- 作者:Mihai N. Pascua ; mihai.pascu@unitbv.ro" class="auth_mail" title="E-mail the corresponding author ; Ionel Popescub ; c ; ipopescu@math.gatech.edu" class="auth_mail" title="E-mail the corresponding author ; ionel.popescu@imar.ro" class="auth_mail" title="E-mail the corresponding author
- 关键词:Brownian motion ; Manifolds ; Couplings
- 刊名:Stochastic Processes and their Applications
- 出版年:2016
- 出版时间:February 2016
- 年:2016
- 卷:126
- 期:2
- 页码:628-650
- 全文大小:275 K
The first construction is the shy coupling, the second one is a fixed-distance coupling and the third is a coupling in which the distance between the processes is a deterministic exponential function of time.
The result proved here is that an arbitrary Riemannian manifold satisfying some technical conditions supports shy couplings. If in addition, the Ricci curvature is non-negative, there exist fixed-distance couplings. Furthermore, if the Ricci curvature is bounded below by a positive constant, then there exists a coupling of Brownian motions for which the distance between the processes is a decreasing exponential function of time. The constructions use the intrinsic geometry, and relies on an extension of the notion of frames which plays an important role for even dimensional manifolds.
In fact, we provide a wider class of couplings in which the distance function is deterministic in Theorem 5 and Corollary 9.
As an application of the fixed-distance coupling we derive a maximum principle for the gradient of harmonic functions on manifolds with non-negative Ricci curvature.
As far as we are aware of, these constructions are new, though the existence of shy couplings on manifolds is suggested by Kendall in Kendall (2009).