AbstractWe develop a new method to obtain stochastic characterizations of Yang–Mills fields. Our main tool is the Itô-equation for the stochastic parallel transport. We estimate the drift terms in a small ball of radius ε and find that for a general connection the average rotation is of order ε3 but that for a Yang–Mills connections the average rotation is of order ε4. Using a Doob h-transform we give a new proof of the stochastic characterization of Yang–Mills fields by S. Stafford. Varying the starting point of the Brownian motion we obtain an unconditioned version of this result. By considering the horizontal Laplace equation we then apply our result to obtain a new analytic characterization of Yang–Mills fields
Some time ago J.T. Lewis, J. McConnell and I published a paper with this same title in which we show...
A stochastic holonomy along a loop obtained from the OU process on the path space over a compact Rie...
"We investigate the Vlasov equation in the stochastic magnetic field as a stochastic Li-ouville equa...
AbstractWe develop a new method to obtain stochastic characterizations of Yang–Mills fields. Our mai...
AbstractWe give a new stochastic approach to Yang–Mills fields on vector bundles by studying the der...
We characterize Yang–Mills connections in vector bundles in terms of covariant derivatives of stocha...
AbstractWe construct a parallel transport U in a vector bundle E, along the paths of a Brownian moti...
Stochastic transport is a widely studied phenomenon among physicists. This includes diffusive proces...
We construct a parallel transport U in a vector bundle E, along the paths of a Brownian motion in th...
The evolution of stochastic magnetic field lines has been studied numerically. We have developed a n...
The diffusion of charged particles in a gaussian stochastic magnetic field characterized by finite c...
Neste trabalho estamos interessados no transporte paralelo da geometria diferencial no contexto do c...
We study the radial part of sub-Riemannian Brownian motion in the context of totally geodesic foliat...
We consider the way sets are dispersed by the action of stochastic flows derived from martingale fie...
We study two classes of vector fields on the path space over a closed manifold with a Wiener Riemann...
Some time ago J.T. Lewis, J. McConnell and I published a paper with this same title in which we show...
A stochastic holonomy along a loop obtained from the OU process on the path space over a compact Rie...
"We investigate the Vlasov equation in the stochastic magnetic field as a stochastic Li-ouville equa...
AbstractWe develop a new method to obtain stochastic characterizations of Yang–Mills fields. Our mai...
AbstractWe give a new stochastic approach to Yang–Mills fields on vector bundles by studying the der...
We characterize Yang–Mills connections in vector bundles in terms of covariant derivatives of stocha...
AbstractWe construct a parallel transport U in a vector bundle E, along the paths of a Brownian moti...
Stochastic transport is a widely studied phenomenon among physicists. This includes diffusive proces...
We construct a parallel transport U in a vector bundle E, along the paths of a Brownian motion in th...
The evolution of stochastic magnetic field lines has been studied numerically. We have developed a n...
The diffusion of charged particles in a gaussian stochastic magnetic field characterized by finite c...
Neste trabalho estamos interessados no transporte paralelo da geometria diferencial no contexto do c...
We study the radial part of sub-Riemannian Brownian motion in the context of totally geodesic foliat...
We consider the way sets are dispersed by the action of stochastic flows derived from martingale fie...
We study two classes of vector fields on the path space over a closed manifold with a Wiener Riemann...
Some time ago J.T. Lewis, J. McConnell and I published a paper with this same title in which we show...
A stochastic holonomy along a loop obtained from the OU process on the path space over a compact Rie...
"We investigate the Vlasov equation in the stochastic magnetic field as a stochastic Li-ouville equa...