What is the Degree of a Smooth Hypersurface?

Abstract

Let D be a disk in Rn and f∈ Cr+2(D, Rk). We deal with the problem of the algebraic approximation of the set jrf-1(W) consisting of the set of points in the disk D where the r-th jet extension of f meets a given semialgebraic set W⊂ Jr(D, Rk). Examples of sets arising in this way are the zero set of f, or the set of its critical points. Under some transversality conditions, we prove that f can be approximated with a polynomial map p:D Rk such that the corresponding singularity is diffeomorphic to the original one, and such that the degree of this polynomial map can be controlled by the Cr+2 data of f. More precisely, equation deg(p) O(\|f\|Cr+2(D, Rk)distCr+1(f, W)), equation where W is the set of maps whose r-th jet extension is not transverse to W. The estimate on the degree of p implies an estimate on the Betti numbers of the singularity, however, using more refined tools, we prove independently a similar estimate, but involving only the Cr+1 data of f. These results specialize to the case of zero sets of f∈ C2(D, R), and give a way to approximate a smooth hypersurface defined by the equation f=0 with an algebraic one, with controlled degree (from which the title of the paper). In particular, we show that a compact hypersurface Z⊂ D⊂ Rn with positive reach (Z)>0 is isotopic to the zero set in D of a polynomial p of degree equation deg(p)≤ c(D)· 2 (1+1(Z)+5n(Z)2),equation where c(D)>0 is a constant depending on the size of the disk D (and in particular on the diameter of Z).