Removing Isolated Zeroes by Homotopy

Abstract

Suppose that the inverse image of the zero vector by a continuous map f: Rn Rq has an isolated point P. There is a local obstruction to removing this isolated zero by a small perturbation, generalizing the notion of index for vector fields, the q=n case. The existence of a continuous map g which approximates f but is nonvanishing near P is equivalent to a topological property we call "locally inessential," and for dimensions n, q where πn-1(Sq-1) is trivial, every isolated zero is locally inessential. We consider the problem of constructing such an approximation g, and show that there exists a continuous homotopy from f to g through locally nonvanishing maps. If f is a semialgebraic map, then there exists such a homotopy which is also semialgebraic. For q=2 and f real analytic with a locally inessential isolated zero, there exists a H\"older continuous homotopy F(x,t) which, for (x,t)(P,0), is real analytic and nonvanishing. The existence of a smooth homotopy, given a smooth map f, is stated as an open question.