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Matrices Totally Positive Relative to a Tree

Author:
Jhondon, Charles R.; Costas-Santos, Roberto S.; Tadchiev, Boris
URI:
https://hdl.handle.net/20.500.12412/5188
DOI:
10.13001/1081-3810.1306
Date:
2009
Keyword(s):

Totally positive matrices

Sylvester’s identity

Graph theory

Spectral theory

Abstract:

It is known that for a totally positive (TP) matrix, the eigenvalues are positive and distinct and the eigenvector associated with the smallest eigenvalue is totally nonzero and has an alternating sign pattern. Here, a certain weakening of the TP hypothesis is shown to yield a similar conclusion.

It is known that for a totally positive (TP) matrix, the eigenvalues are positive and distinct and the eigenvector associated with the smallest eigenvalue is totally nonzero and has an alternating sign pattern. Here, a certain weakening of the TP hypothesis is shown to yield a similar conclusion.

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