Transformations of Moment Functionals

Abstract

In measure theory several results are known how measure spaces are transformed into each other. But since moment functionals are represented by a measure we investigate in this study the effects and implications of these measure transformations to moment funcationals. We gain characterizations of moments functionals. Among other things we show that for a compact and path connected set K⊂Rn there exists a measurable function g:K [0,1] such that any linear functional L:R[x1,…,xn] is a K-moment functional if and only if it has a continuous extension to some L:R[x1,…,xn]+R[g] such that L:R[t] defined by L(td) := L(gd) for all d∈N0 is a [0,1]-moment functional (Hausdorff moment problem). Additionally, there exists a continuous function f:[0,1] K independent on L such that the representing measure μ of L provides the representing measure μ f-1 of L. We also show that every moment functional L:V is represented by λ f-1 for some measurable function f:[0,1]n where λ is the Lebesgue on [0,1].