H\"older-Type Global Error Bounds for Non-degenerate Polynomial Systems

Abstract

Let F := (f1, …, fp) Rn Rp be a polynomial map, and suppose that S := \x ∈ Rn \ : \ fi(x) 0, i = 1, …, p\ . Let d := i = 1, …, p fi and H(d, n, p) := d(6d - 3)n + p - 1. Under the assumption that the map F Rn → Rp is convenient and non-degenerate at infinity, we show that there exists a constant c > 0 such that the following so-called H\"older-type global error bound result holds c d(x,S) [f(x)]+2H(2d, n, p) + [f(x)]+ for all x ∈ Rn, where d(x, S) denotes the Euclidean distance between x and S, f(x) := i = 1, …, p fi(x), and [f(x)]+ := \f(x), 0 \. The class of polynomial maps (with fixed Newton polyhedra), which are non-degenerate at infinity, is generic in the sense that it is an open and dense semi-algebraic set. Therefore, H\"older-type global error bounds hold for a large class of polynomial maps, which can be recognized relatively easily from their combinatoric data.