The Effective Lasserre's Perturbative Positivstellensatz

Abstract

We study sum-of-squares (SOS) certificates for nonnegative polynomials p on Rd and their implications for polynomial optimization over unbounded domains. Building on Lasserre's perturbation approach, we consider SOS representations of p augmented by weighted polynomial tails of the form Σn=0N (x· x)n/(n!)t for 0 < t < 1. Our main result provides an explicit quantitative bound on the truncation order N required to achieve an -accurate certificate. Using positivity properties of the Mehler kernel and techniques inspired by polynomial kernel methods, we show that N grows polynomially in 1/, with rate N = O((\|p\|/)1/(1-t)).

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