Lower bounds on the global minimum of a polynomial

Abstract

We extend the method of Ghasemi and Marshall [SIAM. J. Opt. 22(2) (2012), pp 460-473], to obtain a lower bound f gp,M for a multivariate polynomial f(x) ∈ R[x] of degree 2d in n variables x = (x1,...,xn) on the closed ball x ∈ Rn : Σ xi2d M, computable by geometric programming, for any real M. We compare this bound with the (global) lower bound f gp obtained by Ghasemi and Marshall, and also with the hierarchy of lower bounds, computable by semidefinite programming, obtained by Lasserre [SIAM J. Opt. 11(3) (2001) pp 796-816]. Our computations show that the bound f gp,M improves on the bound f gp and that the computation of f gp,M, like that of f gp, can be carried out quickly and easily for polynomials having of large number of variables and/or large degree, assuming a reasonable sparsity of coefficients, cases where the corresponding computation using semidefinite programming breaks down.