Squared polynomial approximation kernels for the hypercube: improved error bounds and implications for Lasserre hierarchies

Abstract

We propose a new family of polynomial approximation kernels for approximating nonnegative polynomials on the hypercube [-1,1]n. Our Kernels produce polynomial sums-of-squares of degree r, achieving an O(3 r/r2) error in the 1-norm of the coefficients. This improves on the known error bound O(1/r) from the literature. As a corollary, we obtain an improved convergence rate for the Lasserre hierarchy for polynomial optimization on the hypercube, again improving a known rate by Baldi and Slot from O(1/r) to O(3 r/r2).