On Pietsch measures for summing operators and dominated polynomials
Abstract
We relate the injectivity of the canonical map from C(BE') to Lp(μ), where μ is a regular Borel probability measure on the closed unit ball BE' of the dual E' of a Banach space E endowed with the weak* topology, to the existence of injective p-summing linear operators/p-dominated homogeneous polynomials defined on E having μ as a Pietsch measure. As an application we fill the gap in the proofs of some results of concerning Pietsch-type factorization of dominated polynomials.
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