Spectrally arbitrary tree sign patterns of order 4
ELA. The Electronic Journal of Linear Algebra, Tome 20 (2010), pp. 180-197.
Voir la notice de l'article dans Electronic Library of Mathematics
Summary: A sign pattern matrix (or a sign pattern, or a pattern) is a matrix whose entries are from the set +, - , 0. An n $\times n$ 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 of B is $p(x)$. An n $\times n$ sign pattern A is an inertially arbitrary pattern (IAP) if (r, s, t) belongs to the inertia set of A for every nonnegative integer triple (r, s, t) with r + s + t = n. Tree sign patterns are investigated, with a special emphasis on $4\times 4$ tridiagonal sign patterns. The set of spectrally arbitrary sign patterns is a subset of the set of potentially stable sign patterns, and for tree sign patterns of order 4, the set of all potentially stable sign patterns is known. The main results are obtained by determining which of these potentially stable sign patterns are SAPs. Necessary and sufficient conditions for an irreducible $4 \times 4$ tridiagonal pattern to be an SAP are found.As a result, all $4 \times 4$ tree sign patterns that are SAPs are characterized. A new technique, an innovative application of Gr$\ddot $obner bases for demonstrating that a sign pattern is not potentially nilpotent, is introduced. Connections between the SAP classes and the classes of potentially nilpotent and potentially stable patterns are explored. Some interesting open questions are also provided.
Classification :
15B35, 15A18, 15A24, 15A48, 05C05, 05C50
Mots-clés : sign pattern matrix, spectrally arbitrary pattern, inertially arbitrary pattern, tree sign pattern, potentially nilpotent pattern, potentially stable pattern, gr$\ddot $obner basis
Mots-clés : sign pattern matrix, spectrally arbitrary pattern, inertially arbitrary pattern, tree sign pattern, potentially nilpotent pattern, potentially stable pattern, gr$\ddot $obner basis
@article{EEJLA_2010__20__a40,
author = {Arav, Marina and Hall, Frank and Li, Zhongshan and Kaphle, Krishna and Manzagol, Nilay},
title = {Spectrally arbitrary tree sign patterns of order 4},
journal = {ELA. The Electronic Journal of Linear Algebra},
pages = {180--197},
publisher = {mathdoc},
volume = {20},
year = {2010},
language = {en},
url = {https://geodesic-test.mathdoc.fr/item/EEJLA_2010__20__a40/}
}
TY - JOUR AU - Arav, Marina AU - Hall, Frank AU - Li, Zhongshan AU - Kaphle, Krishna AU - Manzagol, Nilay TI - Spectrally arbitrary tree sign patterns of order 4 JO - ELA. The Electronic Journal of Linear Algebra PY - 2010 SP - 180 EP - 197 VL - 20 PB - mathdoc UR - https://geodesic-test.mathdoc.fr/item/EEJLA_2010__20__a40/ LA - en ID - EEJLA_2010__20__a40 ER -
%0 Journal Article %A Arav, Marina %A Hall, Frank %A Li, Zhongshan %A Kaphle, Krishna %A Manzagol, Nilay %T Spectrally arbitrary tree sign patterns of order 4 %J ELA. The Electronic Journal of Linear Algebra %D 2010 %P 180-197 %V 20 %I mathdoc %U https://geodesic-test.mathdoc.fr/item/EEJLA_2010__20__a40/ %G en %F EEJLA_2010__20__a40
Arav, Marina; Hall, Frank; Li, Zhongshan; Kaphle, Krishna; Manzagol, Nilay. Spectrally arbitrary tree sign patterns of order 4. ELA. The Electronic Journal of Linear Algebra, Tome 20 (2010), pp. 180-197. https://geodesic-test.mathdoc.fr/item/EEJLA_2010__20__a40/