On Strassen's Theorem on Stochastic Domination
Abstract
The purpose of this note is to make available a reasonably complete and straightforward proof of Strassen's theorem on stochastic domination, and to draw attention to the original paper. We also point out that the maximal possible value of $P(Z = Z')$ is actually not reduced by the requirement $Z \leq Z'$. Here, $Z,Z'$ are stochastic elements that Strassen's theorem states exist under a stochastic domination condition. The consequence of that observation to stochastically monotone Markov chains is pointed out. Usually the theorem is formulated with the assumption that $\leq$ is a partial ordering; the proof reveals that a pre-ordering suffices.
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Pages: 51-59
Publication Date: June 1, 1999
DOI: 10.1214/ECP.v4-1005
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References
- P. Billingsley, Convergence of Probability Measures, Wiley, New York, (1968). Math Review link
- T. Kamae, U. Krengel, and G.L. O'Brien, Stochastic inequalities on partially ordered spaces, Ann. Probab. 5, (1977), 899--912. Math Review link
- T. Liggett, Interacting Particle Systems, Springer, New York, (1985). Math Review link
- T. Lindvall, Lectures on the Coupling Method, Wiley, New York, (1992). Math Review link
- C. Preston, Random Fields, Lecture Notes in Mathematics 534, Springer, Berlin, (1976). Math Review link
- W. Rudin, Functional Analysis, McGraw-Hill, New Dehli, (1973). Math Review link
- H.J. Skala, The existence of probability measures with given marginals, Ann. Probab. 21, (1993), 136--142. Math Review link
- V. Strassen, The existence of probability measures with given marginals, Ann. Math. Statist. 36, (1965), 423--439. Math Review link
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