Integration-by-parts formulas for functions of fundamental jump processes relating to a continuous-time, finite-state Markov chain are derived using Bismut's change of measures approach to Malliavin calculus. New expressions for the integrands in stochastic integrals corresponding to representations of martingales for the fundamental jump processes are derived using the integration-by-parts formulas. These results are then applied to hedge contingent claims in a Markov chain financial market, which provides a practical motivation for the developments of the integration-by-parts formulas and the martingale representations.11 page(s
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It has been 15 years since the first edition of Stochastic Integration and Differential Equations, A...
This thesis deals with the stochastic integral with respect to Gaussian processes, which can be expr...
This thesis is concerned withapplications of Malliavin-like calculus for jump processes. In thefirst...
AbstractUsing a perturbation of the rate of a Poisson process and an inverse time change, an integra...
International audienceWe establish an integration by parts formula in an abstract framework in order...
Abstract. The paper is a contribution to the theory of martingales of processes whose sample paths a...
AbstractIn recent years efficient methods have been developed for calculating derivative price sensi...
We use the Malliavin calculus for Poisson processes in order to compute sensitivities for European o...
AbstractThe integrand, when a martingale under an equivalent measure is represented as a stochastic ...
This paper considers an approach of Malliavin calculus to obtain the hedging ratio for mean-variance...
In this paper we present a martingale formula for Markov processes and their integrated process. Thi...
AbstractWe proved the validity of the asymptotic expansion for the distribution of a martingale with...
This paper presents an original probabilistic method for the numerical computations of Greeks (i.e. ...
AbstractAn arbitrary jump process is considered without any assumption about the jump times and allo...
A general stochastic integration theory for adapted and instantly independent stochastic processes a...
It has been 15 years since the first edition of Stochastic Integration and Differential Equations, A...
This thesis deals with the stochastic integral with respect to Gaussian processes, which can be expr...
This thesis is concerned withapplications of Malliavin-like calculus for jump processes. In thefirst...