Complexity for exact polynomial optimization strengthened with Fritz John conditions

Abstract

Let f,g1,…,gm be polynomials of degree at most d with real coefficients in a vector of variables x=(x1,…,xn). Assume that f is non-negative on a basic semi-algebraic set S defined by polynomial inequalities gj(x) 0, for j=1,…,m. Our previous work [arXiv:2205.04254 (2022)] has stated several representations of f based on the Fritz John conditions. This paper provides some explicit degree bounds depending on n, m, and d for these representations. In application to polynomial optimization, we obtain explicit rates of finite convergence of the hierarchies of semidefinite relaxations based on these representations.

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