Systematic errors in the maximum-likelihood regression of Poisson count data: Introducing the o v erdispersed χ2 distribution

Abstract

This paper presents a new method to estimate systematic errors in the maximum-likelihood regression of count data. The method is applicable in particular to X-ray spectra in situations where the Poisson log-likelihood, or the Cash goodness-of-fit statistic, indicate a poor fit that is attributable to o v erdispersion of the data. Overdispersion in Poisson data is treated as an intrinsic model variance that can be estimated from the best-fit model, using the maximum-likelihood C min statistic. The paper also studies the effects of such systematic errors on the _ C likelihood-ratio statistic, which can be used to test for the presence of a nested model component in the regression of Poisson count data. The paper introduces an o verdisper sed χ2 distribution that results from the convolution of a χ2 distribution that models the usual _ C statistic, and a zero-mean Gaussian that models the o v erdispersion in the data. This is proposed as the distribution of choice for the _ C statistic in the presence of systematic errors. The methods presented in this paper are applied to XMM-Newton data of the quasar 1ES 1553 + 113 that were used to detect absorption lines from an intervening warm-hot intergalactic medium (WHIM). This case study illustrates how systematic errors can be estimated from the data, and their effect on the detection of a nested component, such as an absorption line, with the _ C statistic.