Horseshoe Priors and MDP

Abstract

Carvalho (2010) established two foundational theorems for the horseshoe prior: tight two-sided logarithmic bounds on the marginal density near the origin (Theorem~1.1), and a super-efficient rate of convergence of the Bayes predictive density to the true sampling density in sparse situations (Theorem~2). The ``Shrink Globally, Act Locally'' paper polson2010shrink formalised necessary and sufficient conditions on the prior's behaviour at the origin for sparsity adaptation as p ∞. We show that these results are not merely descriptive properties of the horseshoe -- they are the finite-sample precursors to the asymptotic moderate deviation principle (MDP) of datta2026newlook. The log-pole singularity πH(θ) -θ is precisely the origin integrability boundary that selects the MDP threshold = (π n/2); super-efficiency below the threshold and tail robustness above it together produce the ABOS Bayes risk p0 (p/p0)/n; and the Clarke--Barron information-theoretic asymptotics of Bayes methods provide the unifying framework in which all three results are faces of a single logarithmic budget principle.