English

A Wilks' theorem for grouped data

Methodology 2018-09-26 v3

Abstract

Consider nn independent measurements, with the additional information of the times at which measurements are performed. This paper deals with testing statistical hypotheses when nn is large and only a small amount of observations concentrated in short time intervals are relevant to the study. We define a testing procedure in terms of multiple likelihood ratio (LR) statistics obtained by splitting the observations into groups, and in accordance with the following principles: P1) each LR statistic is formed by gathering the data included in GG consecutive vectors of observations, where GG is a suitable time window defined a priori with respect to an arbitrary choice of the `origin of time'; P2) the null statistical hypothesis is rejected only if at least kk LR statistics are sufficiently small, for a suitable choice of kk. We show that the application of the classical Wilks' theorem may be affected by the arbitrary choice of the "origin of time", in connection with P1). We then introduce a Wilks' theorem for grouped data which leads to a testing procedure that overcomes the problem of the arbitrary choice of the `origin of time', while fulfilling P1) and P2). Such a procedure is more powerful than the corresponding procedure based on Wilks' theorem.

Keywords

Cite

@article{arxiv.1802.01715,
  title  = {A Wilks' theorem for grouped data},
  author = {Emanuele Dolera and Stefano Favaro and Andrea Bulgarelli and Alessio Aboudan},
  journal= {arXiv preprint arXiv:1802.01715},
  year   = {2018}
}

Comments

arXiv admin note: text overlap with arXiv:1411.0947

R2 v1 2026-06-23T00:12:14.372Z