Article ID Journal Published Year Pages File Type
9503174 Journal of Mathematical Analysis and Applications 2005 9 Pages PDF
Abstract
We show that, for every orthogonally additive homogeneous polynomial P on a space of continuous functions C(K) with values in a Banach space Y, there exists a linear operator S:C(K)→Y such that P(f)=S(fn). This is the C(K) version of a related result of Sundaresam for polynomials on Lp spaces.
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Physical Sciences and Engineering Mathematics Analysis
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Orthogonally additive polynomials on spaces of continuous functions
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