Polygonal equalities and p-negative type
Abstract
Nontrivial p-polygonal equalities impose certain conditions on the geometry of a metric space (X,d) and so it is of interest to be able to identify the values of p ∈ [0,∞) for which such equalities exist. Following work of Li and Weston, Kelleher, Miller, Osborn and Weston established that if a metric space (X,d) is of p-negative type, then (X,d) admits no nontrivial p-polygonal equalities if and only if it is of strict p-negative type. In this note we remove the underlying premise of p-negative type from this theorem. As an application we show that the set of all p for which a finite metric space (X,d) admits a nontrivial p-polygonal equality is always a closed interval of the form [, ∞), where > 0, or the empty set. It follows that for each q = 2, the Schatten q-class Cq admits a nontrivial p-polygonal equality for each p > 0. Other spaces with this same property include C[0, 1] and q(3) for all q > 2.
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