Add to ORKGWe consider a stochastic Volterra integral equation with regular path-dependent coefficients and a Brownian motion as integrator in a multidimensional setting. Under an imposed absolute continuity condition, the unique solution is a semimartingale that admits almost surely Hölder continuous paths. Based on functional Itô calculus, we prove that the support of its law in the Hölder norm can be described by a flow of mild solutions to ordinary integro-differential equations that are constructed by means of the vertical derivative of the diffusion coefficient
Functional Itô calculus was introduced in order to expand a functional F(t,X.+t,Xt) depending on tim...
Functional Itô calculus was introduced in order to expand a functional F(t,X.+t,Xt) depending on tim...
AbstractExistence, uniqueness and continuity properties of solutions of stochastic Volterra equation...
Given a stochastic differential equation with path-dependent coefficients driven by a multidimension...
The paper reminds the basic ideas of stochastic calculus via regularizations in Banach spaces and it...
Given a stochastic differential equation with path-dependent coefficients driven by a multidimension...
Given a stochastic differential equation with path-dependent coefficients driven by a multidimension...
In this paper, we characterise path-independence of additive functionals for stochastic Volterra equ...
We consider stochastic Volterra integral equations driven by a fractional Brownian motion with Hurst...
This thesis is devoted to study delay/path-dependent stochastic differential equations and their con...
AbstractIn this paper we establish the existence and uniqueness of a solution for stochastic Volterr...
The Volterra square-root process on $\mathbb{R}_+^m$ is an affine Volterra process with continuous s...
AbstractWe define and solve Volterra equations driven by a non-differentiable signal, by means of a ...
Functional Itô calculus was introduced in order to expand a functional F(t,X.+t,Xt) depending on tim...
Functional Itô calculus was introduced in order to expand a functional F(t,X.+t,Xt) depending on tim...
Functional Itô calculus was introduced in order to expand a functional F(t,X.+t,Xt) depending on tim...
Functional Itô calculus was introduced in order to expand a functional F(t,X.+t,Xt) depending on tim...
AbstractExistence, uniqueness and continuity properties of solutions of stochastic Volterra equation...
Given a stochastic differential equation with path-dependent coefficients driven by a multidimension...
The paper reminds the basic ideas of stochastic calculus via regularizations in Banach spaces and it...
Given a stochastic differential equation with path-dependent coefficients driven by a multidimension...
Given a stochastic differential equation with path-dependent coefficients driven by a multidimension...
In this paper, we characterise path-independence of additive functionals for stochastic Volterra equ...
We consider stochastic Volterra integral equations driven by a fractional Brownian motion with Hurst...
This thesis is devoted to study delay/path-dependent stochastic differential equations and their con...
AbstractIn this paper we establish the existence and uniqueness of a solution for stochastic Volterr...
The Volterra square-root process on $\mathbb{R}_+^m$ is an affine Volterra process with continuous s...
AbstractWe define and solve Volterra equations driven by a non-differentiable signal, by means of a ...
Functional Itô calculus was introduced in order to expand a functional F(t,X.+t,Xt) depending on tim...
Functional Itô calculus was introduced in order to expand a functional F(t,X.+t,Xt) depending on tim...
Functional Itô calculus was introduced in order to expand a functional F(t,X.+t,Xt) depending on tim...
Functional Itô calculus was introduced in order to expand a functional F(t,X.+t,Xt) depending on tim...
AbstractExistence, uniqueness and continuity properties of solutions of stochastic Volterra equation...