English

Tridiagonal matrices with nonnegative entries

Combinatorics 2010-10-08 v1

Abstract

In this paper we characterize the nonnegative irreducible tridiagonal matrices and their permutations, using certain entries in their primitive idempotents. Our main result is summarized as follows. Let dd denote a nonnegative integer. Let AA denote a matrix in \matR\matR and let {thi}i=0d\{\th_i\}_{i=0}^d denote the roots of the characteristic polynomial of AA. We say AA is multiplicity-free whenever these roots are mutually distinct and contained in R\R. In this case EiE_i will denote the primitive idempotent of AA associated with thi\th_i (0id)(0 \leq i \leq d). We say AA is symmetrizable whenever there exists an invertible diagonal matrix Δ\matR\Delta \in \matR such that ΔAΔ1\Delta A \Delta^{-1} is symmetric. Let Γ(A)\Gamma(A) denote the directed graph with vertex set {0,1,...,d}\{0,1,...,d\}, where iji \rightarrow j whenever iji \neq j and Aij0A_{ij} \neq 0. Theorem: Assume that each entry of AA is nonnegative. Then the following are equivalent for 0s,td0 \leq s,t \leq d: (i) The graph Γ(A)\Gamma(A) is a bidirected path with endpoints ss, tt: (ii) The matrix AA is symmetrizable and multiplicity-free. Moreover the (s,t)(s,t)-entry of EiE_i times (thith0)...(thithi1)(thithi+1)...(thithd)(\th_i-\th_0)...(\th_i-\th_{i-1})(\th_i-\th_{i+1})...(\th_i-\th_d) is independent of ii for 0id0 \leq i \leq d, and this common value is nonzero. Recently Kurihara and Nozaki obtained a theorem that characterizes the QQ-polynomial property for symmetric association schemes. We view the above result as a linear algebraic generalization of their theorem.

Keywords

Cite

@article{arxiv.1010.1305,
  title  = {Tridiagonal matrices with nonnegative entries},
  author = {Kazumasa Nomura and Paul Terwilliger},
  journal= {arXiv preprint arXiv:1010.1305},
  year   = {2010}
}

Comments

15 pages

R2 v1 2026-06-21T16:24:57.017Z