English

Sparse Matrix Decompositions and Graph Characterizations

Combinatorics 2012-03-26 v2

Abstract

The question of when zeros (i.e., sparsity) in a positive definite matrix AA are preserved in its Cholesky decomposition, and vice versa, was addressed by Paulsen et al. in the Journal of Functional Analysis (85, pp151-178). In particular, they prove that for the pattern of zeros in AA to be retained in the Cholesky decomposition of AA, the pattern of zeros in AA has to necessarily correspond to a chordal (or decomposable) graph associated with a specific type of vertex ordering. This result therefore yields a characterization of chordal graphs in terms of sparse positive definite matrices. It has also proved to be extremely useful in probabilistic and statistical analysis of Markov random fields where zeros in positive definite correlation matrices are intimately related to the notion of stochastic independence. Now, consider a positive definite matrix AA and its Cholesky decomposition given by A=LDLTA = LDL^T, where LL is lower triangular with unit diagonal entries, and DD a diagonal matrix with positive entries. In this paper, we prove that a necessary and sufficient condition for zeros (i.e., sparsity) in a positive definite matrix AA to be preserved in its associated Cholesky matrix LL, \, and in addition also preserved in the inverse of the Cholesky matrix L1L^{-1}, is that the pattern of zeros corresponds to a co-chordal or homogeneous graph associated with a specific type of vertex ordering. We proceed to provide a second characterization of this class of graphs in terms of determinants of submatrices that correspond to cliques in the graph. These results add to the growing body of literature in the field of sparse matrix decompositions, and also prove to be critical ingredients in the probabilistic analysis of an important class of Markov random fields.

Cite

@article{arxiv.1111.6845,
  title  = {Sparse Matrix Decompositions and Graph Characterizations},
  author = {Kshitij Khare and Bala Rajaratnam},
  journal= {arXiv preprint arXiv:1111.6845},
  year   = {2012}
}
R2 v1 2026-06-21T19:43:19.611Z