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Preservers of spectral radius, numerical radius, or spectral norm of the sum on nonnegative matrices

โœ Scribed by Chi-Kwong Li; Leiba Rodman

Publisher
Elsevier Science
Year
2009
Tongue
English
Weight
242 KB
Volume
430
Category
Article
ISSN
0024-3795

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โœฆ Synopsis

Let M + n be the set of entrywise nonnegative n ร— n matrices. Denote by r(A) the spectral radius (Perron root) of A โˆˆ M + n . Characterization is obtained for maps f :

In particular, it is shown that such a map has the form

for some S โˆˆ M + n with exactly one positive entry in each row and each column. Moreover, the same conclusion holds if the spectral radius is replaced by the spectrum or the peripheral spectrum. Similar results are obtained for maps on the set of n ร— n nonnegative symmetric matrices. Furthermore, the proofs are extended to obtain analogous results when spectral radius is replaced by the numerical range, or the spectral norm. In the case of the numerical radius, a full description of preservers of the sum is also obtained, but in this case it turns out that the standard forms do not describe all such preservers.

๐Ÿ“œ SIMILAR VOLUMES

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โœ Zejun Huang ๐Ÿ“‚ Article ๐Ÿ“… 2011 ๐Ÿ› Elsevier Science ๐ŸŒ English โš– 140 KB

## We prove the spectral radius inequality ฯ(A for nonnegative matrices using the ideas of Horn and Zhang. We obtain the inequality A โ€ข B ฯ(A T B) for nonnegative matrices, which improves Schur's classical inequality , where โ€ข denotes the spectral norm. We also give counterexamples to two conject