Nonlinear self-stabilizing processes – I Existence, invariant probability, propagation of chaos

On The Unique Solvability Of Some Nonlinear Stochastic PDEs

Hyek Yoo

January 1998

: The Cauchy problem for 1-dimensional nonlinear stochastic partial differential equations is studie...

Published by Canadian Center of Science and Education Existence and Uniqueness for Stochastic Dynamic Equations

David Grow
Suman Sanyal

October 2016

The theory of stochastic dynamic equations extends and unifies the theories of stochastic difference...

Nonlinear SDEs driven by Lévy processes and related PDEs

Jourdain, Benjamin
Méléard, Sylvie
Woyczynski, Wojbor

July 2007

In this paper we study general nonlinear stochastic differential equations, where the usual Brownian...

Nonlinear self-stabilizing processes – I Existence, invariant probability, propagation of chaos

Benachour, S.
Roynette, B.
Talay, D.
Vallois, P.

July 1998

AbstractTaking an odd, non-decreasing function β, we consider the (nonlinear) stochastic differentia...

Non-uniqueness of stationary measures for self-stabilizing processes

Herrmann, S.
Tugaut, J.

July 2010

AbstractWe investigate the existence of invariant measures for self-stabilizing diffusions. These st...

Existence and uniqueness of a strong solution to stochastic differential equations in the plane with stochastic boundary process

Nualart, D
Yeh, J

January 1989

AbstractLet B be a 2-parameter Brownian motion on R+2. Consider the non-Markovian stochastic differe...

Nonlinear self-stabilizing processes – II: Convergence to invariant probability

Benachour, S.
Roynette, B.
Vallois, P.

July 1998

AbstractWe now analyze the asymptotic behaviour of Xt, as t approaches infinity, X being solution of...

Non uniqueness of stationary measures for self-stabilizing diffusions

S. Herrmann
J. Tugaut

July 2015

We investigate the existence of invariant measures for self-stabilizing diffusions. These stochastic...

Non-uniqueness of stationary measures for self-stabilizing processes

Herrmann, S.
Tugaut, J.

July 2010

AbstractWe investigate the existence of invariant measures for self-stabilizing diffusions. These st...

Non uniqueness of stationary measures for self-stabilizing diffusions

Herrmann, Samuel
Tugaut, Julian

January 2010

International audienceWe investigate the existence of invariant measures for self-stabilizing diffus...

On symmetric and skew Bessel processes

Blei, Stefan

September 2012

AbstractWe consider the one-dimensional stochastic differential equation Xt=x0+Bt+∫0tδ−12Xsds, where...

Stochastic differential equations driven by stable processes for which pathwise uniqueness fails

Bass, Richard F.
Burdzy, Krzysztof
Chen, Zhen-Qing

May 2004

AbstractLet Zt be a one-dimensional symmetric stable process of order α with α∈(0,2) and consider th...

Invariant measures for SDEs driven by Lévy noise: A case study for dissipative nonlinear drift in infinite dimension

DI PERSIO, Luca
Albeverio, Sergio
Mastrogiacomo, Elisa
Smii, Boubaker

January 2017

We study a class of nonlinear stochastic partial differential equations with dissipative nonlinear d...

Nonlinear self-stabilizing processes – II: Convergence to invariant probability

Benachour, S.
Roynette, B.
Vallois, P.

July 1998

AbstractWe now analyze the asymptotic behaviour of Xt, as t approaches infinity, X being solution of...

Stationary solutions of the stochastic differential equation with Lévy noise

Behme, Anita
Lindner, Alexander
Maller, Ross

For a given bivariate Lévy process (Ut,Lt)t>=0, necessary and sufficient conditions for the existenc...

On The Unique Solvability Of Some Nonlinear Stochastic PDEs

Hyek Yoo

January 1998

: The Cauchy problem for 1-dimensional nonlinear stochastic partial differential equations is studie...

Published by Canadian Center of Science and Education Existence and Uniqueness for Stochastic Dynamic Equations

David Grow
Suman Sanyal

October 2016

The theory of stochastic dynamic equations extends and unifies the theories of stochastic difference...

Nonlinear SDEs driven by Lévy processes and related PDEs

Jourdain, Benjamin
Méléard, Sylvie
Woyczynski, Wojbor

July 2007

In this paper we study general nonlinear stochastic differential equations, where the usual Brownian...

Nonlinear self-stabilizing processes – I Existence, invariant probability, propagation of chaos

Benachour, S.
Roynette, B.
Talay, D.
Vallois, P.

July 1998

AbstractTaking an odd, non-decreasing function β, we consider the (nonlinear) stochastic differentia...

Non-uniqueness of stationary measures for self-stabilizing processes

Herrmann, S.
Tugaut, J.

July 2010

AbstractWe investigate the existence of invariant measures for self-stabilizing diffusions. These st...

Existence and uniqueness of a strong solution to stochastic differential equations in the plane with stochastic boundary process

Nualart, D
Yeh, J

January 1989

AbstractLet B be a 2-parameter Brownian motion on R+2. Consider the non-Markovian stochastic differe...

Nonlinear self-stabilizing processes – II: Convergence to invariant probability

Benachour, S.
Roynette, B.
Vallois, P.

July 1998

AbstractWe now analyze the asymptotic behaviour of Xt, as t approaches infinity, X being solution of...

Non uniqueness of stationary measures for self-stabilizing diffusions

S. Herrmann
J. Tugaut

July 2015

We investigate the existence of invariant measures for self-stabilizing diffusions. These stochastic...

Non-uniqueness of stationary measures for self-stabilizing processes

Herrmann, S.
Tugaut, J.

July 2010

AbstractWe investigate the existence of invariant measures for self-stabilizing diffusions. These st...

Non uniqueness of stationary measures for self-stabilizing diffusions

Herrmann, Samuel
Tugaut, Julian

January 2010

International audienceWe investigate the existence of invariant measures for self-stabilizing diffus...

On symmetric and skew Bessel processes

Blei, Stefan

September 2012

AbstractWe consider the one-dimensional stochastic differential equation Xt=x0+Bt+∫0tδ−12Xsds, where...

Stochastic differential equations driven by stable processes for which pathwise uniqueness fails

Bass, Richard F.
Burdzy, Krzysztof
Chen, Zhen-Qing

May 2004

AbstractLet Zt be a one-dimensional symmetric stable process of order α with α∈(0,2) and consider th...

Invariant measures for SDEs driven by Lévy noise: A case study for dissipative nonlinear drift in infinite dimension

DI PERSIO, Luca
Albeverio, Sergio
Mastrogiacomo, Elisa
Smii, Boubaker

January 2017

We study a class of nonlinear stochastic partial differential equations with dissipative nonlinear d...

Nonlinear self-stabilizing processes – II: Convergence to invariant probability

Benachour, S.
Roynette, B.
Vallois, P.

July 1998

AbstractWe now analyze the asymptotic behaviour of Xt, as t approaches infinity, X being solution of...

Stationary solutions of the stochastic differential equation with Lévy noise

Behme, Anita
Lindner, Alexander
Maller, Ross

For a given bivariate Lévy process (Ut,Lt)t>=0, necessary and sufficient conditions for the existenc...

On The Unique Solvability Of Some Nonlinear Stochastic PDEs

Hyek Yoo

January 1998

: The Cauchy problem for 1-dimensional nonlinear stochastic partial differential equations is studie...

Published by Canadian Center of Science and Education Existence and Uniqueness for Stochastic Dynamic Equations

David Grow
Suman Sanyal

October 2016

The theory of stochastic dynamic equations extends and unifies the theories of stochastic difference...

Nonlinear SDEs driven by Lévy processes and related PDEs

Jourdain, Benjamin
Méléard, Sylvie
Woyczynski, Wojbor

July 2007

In this paper we study general nonlinear stochastic differential equations, where the usual Brownian...

Nonlinear self-stabilizing processes – I Existence, invariant probability, propagation of chaos

Abstract

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Nonlinear self-stabilizing processes – I Existence, invariant probability, propagation of chaos

Abstract

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