Miki Aoyagi scite author profile

The term algebraic statistics arises from the study of probabilistic models and techniques for statistical inference using methods from algebra and geometry (Sturmfels, 2009 ). The purpose of our study is to consider the generalization error and stochastic complexity in learning theory by using the log-canonical threshold in algebraic geometry. Such thresholds correspond to the main term of the generalization error in Bayesian estimation, which is called a learning coefficient (Watanabe, 2001a , 2001b ). The learning coefficient serves to measure the learning efficiencies in hierarchical learning models. In this letter, we consider learning coefficients for Vandermonde matrix-type singularities, by using a new approach: focusing on the generators of the ideal, which defines singularities. We give tight new bound values of learning coefficients for the Vandermonde matrix-type singularities and the explicit values with certain conditions. By applying our results, we can show the learning coefficients of three-layered neural networks and normal mixture models.

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A Bayesian Learning Coefficient of Generalization Error and Vandermonde Matrix-Type Singularities

Aoyagi

2010

Communications in Statistics - Theory and Methods

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Monitoring of cholesterol oxidation in a lipid bilayer membrane using streptolysin O as a sensing and signal transduction element

Shoji

Ikeya

Aoyagi

et al. 2016

Journal of Pharmaceutical and Biomedical Analysis

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Miki Aoyagi

Stochastic complexities of reduced rank regression in Bayesian estimation

Asymptotic analysis of Bayesian generalization error with Newton diagram

Learning Coefficient of Generalization Error in Bayesian Estimation and Vandermonde Matrix-Type Singularity

A Bayesian Learning Coefficient of Generalization Error and Vandermonde Matrix-Type Singularities

Monitoring of cholesterol oxidation in a lipid bilayer membrane using streptolysin O as a sensing and signal transduction element

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