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arxiv: 2104.11606 · v2 · pith:55LVJWSRnew · submitted 2021-04-23 · 🧮 math.OC · math.AG

On the complexity of Putinar-Vasilescu's Positivstellensatz

classification 🧮 math.OC math.AG
keywords varepsiloncomplexitysigmapolynomialmathcalpositivstellensatzarraybegin
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We provide a new degree bound on the weighted sum-of-squares (SOS) polynomials for Putinar-Vasilescu's Positivstellensatz. This leads to another Positivstellensatz saying that if $f$ is a polynomial of degree at most $2 d_f$ nonnegative on a semialgebraic set having nonempty interior defined by finitely many polynomial inequalities $g_j(x)\ge 0$, $j=1,\dots,m$ with $g_1:=L-\|x\|_2^2$ for some $L>0$, then there exist positive constants $\bar c$ and $c$ depending on $f,g_j$ such that for any $\varepsilon>0$, for all $k\ge \bar c \varepsilon^{-c}$, $f$ has the decomposition \begin{equation} \begin{array}{l} (1+\|x\|_2^2)^k(f+\varepsilon)=\sigma_0+\sum_{j=1}^m \sigma_jg_j \,, \end{array} \end{equation} for some SOS polynomials $\sigma_j$ being such that the degrees of $\sigma_0,\sigma_jg_j$ are at most $2(d_f+k)$. Here $\|\cdot\|_2$ denotes the $\ell_2$ vector norm. As a consequence, we obtain a converging hierarchy of semidefinite relaxations for lower bounds in polynomial optimization on basic compact semialgebraic sets. The complexity of this hierarchy is $\mathcal{O}(\varepsilon^{-c})$ for prescribed accuracy $\varepsilon>0$. In particular, if $m=L=1$ then $c=65$, yielding the complexity $\mathcal{O}(\varepsilon^{-65})$ for the minimization of a polynomial on the unit ball. Our result improves the complexity bound $\mathcal{O}(\exp(\varepsilon^{-c}))$ due to Nie and Schweighofer in [Journal of Complexity 23.1 (2007): 135-150].

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