Bootstrap-determined p-values in Lattice QCD
Abstract
We present a general method to determine the probability that stochastic Monte Carlo data, in particular those generated in a lattice QCD calculation, would have been obtained were that data drawn from the distribution predicted by a given theoretical hypothesis. Such a probability, or p-value, is often used as an important heuristic measure of the validity of that hypothesis. The proposed method offers the benefit that it remains usable in cases where the standard Hotelling methods based on the conventional statistic do not apply, such as for uncorrelated fits. Specifically, we analyze a general alternative to the correlated statistic referred to as , and show how to use the bootstrap as a data-driven method to determine the expected distribution of for a given hypothesis with minimal assumptions. This distribution can then be used to determine the p-value for a fit to the data. We also describe a bootstrap approach for quantifying the impact upon this p-value of estimating population parameters from a single ensemble of samples. The overall method is accurate up to a bias which we do not attempt to quantify.
Keywords
Cite
@article{arxiv.2409.11379,
title = {Bootstrap-determined p-values in Lattice QCD},
author = {Norman Christ and Rajiv Eranki and Christopher Kelly},
journal= {arXiv preprint arXiv:2409.11379},
year = {2024}
}
Comments
46 pages, 22 figures