Nonnegative factorization and the maximum edge biclique problem

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Nonnegative factorization and the maximum edge biclique problem

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GILLIS, Nicolas (UniversitŽ catholique de Louvain (UCL). Center for Operations Research and Econometrics (CORE))
GLINEUR, Franois (UniversitŽ catholique de Louvain (UCL). Center for Operations Research and Econometrics (CORE))

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François Glineur

Abstract

Nonnegative Matrix Factorization (NMF) is a data analysis technique which allows compression and interpretation of nonnegative data. NMF became widely studied after the publication of the seminal paper by Lee and Seung (Learning the Parts of Objects by Nonnegative Matrix Factorization, Nature, 1999, vol. 401, pp. 788--791), which introduced an algorithm based on Multiplicative Updates (MU). More recently, another class of methods called Hierarchical Alternating Least Squares (HALS) was introduced that seems to be much more efficient in practice. In this paper, we consider the problem of approximating a not necessarily nonnegative matrix with the product of two nonnegative matrices, which we refer to as Nonnegative Factorization~(NF)~; this is the subproblem that HALS methods implicitly try to solve at each iteration. We prove that NF is NP-hard for any fixed factorization rank, using a reduction to the maximum edge biclique problem. We also generalize the multiplicative updates to NF, which allows us to shed some light on the differences between the MU and HALS algorithms for NMF and give an explanation for the better performance of HALS. Finally, we link stationary points of NF with feasible solutions of the biclique problem to obtain a new type of biclique finding algorithm (based on MU) whose iterations have an algorithmic complexity proportional to the number of edges in the graph, and show that it performs better than comparable existing methods.

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Paper provided by Université catholique de Louvain, Center for Operations Research and Econometrics (CORE) in its series CORE Discussion Papers with number 2008064.

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Date of creation: 01 Nov 2008
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Handle: RePEc:cor:louvco:2008064

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For technical questions regarding this item, or to correct its listing, contact: (Alain GILLIS).

This paper has been announced in the following NEP Reports:

NEP-ALL-2009-04-05 (All new papers)

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This page was last updated on 2009-12-16.

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