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A result on hermitian operators
Published online by Cambridge University Press: 18 May 2009
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Let X be a complex Banach space. For any bounded linear operator T on X, the (spatial) numerical range of T is denned as the set
If V(T) ⊆ R, then T is called hermitian. Vidav and Palmer (see Theorem 6 of [3, p. 78] proved that if the set {H + iK:H and K are hermitian} contains all operators, then X is a Hilbert space. It is natural to ask the following question.
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- Copyright © Glasgow Mathematical Journal Trust 1989
References
1.Berkson, E., Some types of Banach spaces, hermitian operators, and Bade functionals, Trans. Amer. Math. Soc. 116 (1965), 376–385.CrossRefGoogle Scholar
2.Berkson, E., A characterization of complex Hilbert spaces, Bull. London Math Soc. 2 (1970), 313–315.CrossRefGoogle Scholar
3.Bonsall, F. F. and Duncan, J., Numerical ranges of operators on normed spaces and of elements of normed algebras, London Math. Soc. Lecture Notes series, 2 (C.U.P., 1971).CrossRefGoogle Scholar
4.Bonsall, F. F. and Duncan, J., Numerical ranges II, London Math. Soc. Lecture Notes Series, 10 (C.U.P., 1973).CrossRefGoogle Scholar
5.Kalton, N. J. and Wood, G. V., Orthonormal systems in Banach spaces and their applications, Math. Proc. Camb. Phil. Soc. 76 (1976), 493–510.CrossRefGoogle Scholar
6.Mattila, K., Normal operators and proper boundary points of the spectra of operators on a Banach space, Ann. Acad. Sci. Fenn. Ser, AI, Math. Dissertations 19 (1978).Google Scholar
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