Nonnegative Matrix Factorization for Combinatorial Optimization: Spectral Clustering, Graph Matching, and Clique Finding

Author

Ding, Chris ; Li, Tao ; Jordan, Michael I.

Author_Institution

CSE Dept., Univ. of Texas at Arlington, Arlington, TX

fYear

2008

fDate

15-19 Dec. 2008

Firstpage

183

Lastpage

192

Abstract

Nonnegative matrix factorization (NMF) is a versatile model for data clustering. In this paper, we propose several NMF inspired algorithms to solve different data mining problems. They include (1) multi-way normalized cut spectral clustering, (2) graph matching of both undirected and directed graphs, and (3) maximal clique finding on both graphs and bipartite graphs. Key features of these algorithms are (a) they are extremely simple to implement; and (b) they are provably convergent. We conduct experiments to demonstrate the effectiveness of these new algorithms. We also derive a new spectral bound for the size of maximal edge bicliques as a byproduct of our approach.

Keywords

data mining; directed graphs; matrix decomposition; pattern clustering; pattern matching; bipartite graphs; combinatorial optimization; data clustering; data mining; graph matching; maximal clique finding; maximal edge bicliques; nonnegative matrix factorization; spectral clustering; undirected graphs; Clustering algorithms; Cost function; DH-HEMTs; Data analysis; Data mining; Lagrangian functions; Linear discriminant analysis; Support vector machine classification; Support vector machines; Unsupervised learning; Nonnegative matrix factorization; clique finding; clustering; graph matching;

fLanguage

English

Publisher

ieee

Conference_Titel

Data Mining, 2008. ICDM '08. Eighth IEEE International Conference on

Conference_Location

Pisa

ISSN

1550-4786

Print_ISBN

978-0-7695-3502-9

Type

conf

DOI

10.1109/ICDM.2008.130

Filename

4781113