Crawford numbers of powers of a matrix

Title:	Crawford numbers of powers of a matrix
Authors:	Wang, Kuo-Zhong Wu, Pei Yuan Gau, Hwa-Long 應用數學系 Department of Applied Mathematics
Keywords:	Numerical range;Crawford number;Generalized Crawford number
Issue Date:	30-Dec-2010
Abstract:	For an n-by-n matrix A, its Crawford number c(A) (resp., generalized Crawford number C(A)) is, by definition, the distance from the origin to its numerical range W(A) (resp., the boundary of its numerical range partial derivative W(A)). It is shown that if A has eigenvalues lambda(1), ..., lambda(n) An arranged so that vertical bar lambda(1)vertical bar >= ... >= vertical bar lambda(n)vertical bar, then (lim) over bar (k) c(A(k))(1/k) (resp., (lim) over bar (k) C(A(k))(1/k))equals 0 or vertical bar lambda(n)vertical bar (resp., vertical bar lambda(j)vertical bar for some j, 1 <= j <= n). For a normal A. more can be said, namely, (lim) over bar (k) c(A(k))(1/k) = vertical bar lambda(n)vertical bar (resp., (lim) over bar (k) C(A(k))(1/k) = vertical bar lambda(j)vertical bar for some j, 3 <= j <= n). In these cases, the above possible values can all be assumed by some A. (C) 2010 Elsevier Inc. All rights reserved.
URI:	http://dx.doi.org/10.1016/j.laa.2010.08.004 http://hdl.handle.net/11536/26204
ISSN:	0024-3795
DOI:	10.1016/j.laa.2010.08.004
Journal:	LINEAR ALGEBRA AND ITS APPLICATIONS
Volume:	433
Issue:	11-12
Begin Page:	2243
End Page:	2254
Appears in Collections:	Articles

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