Abstract
In this paper we prove that the states of a unital Banach algebra generate the dual Banach space as a linear space (Theorem 2). This is a result of R. T. Moore (4, Theorem 1(a)) who uses a decomposition of measures in his proof. In the proof given here the measure theory is replaced by a Hahn-Banach separation argument. We shall let A denote a unital Banach algebra over the complex field, and D(1) denote {f ∈ A′: ‖f‖ = f(1) = 1} where A′ is the dual of A. The motivation of Moore's results is the theorem that in a C*-algebra every continuous linear functional is a linear combination of four states (the states are the elements of D(1)) (see (2, 2.6.4, 2.1.9, 1.1.10)).
Publisher
Cambridge University Press (CUP)
Reference4 articles.
1. (4) Moore R. T. , Hermitian functionals on 5-algebras and characterizations of C*-algebras, to appear.
2. Numerical Ranges of Operators on Normed Spaces and of Elements of Normed Algebras
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