Any multi-index sequence has an interpolating measure

Abstract

R. P. Boas showed that any single-index sequence \ βi \i=0∞ of real numbers can be represented as βi =∫0∞ xi \, dμ (i=0,1,2,…), where μ is a signed measure. As Boas said his observation seemed to be quite unexpected; however, it is even possible to extend the result to any multi-index sequence of real numbers. In addition, we can also prove that any multi-index finite sequence admits a measure of a similar type.