Ming Liao
Published 2014-12-25Version 1
We study a decomposition of a general Markov process in a manifold invariant under a Lie group action into a radial part (transversal to orbits) and an angular part (along an orbit). We show that given a radial path, the conditioned angular part is a nonhomogeneous \levy process in a homogeneous space, we obtain a representation of such processes, and as a consequence, we extend the well known skew-product of Euclidean Brownian motion to a general setting.
Comments: In Theorem 4, dim(K/M) > 1 should be assumed
Journal: J. Theoret. Probab. 22, 164-185 (2009)
Asymptotic and spectral properties of exponentially φ-ergodic Markov processes
On the notion(s) of duality for Markov processes
Stochastic Calculus for Markov Processes Associated with Non-symmetric Dirichlet Forms
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