The Multivariable moment problems and recursive relations

Abstract

Let β \ βi \i ∈ Z+d be a d-dimensional multisequence. Curto and Fialkow, have shown that if the infinite moment matrix M(β) is finite-rank positive semidefinite, then β has a unique representing measure, which is rank M(β)-atomic. Further, let β(2n) \ βi \i ∈ Z+d, i ≤ 2n be a given truncated multisequence, with associated moment matrix M(n) and rank M(n)=r, then β(2n) has an r-atomic representing measure μ supported in the semi-algebraic set K=\ (t1, …, td) ∈ Rd : qj(t1, …, td) ≥ 0, 1≤ j≤ m \, where qj ∈ R[t1, …, td], if M(n) admits a positive rank-preserving extension M(n+1) and the localizing matrices Mqj(n +[ qj +12]) are positive semidefinite; moreover, μ has precisely rank M(n) - rank Mqj(n +[ qj +12]) atoms in Z(qj) \ t∈ Rd: qj(t)=0 \. In this paper, we show that every truncated moment sequence β(2n) is a subsequence of an infinite recursively generated multisequence, we investigate such sequences to give an alternative proof of Curto-Fialkow's results and also to obtain a new interesting results.