Polynomials as Lipschitz maps on the Veronese cone
Abstract
Given a Banach space X and d∈ N, we construct a metric space VXd with the property that every d-homogeneous polynomial defined on X factors through a Lipschitz map on it. We prove that the metric on VXd is independent (up to a constant) of the norm of the tensor space in which it is embedded. We apply this fact to prove that a homogeneous polynomial is Lipschitz q-summing as a polynomial if and only if its associated Lipschitz map is Lipschitz q-summing. This result generalizes the already known theorem for linear operators
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