The α-Geometric Structures on Manifold of Positive Definite Hermite Matrices 被引量：2

The α-Geometric Structures on Manifold of Positive Definite Hermite Matrices

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摘要 Geometric structures of a manifold of positive definite Hermite matrices are considered from the viewpoint of information geometry.A Riemannian metric is defined and dual α-connections are introduced.Then the fact that the manifold is ±l-flat is shown.Moreover,the divergence of two points on the manifold is given through dual potential functions.Furthermore,the optimal approximation of a point onto the submanifold is gotten.Finally,some simulations are given to illustrate our results. Geometric structures of a manifold of positive definite Hermite matrices are considered from the viewpoint of information geometry.A Riemannian metric is defined and dual α-connections are introduced.Then the fact that the manifold is ±l-flat is shown.Moreover,the divergence of two points on the manifold is given through dual potential functions.Furthermore,the optimal approximation of a point onto the submanifold is gotten.Finally,some simulations are given to illustrate our results.

作者 Xiao Min DUAN Hua Fei SUN Lin Yu PENG

机构地区 Department of Mathematics School of Science Department of Mathematics

出处《Acta Mathematica Sinica,English Series》 SCIE CSCD 2014年第12期2137-2145,共9页 数学学报（英文版）

基金 Supported by Natural Science Foundations of China(Grant No.61179031 and 61401058)

关键词 Positive definite Hermite matrices information geometry optimal approximation Positive definite Hermite matrices, information geometry, optimal approximation

分类号 O151.21 [理学—基础数学] TN919.3 [电子电信—通信与信息系统]

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Acta Mathematica Sinica,English Series

2014年第12期

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