AbstractAn arbitrary jump process is considered without any assumption about the jump times and allowing the jump times to have accumulation points of arbitrary order. Certain basic martingales q(t, A) and the related Lévy system describing the jumps are introduced, and a notion of quadratic integration with respect to the predictable quadratic variation <q, q> of the basic martingales is defined. If Mt is a (locally) square integrable martingale with respect to the family of σ-fields generated by the jump process it is shown that Mt can be represented as a stochastic integral with respect to the basic martingales and with an integrand (locally) square integrable with respect to <q, q>
Integration-by-parts formulas for functions of fundamental jump processes relating to a continuous-t...
A new integral with respect to an integer-valued random measure is introduced. In contrast to the fi...
AbstractThe only normal martingales which posses the chaotic representation property and the weaker ...
AbstractAn arbitrary jump process is considered without any assumption about the jump times and allo...
Many results in stochastic analysis and mathematical finance involve local martingales. However, spe...
AbstractLet M be a square integrable martingale indexed by [0, 1]2 with respect to a filtration whic...
Abstract. The paper is a contribution to the theory of martingales of processes whose sample paths a...
Examples of square integrable martingales adapted to processes with independent increments and ortho...
1. Introduction and summary. This paper is concerned with applying the theory of martingales of jump...
AbstractExamples of square integrable martingales adapted to processes with independent increments a...
AbstractIn this paper, we shall firstly illustrate why we should consider integral of a stochastic p...
AbstractLet {Xt} be a continuous square integrable martingale. Denote its increasing (natural) proce...
Abstract. In this paper, we present two related results. First, we shall obtain a sufficient conditi...
We propose a theory of stochastic integration with respect to a sequence of semimartingales, start...
In this note we develop the theory of stochastic integration w.r.t. continuous local martingales usi...
Integration-by-parts formulas for functions of fundamental jump processes relating to a continuous-t...
A new integral with respect to an integer-valued random measure is introduced. In contrast to the fi...
AbstractThe only normal martingales which posses the chaotic representation property and the weaker ...
AbstractAn arbitrary jump process is considered without any assumption about the jump times and allo...
Many results in stochastic analysis and mathematical finance involve local martingales. However, spe...
AbstractLet M be a square integrable martingale indexed by [0, 1]2 with respect to a filtration whic...
Abstract. The paper is a contribution to the theory of martingales of processes whose sample paths a...
Examples of square integrable martingales adapted to processes with independent increments and ortho...
1. Introduction and summary. This paper is concerned with applying the theory of martingales of jump...
AbstractExamples of square integrable martingales adapted to processes with independent increments a...
AbstractIn this paper, we shall firstly illustrate why we should consider integral of a stochastic p...
AbstractLet {Xt} be a continuous square integrable martingale. Denote its increasing (natural) proce...
Abstract. In this paper, we present two related results. First, we shall obtain a sufficient conditi...
We propose a theory of stochastic integration with respect to a sequence of semimartingales, start...
In this note we develop the theory of stochastic integration w.r.t. continuous local martingales usi...
Integration-by-parts formulas for functions of fundamental jump processes relating to a continuous-t...
A new integral with respect to an integer-valued random measure is introduced. In contrast to the fi...
AbstractThe only normal martingales which posses the chaotic representation property and the weaker ...