Moore-Penrose inverse of a hollow symmetric matrix and a predistance matrix
Document Type
Conference Article
Publication Title
Special Matrices
Abstract
By a hollow symmetric matrix we mean a symmetric matrix with zero diagonal elements. The notion contains those of predistance matrix and Euclidean distance matrix as its special cases. By a centered symmetric matrix we mean a symmetric matrix with zero row (and hence column) sums. There is a one-to-one correspondence between the classes of hollow symmetric matrices and centered symmetric matrices, and thus with any hollow symmetric matrix D we may associate a centered symmetric matrix B, and vice versa. This correspondence extends a similar correspondence between Euclidean distance matrices and positive semidefinite matrices with zero row and column sums. We show that if B has rank r, then the corresponding D must have rank r, r + 1 or r + 2. We give a complete characterization of the three cases. We obtain formulas for the Moore-Penrose inverse D+ in terms of B+, extending formulas obtained in Kurata and Bapat (Linear Algebra and Its Applications, 2015). If D is the distance matrix of a weighted tree with the sum of the weights being zero, then B+ turns out to be the Laplacian of the tree, and the formula for D+ extends a well-known formula due to Graham and Lovász for the inverse of the distance matrix of a tree.
First Page
270
Last Page
282
DOI
10.1515/spma-2016-0028
Publication Date
1-1-2016
Recommended Citation
Kurata, Hiroshi and Bapat, Ravindra B., "Moore-Penrose inverse of a hollow symmetric matrix and a predistance matrix" (2016). Conference Articles. 750.
https://digitalcommons.isical.ac.in/conf-articles/750
Comments
Open Access; Gold Open Access