Polygonal equalities and virtual degeneracy in Lp-spaces

Abstract

Suppose 0 < p ≤ 2 and that (, μ) is a measure space for which Lp(, μ) is at least two-dimensional. The central results of this paper provide a complete description of the subsets of Lp(, μ) that have strict p-negative type. In order to do this we study non-trivial p-polygonal equalities in Lp(, μ). These are equalities that can, after appropriate rearrangement and simplification, be expressed in the form eqnarray* Σj, i = 1n αj αi \| zj - zi \|pp & = & 0 eqnarray* where \ z1, …, zn \ is a subset of Lp(, μ) and α1, …, αn are non-zero real numbers that sum to zero. We provide a complete classification of the non-trivial p-polygonal equalities in Lp(, μ). The cases p < 2 and p = 2 are substantially different and are treated separately. The case p = 1 generalizes an elegant result of Elsner, Han, Koltracht, Neumann and Zippin. Another reason for studying non-trivial p-polygonal equalities in Lp(, μ) is due to the fact that they preclude the existence of certain types of isometry. For example, our techniques show that if (X,d) is a metric space that has strict q-negative type for some q ≥ p, then: (1) (X,d) is not isometric to any linear subspace W of Lp(, μ) that contains a pair of disjointly supported non-zero vectors, and (2) (X,d) is not isometric to any subset of Lp(, μ) that has non-empty interior. Furthermore, in the case p = 2, it also follows that (X,d) is not isometric to any affinely dependent subset of L2(, μ).