Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1961.Includes bibliographical references (leaves [36]-[37]).by Ramesh Gangolli.Ph.D
We will discuss several problems related to stochastic analysis on manifolds, especially analysis on...
Let $L$L be a submanifold of a Riemannian manifold $M$M. The authors discuss several ways to constru...
International audienceWe give a geometric description of the motion of eigenvalues of a Brownian mot...
A basic 1982 treatment of stochastic differential equations on manifolds and their solution flows an...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Physics, 1988.Includes bibliographi...
Available from British Library Lending Division - LD:3630.84(DIAS-STP--84-48) / BLDSC - British Libr...
In biology, the ceaseless and erratic dance of microscopic particles suspended in a liquid, is calle...
A global lower estimate for the transition probability of the Brownian motion on a complete Riemanni...
Summary. We study a class of diffusions, conjugate Brownian motion, related to Brownian motion in Ri...
In this paper, we propose a new method of constructing a two-parameter random field WxM (s, t), x ∈ ...
Brownian motion on disconnected sets, basic hypergeometric functions, and some continued fractions o...
This work is a study of the relationship between Brownian motion and elementary, linear partial diff...
Title: On Selected Geometric Properties of Brownian Motion Paths Author: Mgr. Ondřej Honzl E-mail Ad...
In this research we are looking at Kakutani’s classical result on the connec-tion between Brownian m...
Brownian Motion is one of the most useful tools in the arsenal of stochastic models. This phenomenon...
We will discuss several problems related to stochastic analysis on manifolds, especially analysis on...
Let $L$L be a submanifold of a Riemannian manifold $M$M. The authors discuss several ways to constru...
International audienceWe give a geometric description of the motion of eigenvalues of a Brownian mot...
A basic 1982 treatment of stochastic differential equations on manifolds and their solution flows an...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Physics, 1988.Includes bibliographi...
Available from British Library Lending Division - LD:3630.84(DIAS-STP--84-48) / BLDSC - British Libr...
In biology, the ceaseless and erratic dance of microscopic particles suspended in a liquid, is calle...
A global lower estimate for the transition probability of the Brownian motion on a complete Riemanni...
Summary. We study a class of diffusions, conjugate Brownian motion, related to Brownian motion in Ri...
In this paper, we propose a new method of constructing a two-parameter random field WxM (s, t), x ∈ ...
Brownian motion on disconnected sets, basic hypergeometric functions, and some continued fractions o...
This work is a study of the relationship between Brownian motion and elementary, linear partial diff...
Title: On Selected Geometric Properties of Brownian Motion Paths Author: Mgr. Ondřej Honzl E-mail Ad...
In this research we are looking at Kakutani’s classical result on the connec-tion between Brownian m...
Brownian Motion is one of the most useful tools in the arsenal of stochastic models. This phenomenon...
We will discuss several problems related to stochastic analysis on manifolds, especially analysis on...
Let $L$L be a submanifold of a Riemannian manifold $M$M. The authors discuss several ways to constru...
International audienceWe give a geometric description of the motion of eigenvalues of a Brownian mot...