Local monodromy of branched covers and dimension of the branch set

Abstract

We show that, if the local dimension of the branch set of a discrete and open mapping f M N between n-manifolds is less than (n-2) at a point y of the image of the branch set fBf, then the local monodromy of f at y is perfect. In particular, for generalized branched covers between n-manifolds the dimension of fBf is exactly (n-2) at the points of abelian local monodromy. As an application, we show that a generalized branched covering f M N of local multiplicity at most three between n-manifolds is either a covering or fBf has local dimension (n-2).