstractIn this paper we transfer martingale representation theorems from some given filtration F to...
The strong predictable representation property of semi-martingales and the notion of enlargement of ...
AbstractThe preservation of the semi-martingale property in progressive enlargement of filtrations h...
AbstractLet M be a purely discontinuous martingale relative to a filtration (Ft). Given an arbitrary...
We consider the initial and progressive enlargements of a filtration generated by a marked point pro...
We consider the initial and progressive enlargements of a filtration generated by a marked point pro...
In this paper, we consider two kinds of enlargements of a Brownian filtration F: the initial enlarge...
We consider the initial and progressive enlargements of a Brownian filtration with a random time, th...
Let X be a point process and let F denote the filtration generated by X. In this paper we study mart...
This work is concerned with the theory of initial and progressive enlargements of a refere...
We treat an extension of Jacod's theorem for initial enlargement of filtrations with respect to rand...
We study problems related to the predictable representation property for a progressive enlargement G...
In this article, we define the notion of a filtration and the related notion of the usual hypotheses...
In this paper, we construct strictly positive conditional probability densities with respect to the ...
Let X and Y be an m-dimensional F-semi-martingale and an n-dimensional H-semi-martingale, respective...
AbstractIn this paper we transfer martingale representation theorems from some given filtration F to...
The strong predictable representation property of semi-martingales and the notion of enlargement of ...
AbstractThe preservation of the semi-martingale property in progressive enlargement of filtrations h...
AbstractLet M be a purely discontinuous martingale relative to a filtration (Ft). Given an arbitrary...