Generalized Separable Nonnegative Matrix Factorization

Junjun Pan, Nicolas Gillis*

*Corresponding author for this work

Research output: Contribution to journalJournal articlepeer-review

23 Citations (Scopus)

Abstract

Nonnegative matrix factorization (NMF) is a linear dimensionality technique for nonnegative data with applications such as image analysis, text mining, audio source separation, and hyperspectral unmixing. Given a data matrix MM and a factorization rank rr, NMF looks for a nonnegative matrix WW with rr columns and a nonnegative matrix HH with rr rows such that M ≈ WHM≈WH. NMF is NP-hard to solve in general. However, it can be computed efficiently under the separability assumption which requires that the basis vectors appear as data points, that is, that there exists an index set K K such that W = M(:, K )W=M(:,K). In this article, we generalize the separability assumption. We only require that for each rank-one factor W(:,k)H(k,:)W(:,k)H(k,:) for k=1,2,...,rk=1,2,...,r, either W(:,k) = M(:,j)W(:,k)=M(:,j) for some jj or H(k,:) = M(i,:)H(k,:)=M(i,:) for some ii. We refer to the corresponding problem as generalized separable NMF (GS-NMF). We discuss some properties of GS-NMF and propose a convex optimization model which we solve using a fast gradient method. We also propose a heuristic algorithm inspired by the successive projection algorithm. To verify the effectiveness of our methods, we compare them with several state-of-the-art separable NMF and standard NMF algorithms on synthetic, document and image data sets.
Original languageEnglish
Pages (from-to)1546-1561
Number of pages16
JournalIEEE Transactions on Pattern Analysis and Machine Intelligence
Volume43
Issue number5
Early online date26 Nov 2019
DOIs
Publication statusPublished - 1 May 2021

User-Defined Keywords

  • Nonnegative matrix factorization
  • separability
  • algorithms

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