On Matrices Whose Distinct Eigenvalues Are Fully Captured by Quotient Matrices
Abstract
Let be the -square matrix partitioned into blocks according to some partition of index set . The quotient matrix is a -square matrix, with , where -th entry is the average row sum (or column sum) of the corresponding block in . The partition is said to be \emph{equitable} if row sum of each block is constant. In this case, the matrix is referred to as the \emph{equitable quotient matrix} of , and the spectrum of is the subset of the spectrum of parent matrix . We characterize some classes of matrices such that their equitable quotient matrix contains all the distinct eigenvalues of , thereby information can be obtained form the smallest matrix without actually analyzing the parent matrix We present necessary and the sufficient conditions for distinct eigenvalue of contained in the spectrum of of in terms of eigenspaces. We end up article with some applications, where distinct eigenvalues of a parent matrix can be completely encoded by quotient matrix.
Keywords
Cite
@article{arxiv.2604.03194,
title = {On Matrices Whose Distinct Eigenvalues Are Fully Captured by Quotient Matrices},
author = {Bilal Ahmad Rather},
journal= {arXiv preprint arXiv:2604.03194},
year = {2026}
}
Comments
35 pages, 1 figure