This paper takes an information-geometric approach to the challenging issue of goodness-of-fit testing in the high dimensional, low sample size context where—potentially—boundary effects dominate. The main contributions of this paper are threefold: first, we present and prove two new theorems on the behaviour of commonly used test statistics in this context; second, we investigate—in the novel environment of the extended multinomial model—the links between information geometry-based divergences and standard goodness-of-fit statistics, allowing us to formalise relationships which have been missing in the literature; finally, we use simulation studies to validate and illustrate our theoretical results and to explore currently open research qu...
The hypothesis that high dimensional data tends to lie in the vicinity of a low di-mensional manifol...
textabstractWe propose a goodness of fit statistic for the geometric distribution and compare it in ...
9 pages, 1 article*Tests of Homogeneity and Goodness-of-Fit to a Truncated Geometric Distribution: ...
This paper takes an information-geometric approach to the challenging issue of goodness-of-fit testi...
This paper takes an information-geometric approach to the challenging issue of goodness-of-fit testi...
We introduce a new approach to goodness-of-fit testing in the high dimensional, sparse extended mult...
The Pearson's chi-squared statistic (X2) does not in general follow a chi-square distribution when i...
We show how information geometry throws new light on the interplay between goodness-of-fit and estim...
This thesis consists of four papers that deal with several aspects of the measurement of model fit f...
We introduce a family of goodness-of-fit statistics for testing composite null hypotheses in multi-d...
It will be shown that the power-divergence family of goodness-of-fit statistics for completely speci...
For (very) sparse nominal data, common goodness-of-fit tests usually fail. Alternative goodness-of-f...
Pearson's χ2- and the log-likelihood ratio χ2-statistics are fundamental tools in goodness-of-fit te...
Goodness-of-fit tests for discrete data and models with parameters to be estimated are usually based...
AbstractN. Cressie and T. R. C. Read (1984, J. Roy. Statist. Soc. B46, 440–464) introduced a class o...
The hypothesis that high dimensional data tends to lie in the vicinity of a low di-mensional manifol...
textabstractWe propose a goodness of fit statistic for the geometric distribution and compare it in ...
9 pages, 1 article*Tests of Homogeneity and Goodness-of-Fit to a Truncated Geometric Distribution: ...
This paper takes an information-geometric approach to the challenging issue of goodness-of-fit testi...
This paper takes an information-geometric approach to the challenging issue of goodness-of-fit testi...
We introduce a new approach to goodness-of-fit testing in the high dimensional, sparse extended mult...
The Pearson's chi-squared statistic (X2) does not in general follow a chi-square distribution when i...
We show how information geometry throws new light on the interplay between goodness-of-fit and estim...
This thesis consists of four papers that deal with several aspects of the measurement of model fit f...
We introduce a family of goodness-of-fit statistics for testing composite null hypotheses in multi-d...
It will be shown that the power-divergence family of goodness-of-fit statistics for completely speci...
For (very) sparse nominal data, common goodness-of-fit tests usually fail. Alternative goodness-of-f...
Pearson's χ2- and the log-likelihood ratio χ2-statistics are fundamental tools in goodness-of-fit te...
Goodness-of-fit tests for discrete data and models with parameters to be estimated are usually based...
AbstractN. Cressie and T. R. C. Read (1984, J. Roy. Statist. Soc. B46, 440–464) introduced a class o...
The hypothesis that high dimensional data tends to lie in the vicinity of a low di-mensional manifol...
textabstractWe propose a goodness of fit statistic for the geometric distribution and compare it in ...
9 pages, 1 article*Tests of Homogeneity and Goodness-of-Fit to a Truncated Geometric Distribution: ...