The range of the (n + 1)th moment for distributions on [0, 1]

Abstract

Let p denote the class of all probability measures defined on the Borel subsets of the unit interval I = [0, 1]. For each positive integer n, take M_n is convex, closed, bounded, and n-dimensional; the convex hull of the space curve {(t,t², …, tⁿ): 0 ≦ t ≦ 1}; e.g., see Theorems 7.2, 7.3 of [1]. At each point (c¹, C², …, cⁿ) of Mⁿ, define Note that v⁻, v⁺ depend only on C₁, C₂, …, C_{n− 1}; V_m only on c_n; We shall as notational convenience dictates and as will be apparent from the context regard v^±_n as functions on M_{n− 1} or on higher order moment spaces and also regard V_n as a function on moment spaces of order higher than n.