Local multiplicity of continuous maps between manifolds

Abstract

Let M and N be smooth (real or complex) manifolds, and let M be equipped with some Riemannian metric. A continuous map f M N admits a local k-multiplicity if, for every real number ω >0, there exist k pairwise distinct points x1,…,xk in M such that f(x1)=·s=f(xk) and \x1,…,xk\<ω. In this paper we systematically study the existence of local k-mutiplicities and derive criteria for the existence of local k-multiplicity in terms of Stiefel--Whitney classes and Chern classes of the vector bundle f*τ N(-τ M). For example, as a corollary of one criterion we deduce that for k≥ 2 a power of 2, M a compact smooth manifold with the integer s:=\ : w(M)≠ 0\, and N a parallelizable smooth manifold, if s≥ N- M+1 and ws(M)k-1≠ 0, any continuous map M N admits a local k-multiplicity. Furthermore, as a special case of this corollary we recover, when k=2, the classical criterion for the non-existence of an immersion M N between manifolds M and N.