1 research outputs found
Off-diagonal Symmetric Nonnegative Matrix Factorization
Symmetric nonnegative matrix factorization (symNMF) is a variant of
nonnegative matrix factorization (NMF) that allows to handle symmetric input
matrices and has been shown to be particularly well suited for clustering
tasks. In this paper, we present a new model, dubbed off-diagonal symNMF
(ODsymNMF), that does not take into account the diagonal entries of the input
matrix in the objective function. ODsymNMF has three key advantages compared to
symNMF. First, ODsymNMF is theoretically much more sound as there always exists
an exact factorization of size at most \nicefrac{n(n-1)}{2} where is the
dimension of the input matrix. Second, it makes more sense in practice as
diagonal entries of the input matrix typically correspond to the similarity
between an item and itself, not bringing much information. Third, it makes the
optimization problem much easier to solve. In particular, it will allow us to
design an algorithm based on coordinate descent that minimizes the
component-wise norm between the input matrix and its approximation. We
prove that this norm is much better suited for binary input matrices often
encountered in practice. We also derive a coordinate descent method for the
component-wise norm, and compare the two approaches with symNMF on
synthetic and document data sets.Comment: 22 pages, 2 figures, 4 table