Multiplicity and degree relative to a set

Abstract

The multiplicity (resp. degree) of a function f relative to a semianalytic subset S of Rn is the greatest (resp. smallest) exponent among numbers j such that the inequality |f(x)|≤ C\|x\|j holds on S near 0 (resp. near infinity) for some constant C. We show that there exists a family of curves \d\d∈ N, determined only by the set, such that the relative multiplicity of any polynomial of degree d is equal to its relative multiplicity with respect to d. Moreover, a semianalytic family (St)t∈Rm of sets given by inequalities fi+tigi≥ 0 for i=1,…, m admits a stratification of the parameter space Rm such that on each component of the top-dimensional stratum the relative multiplicity function on On does not change. Analogous results, assuming the data are algebraic, hold in the relative degree case.