Markov Processes with Identical Bridges

Abstract

Let X and Y be time-homogeneous Markov processes with common state space E, and assume that the transition kernels of X and Y admit densities with respect to suitable reference measures. We show that if there is a time t>0 such that, for each x∈ E, the conditional distribution of (Xs)0 < s < t, given X0 = x = Xt, coincides with the conditional distribution of (Ys)0 < s < t, given Y0 = x = Yt, then the infinitesimal generators of X and Y are related by [LY]f = -1[LX]( f)-λ f, where is an eigenfunction of LX with eigenvalue λ. Under an additional continuity hypothesis, the same conclusion obtains assuming merely that X and Y share a ``bridge'' law for one triple (x,t,y). Our work entends and clarifies a recent result of I. Benjamini and S. Lee.

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