Some Symmetric Sign Patterns Requiring Full P-vertices

Abstract

A sign pattern is a matrix whose entries belong to \+, -, 0\. Let P be a symmetric sign pattern and A a real symmetric matrix in its qualitative class. A vertex vj of the underlying graph of P is called a P-vertex if mA(j)(0)-mA(0)=1, where A(j) is the principal submatrix obtained by deleting the j-th row and column of A, and mA(0), ~mA(j)(0) denotes the algebraic multiplicity of the eigenvalue 0 of A, ~A(j), respectively. We say that P requires full P-vertices if every symmetric matrix in its qualitative class has all vertices as P-vertices. In this paper, we investigate structural conditions under which symmetric sign patterns require full P-vertices. We establish necessary and sufficient conditions for several classes of sign patterns to require full P-vertices. In particular, we prove that a tree sign pattern with a 0-diagonal requires full P-vertices if and only if its underlying graph admits a perfect matching. We also derive necessary and sufficient conditions for sign patterns whose underlying graphs contain cycles but no loops to require full P-vertices.