Geodesic
A characterization of spectral operators on Hilbert spaces
Glasgow mathematical journal, Tome 23 (1982) no. 1, pp. 91-95

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Let H be a complex Hilbert space and denote by B(H) the Banach algebra of all bounded linear operators on H. In [5; 6] J. Ph. Labrousse proved that every operator S∈B(H) which is spectral in the sense of N. Dunford (see [3]) is similar to a T∈B(H) with the following propertyConversely, he showed that given an operator S∈B(H) such that its essential spectrum (in the sense of [5; 6]) consists of at most one point and such that S is similar to a T∈B(H) with the property (1), then S is a spectral operator. This led him to the conjecture that an operator S∈B(H) is spectral if and only if it is similar to a T∈B(H) with property (1). The purpose of this note is to prove this conjecture in the case of operators which are decomposable in the sense of C. Foias (see [2]). 
Albrecht, Ernst. A characterization of spectral operators on Hilbert spaces. Glasgow mathematical journal, Tome 23 (1982) no. 1, pp. 91-95. doi: 10.1017/S0017089500004821
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