A new robust regression method based on minimization of geodesic distances on a probabilistic manifold: Application to power laws

Geert Verdoolaege

Research output: Contribution to journalArticlepeer-review

Abstract

In regression analysis for deriving scaling laws that occur in various scientific disciplines, usually standard regression methods have been applied, of which ordinary least squares (OLS) is the most popular. In many situations, the assumptions underlying OLS are not fulfilled, and several other approaches have been proposed. However, most techniques address only part of the shortcomings of OLS. We here discuss a new and more general regression method, which we call geodesic least squares regression (GLS). The method is based on minimization of the Rao geodesic distance on a probabilistic manifold. For the case of a power law, we demonstrate the robustness of the method on synthetic data in the presence of significant uncertainty on both the data and the regression model. We then show good performance of the method in an application to a scaling law in magnetic confinement fusion.

Original languageEnglish
Pages (from-to)4602-4626
Number of pages25
JournalEntropy
Volume17
Issue number7
DOIs
Publication statusPublished - 2015

Keywords

  • Geodesic distance
  • Information geometry
  • Nuclear fusion
  • Regression analysis
  • Scaling laws

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