Recursively determined representing measures for bivariate truncated moment sequences

Abstract

A theorem of Bayer and Teichmann implies that if a finite real multisequence β = β(2d) has a representing measure, then the associated moment matrix Md admits positive, recursively generated moment matrix extensions M(d+1), M(d+2),... For a bivariate recursively determinate Md, we show that the existence of positive, recursively generated extensions M(d+1),...,M(2d-1) is sufficient for a measure. Examples illustrate that all of these extensions may be required to show that β has a measure. We describe in detail a constructive procedure for determining whether such extensions exist. Under mild additional hypotheses, we show that Md admits an extension M(d+1) which has many of the properties of a positive, recursively generated extension.