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On generalized f-statistics

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  • Quentin Barthélemy

Abstract

In statistics, there exists several means such as the arithmetic, geometric, harmonic, or power means. Using axiomatic deduction, they have been unified into the generalized f-mean. Similarly, there are several standard deviations and they have been unified into the generalized f-standard deviation, even though without derivation. However, standard score, as known in its arithmetic and geometric versions, has never been f-generalized. The goal of this article is to expose a full derivation of generalized f-statistics, adopting a parameter estimation point of view. Generalized f-mean and generalized f-variance are derived thanks to a maximum likelihood estimation. The non trivial relation between generalized f-standard deviation and generalized f-variance is also studied. Furthermore, generalized f-standard score is defined and extended to multivariate case. Finally, these generalized f-statistics are applied on simulated data for pre-processing and outlier detection.

Suggested Citation

  • Quentin Barthélemy, 2024. "On generalized f-statistics," Communications in Statistics - Theory and Methods, Taylor & Francis Journals, vol. 53(20), pages 7281-7297, October.
  • Handle: RePEc:taf:lstaxx:v:53:y:2024:i:20:p:7281-7297
    DOI: 10.1080/03610926.2023.2263112
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