The Multivariable moment problems and recursive relations (1610.03547v1)

Abstract: Let $\beta \equiv { \beta_\mathbf{i} }{\mathbf{i} \in \mathbb{Z}+^d}$ be a $d$-dimensional multisequence. Curto and Fialkow, have shown that if the infinite moment matrix $M(\beta)$ is finite-rank positive semidefinite, then $\beta$ has a unique representing measure, which is $rank M(\beta)$-atomic. Further, let $\beta^{(2n)} \equiv { \beta_\mathbf{i} }{\mathbf{i} \in \mathbb{Z}+^d, \mid \mathbf{i} \mid \leq 2n}$ be a given truncated multisequence, with associated moment matrix $M(n)$ and $rank M(n)=r$, then $\beta^{(2n)}$ has an $r$-atomic representing measure $\mu$ supported in the semi-algebraic set $K={ (t_1, \ldots, t_d) \in \mathbb{R}^d : q_j(t_1, \ldots, t_d) \geq 0, 1\leq j\leq m }$, where $q_j \in \mathbb{R}[t_1, \ldots, t_d]$, if $M(n)$ admits a positive rank-preserving extension $M(n+1)$ and the localizing matrices $M_{q_j}(n +[\frac{\deg q_j +1}{2}])$ are positive semidefinite; moreover, $\mu$ has precisely $rank M(n) - rank M_{q_j}(n +[\frac{\deg q_j +1}{2}])$ atoms in $\mathcal{Z}(q_j) \equiv { t\in \mathbb{R}^d: q_j(t)=0 }$. In this paper, we show that every truncated moment sequence $\beta^{(2n)}$ 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.