Realising sets of integers as mapping degree sets

Abstract

Given two closed oriented manifolds M,N of the same dimension, we denote the set of degrees of maps from M to N by D(M,N). The set D(M,N) always contains zero. We show the following (non-)realisability results: (i) There exists an infinite subset A of Z containing 0 which cannot be realised as D(M,N), for any closed oriented n-manifolds M,N. (ii) Every finite arithmetic progression of integers containing 0 can be realised as D(M,N), for some closed oriented 3-manifolds M,N. (iii) Together with 0, every finite geometric progression of positive integers starting from 1 can be realised as D(M,N), for some closed oriented manifolds M,N.