Distance Geometry in Quasihypermetric Spaces. I

Abstract

Let (X, d) be a compact metric space and let M(X) denote the space of all finite signed Borel measures on X. Define I M(X) by \[I(μ) = ∫X ∫X d(x,y) dμ(x) dμ(y),\] and set M(X) = I(μ), where μ ranges over the collection of signed measures in M(X) of total mass 1. The metric space (X, d) is quasihypermetric if for all n ∈ , all α1, ..., αn ∈ satisfying Σi=1n αi = 0 and all x1, ..., xn ∈ X, one has Σi,j=1n αi αj d(xi, xj) ≤ 0. Without the quasihypermetric property M(X) is infinite, while with the property a natural semi-inner product structure becomes available on M0(X), the subspace of M(X) of all measures of total mass 0. This paper explores: operators and functionals which provide natural links between the metric structure of (X, d), the semi-inner product space structure of M0(X) and the Banach space C(X) of continuous real-valued functions on X; conditions equivalent to the quasihypermetric property; the topological properties of M0(X) with the topology induced by the semi-inner product, and especially the relation of this topology to the weak-* topology and the measure-norm topology on M0(X); and the functional-analytic properties of M0(X) as a semi-inner product space, including the question of its completeness. A later paper [Peter Nickolas and Reinhard Wolf, Distance Geometry in Quasihypermetric Spaces. II] will apply the work of this paper to a detailed analysis of the constant M(X).