Symplectic groups and the Klein-Gordon field |
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Authors: | John Palmer |
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Institution: | Department of Mathematics, State University of New York, Stony Brook, New York 11794 USA |
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Abstract: | In this paper a Cohen factorization theorem x = at · xt (t > 0) is proved for a Banach algebra A with a bounded approximate identity, where t ? at is a continuous one-parameter semigroup in A. This theorem is used to show that a separable Banach algebra B has a bounded approximate identity bounded by 1 if and only if there is a homomorphism θ from L1(+) into B such that ∥ θ ∥ = 1 and θ(L1(+)). B = B = B · θ(L1(+)). Another corollary is that a separable Banach algebra with bounded approximate identity has a commutative bounded approximate identity, which is bounded by 1 in an equivalent algebra norm. |
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