Loop Calculus For Nonbinary Alphabets Using Concepts From Information Geometry

Author

Mori, Ryuhei

Author_Institution

Dept. of Math. & Comput. Sci., Tokyo Inst. of Technol., Tokyo, Japan

Volume

61

Issue

4

fYear

2015

fDate

Apr-15

Firstpage

1887

Lastpage

1904

Abstract

The Bethe approximation is a well-known approximation of the partition function used in statistical physics. Recently, an equality relating the partition function and its Bethe approximation was obtained for graphical models with binary variables by Chertkov and Chernyak. In this equality, the multiplicative error in the Bethe approximation is represented as a weighted sum over all generalized loops in the graphical model. In this paper, the equality is generalized to graphical models with nonbinary alphabet using concepts from information geometry.

Keywords

approximation theory; computational geometry; information theory; statistical analysis; Bethe approximation; graphical models; information geometry; loop calculus; multiplicative error; nonbinary alphabets; partition function approximation; statistical physics; Approximation methods; Calculus; Entropy; Equations; Graphical models; Information geometry; Mathematical model; Bethe approximation; Partition function; holographic transformation; information geometry; loop calculus;

fLanguage

English

Journal_Title

Information Theory, IEEE Transactions on

Publisher

ieee

ISSN

0018-9448

Type

jour

DOI

10.1109/TIT.2015.2403239

Filename

7041210