On the Geometry of Maximum Entropy Problems

被引：27

作者：

Pavon, Michele ^{[1
]}

Ferrante, Augusto ^{[2
]}

机构：

[1] Univ Padua, Dipartmento Matemat, I-35131 Padua, Italy

[2] Univ Padua, Dipartimento Ingn Informaz, I-35131 Padua, Italy

来源：

SIAM REVIEW | 2013年 / 55卷 / 03期

关键词：

maximum entropy problem; geometric principle; covariance selection; spectral estimation; Gibbs's variational principle; NEVANLINNA-PICK INTERPOLATION; CONVEX-OPTIMIZATION APPROACH; SPECTRAL ESTIMATION; RIEMANNIAN METRICS; INFORMATION-THEORY; MATRIX COMPLETION; RELATIVE ENTROPY; COVARIANCE; MINIMIZATION; MODELS;

D O I：

10.1137/120862843

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

We show that a simple geometric result suffices to derive the form of the optimal solution in a large class of finite- and infinite-dimensional maximum entropy problems concerning probability distributions, spectral densities, and covariance matrices. These include Burg's spectral estimation method and Dempster's covariance completion, as well as various recent generalizations of the above. We then apply this orthogonality principle to the new problem of completing a block-circulant covariance matrix when an a priori estimate is available.

引用

页码：415 / 439

页数：25

共 91 条

[1]

Amari S., 1985, Lecture Notes in Statistics, V28

[2]

Amari S. I, 2000, TRANSL MATH MONOGR, V191

[3]

[Anonymous], 1993, Large deviations techniques and applications

[4]

[Anonymous], 1969, Topics in Mathematical System Theory

[5]

[Anonymous], OPTIMIERUNG APPROXIM

[6]

[Anonymous], 1967, 37 ANN INT M

[7]

[Anonymous], 1968, INFORM THEORY STAT

[8]

[Anonymous], 2002, IEEE T AUTOMAT CONTR, V47, P1811

[9]

[Anonymous], 1975, THESIS STANFORD U ST

[10]

Avventi E., 2011, THESIS KTH STOCKHOLM

← 1 2 3 4 5 6 7 8 9 10 →