Preservers of eigenvalue inclusion sets |
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| Authors: | Jim Hartman Aaron Herman Chi-Kwong Li |
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| Affiliation: | a Department of Mathematics and Computer Science, The College of Wooster, Wooster, OH 44691, United States
b Department of Mathematics, College of William and Mary, Williamsburg, VA 23185, United States |
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| Abstract: | For a square matrix A, let S(A) be an eigenvalue inclusion set such as the Gershgorin region, the Brauer region in terms of Cassini ovals, and the Ostrowski region. Characterization is obtained for maps Φ on n×n matrices satisfying S(Φ(A)-Φ(B))=S(A-B) for all matrices A and B. From these results, one can deduce the structure of additive or (real) linear maps satisfying S(A)=S(Φ(A)) for every matrix A. |
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| Keywords: | 15A86 15A18 |
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