Abstract
If R is a Banach algebra and ø ∈ R′, the dual space, then we may define a bounded linear map byWe shall show that for suitable p the requirement that each be p-absolutely summing constrains R to be an operator algebra, or even, in certain cases, a uniform algebra. In this way we are able to give generalizations of results of Varopoulos (12) and Kaijser (4).
Publisher
Cambridge University Press (CUP)
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14 articles.
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