English

Learning and Decision-Making with Data: Optimal Formulations and Phase Transitions

Machine Learning 2024-03-13 v3 Machine Learning Optimization and Control Statistics Theory Statistics Theory

Abstract

We study the problem of designing optimal learning and decision-making formulations when only historical data is available. Prior work typically commits to a particular class of data-driven formulation and subsequently tries to establish out-of-sample performance guarantees. We take here the opposite approach. We define first a sensible yard stick with which to measure the quality of any data-driven formulation and subsequently seek to find an optimal such formulation. Informally, any data-driven formulation can be seen to balance a measure of proximity of the estimated cost to the actual cost while guaranteeing a level of out-of-sample performance. Given an acceptable level of out-of-sample performance, we construct explicitly a data-driven formulation that is uniformly closer to the true cost than any other formulation enjoying the same out-of-sample performance. We show the existence of three distinct out-of-sample performance regimes (a superexponential regime, an exponential regime and a subexponential regime) between which the nature of the optimal data-driven formulation experiences a phase transition. The optimal data-driven formulations can be interpreted as a classically robust formulation in the superexponential regime, an entropic distributionally robust formulation in the exponential regime and finally a variance penalized formulation in the subexponential regime. This final observation unveils a surprising connection between these three, at first glance seemingly unrelated, data-driven formulations which until now remained hidden.

Keywords

Cite

@article{arxiv.2109.06911,
  title  = {Learning and Decision-Making with Data: Optimal Formulations and Phase Transitions},
  author = {Amine Bennouna and Bart P. G. Van Parys},
  journal= {arXiv preprint arXiv:2109.06911},
  year   = {2024}
}
R2 v1 2026-06-24T05:58:02.250Z