On Higher-Order Probabilistic Subrecursion
Abstract
We study the expressive power of subrecursive probabilistic higher-order calculi. More specifically, we show that endowing a very expressive deterministic calculus like G\"odel's with various forms of probabilistic choice operators may result in calculi which are not equivalent as for the class of distributions they give rise to, although they all guarantee almost-sure termination. Along the way, we introduce a probabilistic variation of the classic reducibility technique, and we prove that the simplest form of probabilistic choice leaves the expressive power of essentially unaltered. The paper ends with some observations about the functional expressive power: expectedly, all the considered calculi capture the functions which itself represents, at least when standard notions of observations are considered.
Cite
@article{arxiv.1701.04786,
title = {On Higher-Order Probabilistic Subrecursion},
author = {Flavien Breuvart and Ugo Dal Lago and Agathe Herrou},
journal= {arXiv preprint arXiv:1701.04786},
year = {2023}
}