Drifts of symmetrizable diffusions in infinite dimensions are shown to be logarithmic derivatives of measures. Existence and regularity results for the corresponding measures of infinite dimensional diffusions are provedAvailable from TIB Hannover: RO 5389(322) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Technische InformationsbibliothekSIGLEDEGerman
The background of the reaction-diffusion processes can be found in Haken[4] and Yan and Lee[11]. For...
Roelly S, Zessin HN. Une caractérisation des diffusions par le calcul des variations stochastiques. ...
We study the long time behaviour of a large class of diffusion processes on RN, generated by second ...
Stochastic processes in infinite dimensional state spaces provide a mathematical description of vari...
Albeverio S, Bogachev V, Röckner M. On uniqueness of invariant measures for finite- and infinite-dim...
The work is to devoted to studying non-linear transformations of the measures in the infinite-dimens...
SIGLEAvailable from British Library Document Supply Centre-DSC:DXN021056 / BLDSC - British Library D...
Bogachev VI, Röckner M. Regularity of Invariant Measures on Finite and Infinite Dimensional Spaces a...
Abstract. Consider an infinite dimensional diffusion process process on TZ d, where T is the circle,...
AbstractIn this paper we prove new results on the regularity (i.e., smoothness) of measures μ solvin...
Bogachev VI, Wang FY, Röckner M. Elliptic equations associated with invariant measures of diffusions...
We obtain sufficient conditions in terms of Lyapunov functions for the existence of invariant measur...
Röckner M, Schmuland B. A support property for infinite-dimensional interacting diffusion processes....
A homogenization problem of infinite dimensional diffusion processes indexed by Z having periodic dr...
AbstractWe obtain sufficient conditions in terms of Lyapunov functions for the existence of invarian...
The background of the reaction-diffusion processes can be found in Haken[4] and Yan and Lee[11]. For...
Roelly S, Zessin HN. Une caractérisation des diffusions par le calcul des variations stochastiques. ...
We study the long time behaviour of a large class of diffusion processes on RN, generated by second ...
Stochastic processes in infinite dimensional state spaces provide a mathematical description of vari...
Albeverio S, Bogachev V, Röckner M. On uniqueness of invariant measures for finite- and infinite-dim...
The work is to devoted to studying non-linear transformations of the measures in the infinite-dimens...
SIGLEAvailable from British Library Document Supply Centre-DSC:DXN021056 / BLDSC - British Library D...
Bogachev VI, Röckner M. Regularity of Invariant Measures on Finite and Infinite Dimensional Spaces a...
Abstract. Consider an infinite dimensional diffusion process process on TZ d, where T is the circle,...
AbstractIn this paper we prove new results on the regularity (i.e., smoothness) of measures μ solvin...
Bogachev VI, Wang FY, Röckner M. Elliptic equations associated with invariant measures of diffusions...
We obtain sufficient conditions in terms of Lyapunov functions for the existence of invariant measur...
Röckner M, Schmuland B. A support property for infinite-dimensional interacting diffusion processes....
A homogenization problem of infinite dimensional diffusion processes indexed by Z having periodic dr...
AbstractWe obtain sufficient conditions in terms of Lyapunov functions for the existence of invarian...
The background of the reaction-diffusion processes can be found in Haken[4] and Yan and Lee[11]. For...
Roelly S, Zessin HN. Une caractérisation des diffusions par le calcul des variations stochastiques. ...
We study the long time behaviour of a large class of diffusion processes on RN, generated by second ...