The pure Y=Xd truncated moment problem

Abstract

Let β β(2n) be a real bivariate sequence of degree 2n. We study the existence of representing measures for β supported in the curve y=xd (d 1) in the case when all column dependence relations in the moment matrix Mn(β) are generated by the relation Y=Xd. We prove that the core variety of β, CV(Lβ), is nonempty (equivalently, representing measures exist) if and only if C, the partially defined core matrix of β, admits a positive, recursively generated completion C[A]. Moreover, CV(Lβ) is the entire curve y=xd if and only if there is a positive definite completion C[A]. In the remaining case, if there is a measure, it is unique and finitely atomic. For d = 3, we use these results to compute the core variety of β and give new characterizations of the existence of representing measures, which complement a result of the first-named author.