Spectrally Arbitrary and Inertially Arbitrary Sign Pattern Matrices

Spectrally Arbitrary and Inertially Arbitrary Sign Pattern Matrices

A sign pattern(matrix) is a matrix whose entries are from the set {+,-,0}. An n x n sign pattern matrix is a spectrally arbitrary pattern(SAP) if for every monic real polynomial p(x) of degree n, there exists a real matrix B whose entries agree in sign with A such that the characteristic polynomial...

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Bibliographic Details
Main Author:	Demir, Nilay Sezin
Format:	Others
Published:	Digital Archive @ GSU 2007
Subjects:	potentially stable pattern sign pattern matrix spectrally arbitrary pattern grobner basis inertially arbitrary pattern potentially nilpotent pattern tree sign pattern Mathematics
Online Access:	http://digitalarchive.gsu.edu/math_theses/26 http://digitalarchive.gsu.edu/cgi/viewcontent.cgi?article=1025&context=math_theses

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