Type: Article
Publication Date: 2024-07-30
Citations: 0
DOI: https://doi.org/10.3150/23-bej1700
We study the usual stochastic order between probability measures on preordered topological abelian groups, focusing on asymptotic and catalytic versions of the order.In the asymptotic version, a measure µ dominates a measure ν if the i.i.d.random walk generated by µ first-order dominates the one generated by ν at late times.In the catalytic version, µ dominates ν if there is a third τ such that the convolution µ * τ first-order dominates ν * τ .Provided that the preorder on G is induced by a suitably large positive cone and that both measures are compactly supported Radon, our main result gives a sufficient condition for asymptotic and catalytic dominance to hold in terms of a family of inequalities closely related to the cumulant-generating functions.While this sufficient condition requires these inequalities to be strict, the non-strict versions of these inequalities are easily seen to be necessary.In this sense, our result gives conditions that are necessary and sufficient in generic cases.This result has been known for G = R, but is new already for R n with n > 1.It is a direct application of a recently proven theorem of real algebra, namely a Vergleichsstellensatz for preordered semirings.We finally use our result to derive a formula for the rate at which the probabilities of a random walk decay relative to those of another, now for walks on a preordered topological vector space with compactly supported Radon steps.Taking one of these walks to be deterministic reproduces a version of Cramér's large deviation theorem for infinite dimensions.
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