Bogachev VI, Wang FY, Röckner M. Elliptic equations associated with invariant measures of diffusions on finite- and infinite-dimensional manifolds. Doklady Mathematics . 2001;63(3):351-354
Abstract. Consider an infinite dimensional diffusion process process on TZ d, where T is the circle,...
Thesis (Ph.D.)--University of Washington, 2018Harmonic/elliptic measure arises naturally in probabil...
This book presents a comprehensive study of boundary value problems for linear and semilinear second...
Bogachev VI, Röckner M, Wang F-Y. Elliptic equations for invariant measures on finite and infinite d...
Bogachev V, Röckner M, Wang F-Y. Elliptic equations for invariant measures on Riemannian manifolds: ...
AbstractWe obtain sufficient conditions in terms of Lyapunov functions for the existence of invarian...
Bogachev VI, Röckner M. Elliptic equations for measures on infinite dimensional spaces and applicati...
Bogachev VI, Röckner M, Stannat W. Uniqueness of solutions of elliptic equations and uniqueness of i...
Albeverio S, Bogachev V, Röckner M. On uniqueness of invariant measures for finite- and infinite-dim...
Bogachev VI, Da Prato G, Röckner M. Parabolic equations for measures on infinite-dimensional spaces....
AbstractConsider a finite or infinite dimensional space X with a diffusion having an invariant measu...
AbstractIn this paper, we study a suitable notion of solution for which a nonlinear elliptic problem...
This paper is devoted to the study of the existence and uniqueness of the invariant measure associat...
Drifts of symmetrizable diffusions in infinite dimensions are shown to be logarithmic derivatives of...
This book gives an exposition of the principal concepts and results related to second order elliptic...
Abstract. Consider an infinite dimensional diffusion process process on TZ d, where T is the circle,...
Thesis (Ph.D.)--University of Washington, 2018Harmonic/elliptic measure arises naturally in probabil...
This book presents a comprehensive study of boundary value problems for linear and semilinear second...
Bogachev VI, Röckner M, Wang F-Y. Elliptic equations for invariant measures on finite and infinite d...
Bogachev V, Röckner M, Wang F-Y. Elliptic equations for invariant measures on Riemannian manifolds: ...
AbstractWe obtain sufficient conditions in terms of Lyapunov functions for the existence of invarian...
Bogachev VI, Röckner M. Elliptic equations for measures on infinite dimensional spaces and applicati...
Bogachev VI, Röckner M, Stannat W. Uniqueness of solutions of elliptic equations and uniqueness of i...
Albeverio S, Bogachev V, Röckner M. On uniqueness of invariant measures for finite- and infinite-dim...
Bogachev VI, Da Prato G, Röckner M. Parabolic equations for measures on infinite-dimensional spaces....
AbstractConsider a finite or infinite dimensional space X with a diffusion having an invariant measu...
AbstractIn this paper, we study a suitable notion of solution for which a nonlinear elliptic problem...
This paper is devoted to the study of the existence and uniqueness of the invariant measure associat...
Drifts of symmetrizable diffusions in infinite dimensions are shown to be logarithmic derivatives of...
This book gives an exposition of the principal concepts and results related to second order elliptic...
Abstract. Consider an infinite dimensional diffusion process process on TZ d, where T is the circle,...
Thesis (Ph.D.)--University of Washington, 2018Harmonic/elliptic measure arises naturally in probabil...
This book presents a comprehensive study of boundary value problems for linear and semilinear second...