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Approximate Minimax Estimation of a Bounded Normal Mean via Stochastic Mirror Ascent

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  • Jos'e Luis Montiel Olea
  • Ekaterina Zubova

Abstract

This paper presents a computational approach to find an approximately minimax estimator for the classical Bounded Normal Mean problem. The suggested procedure is the Bayes estimator corresponding to an approximately least-favorable distribution obtained from a stochastic mirror ascent routine for concave maximization. The paper shows that both the approximately least-favorable distribution and the approximately minimax estimator are indeed close (in a sense we make precise) to their desired targets. Simulation evidence suggests that the approximately minimax estimator can yield, with a reasonable amount of compute, risk improvements from 6% to almost 18% relative to the minimax linear estimator (which is known to admit a maximal improvement of 20%). The approximately minimax estimator is then applied to the problem of how to best aggregate the information contained in local projections and vector autoregressions to estimate an impulse response coefficient.

Suggested Citation

  • Jos'e Luis Montiel Olea & Ekaterina Zubova, 2026. "Approximate Minimax Estimation of a Bounded Normal Mean via Stochastic Mirror Ascent," Papers 2607.05350, arXiv.org.
  • Handle: RePEc:arx:papers:2607.05350
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    File URL: https://arxiv.org/pdf/2607.05350
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