Root to Kellerer

Abstract

We revisit Kellerer's Theorem, that is, we show that for a family of real probability distributions (μt)t∈ [0,1] which increases in convex order there exists a Markov martingale (St)t∈[0,1] s.t.\ St μt. To establish the result, we observe that the set of martingale measures with given marginals carries a natural compact Polish topology. Based on a particular property of the martingale coupling associated to Root's embedding this allows for a relatively concise proof of Kellerer's theorem. We emphasize that many of our arguments are borrowed from Kellerer Ke72, Lowther Lo07, and Hirsch-Roynette-Profeta-Yor HiPr11,HiRo12.