| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 4599606 | Linear Algebra and its Applications | 2014 | 8 Pages |
Abstract
For a real n×nn×n matrix A having n+n+ (n−n−) eigenvalues with positive (resp. negative) real part, nznz zero eigenvalues and 2np2np nonzero pure imaginary eigenvalues, the refined inertia of A is ri(A)=(n+,n−,nz,2np)ri(A)=(n+,n−,nz,2np). When n=3n=3, let H3={(0,3,0,0),(0,1,0,2),(2,1,0,0)}H3={(0,3,0,0),(0,1,0,2),(2,1,0,0)}. A 3×33×3 sign pattern AA requires refined inertia H3H3 if {ri(A)|A has sign pattern A}=H3{ri(A)|A has sign pattern A}=H3. Necessary and sufficient conditions for an irreducible sign pattern to require H3H3 are given, and used to determine all such sign patterns (up to equivalence). These remove equivalences and complete the list of patterns given in [1, Appendix A].
Keywords
Related Topics
Physical Sciences and Engineering
Mathematics
Algebra and Number Theory
Authors
C. Garnett, D.D. Olesky, P. van den Driessche,