We develop a stochastic calculus on the plane with respect to the local times of a large class of Lévy processes. We can then extend to these Lévy processes an Itô formula that was established previously for Brownian motion. Our method provides also a multidimensional version of the formula. We show that this formula generates many "Itô formulas" that fit various problems. In the special case of a linear Brownian motion, we recover a recently established Itô formula that involves local times on curves. This formula is already used in financial mathematics.Lévy processes Stochastic calculus Local time Ito formula
Stochastic integration \textit{wrt} Gaussian processes has raised strong interest in recent years, m...
"Stochastic calculus provides a powerful description of a specific class of stochastic processes in ...
The classical Ray-Knight theorems for Brownian motion determine the law of its local time process ei...
AbstractWe develop a stochastic calculus on the plane with respect to the local times of a large cla...
The aim of this work is to define and perform a study of local times of all Gaussian processes that ...
We study a notion of local time for a continuous path, defined as a limit of suitable discrete quant...
International audienceStochastic integration with respect to Gaussian processes has raised strong in...
Introduction by the Organisers Itô's formula has been celebrated as a fundamental extension of...
This book offers a rigorous and self-contained presentation of stochastic integration and stochastic...
Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 20...
AbstractWe construct a stochastic calculus with respect to the local time process of a symmetric Lév...
Stochastic Calculus has found a wide range of applications in analyzing the evolution of many natura...
Stochastic integration with respect to Gaussian processes, such as fractional Brownian motion (fBm) ...
AbstractIn this paper, we use the formula for the Itô–Wiener expansion of the solution of the stocha...
We define a local time flow of skew Brownian motions, i.e., a family of solutions to the stochastic ...
Stochastic integration \textit{wrt} Gaussian processes has raised strong interest in recent years, m...
"Stochastic calculus provides a powerful description of a specific class of stochastic processes in ...
The classical Ray-Knight theorems for Brownian motion determine the law of its local time process ei...
AbstractWe develop a stochastic calculus on the plane with respect to the local times of a large cla...
The aim of this work is to define and perform a study of local times of all Gaussian processes that ...
We study a notion of local time for a continuous path, defined as a limit of suitable discrete quant...
International audienceStochastic integration with respect to Gaussian processes has raised strong in...
Introduction by the Organisers Itô's formula has been celebrated as a fundamental extension of...
This book offers a rigorous and self-contained presentation of stochastic integration and stochastic...
Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 20...
AbstractWe construct a stochastic calculus with respect to the local time process of a symmetric Lév...
Stochastic Calculus has found a wide range of applications in analyzing the evolution of many natura...
Stochastic integration with respect to Gaussian processes, such as fractional Brownian motion (fBm) ...
AbstractIn this paper, we use the formula for the Itô–Wiener expansion of the solution of the stocha...
We define a local time flow of skew Brownian motions, i.e., a family of solutions to the stochastic ...
Stochastic integration \textit{wrt} Gaussian processes has raised strong interest in recent years, m...
"Stochastic calculus provides a powerful description of a specific class of stochastic processes in ...
The classical Ray-Knight theorems for Brownian motion determine the law of its local time process ei...