English

Alpha-NML Universal Predictors

Information Theory 2024-12-20 v4 math.IT

Abstract

Inspired by the connection between classical regret measures employed in universal prediction and R\'{e}nyi divergence, we introduce a new class of universal predictors that depend on a real parameter α1\alpha\geq 1. This class interpolates two well-known predictors, the mixture estimators, that include the Laplace and the Krichevsky-Trofimov predictors, and the Normalized Maximum Likelihood (NML) estimator. We point out some advantages of this new class of predictors and study its benefits from two complementary viewpoints: (1) we prove its optimality when the maximal R\'{e}nyi divergence is considered as a regret measure, which can be interpreted operationally as a middle ground between the standard average and worst-case regret measures; (2) we discuss how it can be employed when NML is not a viable option, as an alternative to other predictors such as Luckiness NML. Finally, we apply the α\alpha-NML predictor to the class of discrete memoryless sources (DMS), where we derive simple formulas to compute the predictor and analyze its asymptotic performance in terms of worst-case regret.

Keywords

Cite

@article{arxiv.2202.12737,
  title  = {Alpha-NML Universal Predictors},
  author = {Marco Bondaschi and Michael Gastpar},
  journal= {arXiv preprint arXiv:2202.12737},
  year   = {2024}
}
R2 v1 2026-06-24T09:53:58.271Z