Maps between circle bundles: Fiber-preserving, Finiteness and Realization of mapping degree sets

Abstract

Let Ei be an oriented circle bundle over a closed oriented aspherical n-manifold Mi with Euler class ei∈ H2(Mi;Z), i=1,2. We prove the following: (i) If every finite-index subgroup of π1(M2) has trivial center, then any non-zero degree map from E1 to E2 is homotopic to a fiber-preserving map. (ii) The mapping degree set of fiber-preserving maps from E1 to E2 is given by \0\ \k· deg(f) \ | \, k 0, \ f M1 M2 \, with \, deg(f) 0 \ such that\, f\#(e2)=ke1\, where f\# H2(M2;Z) H2(M1;Z) is the induced homomorphism. As applications of (i) and (ii), we obtain the following results with respect to the finiteness and the realization problems for mapping degree sets: ( F) The mapping degree set D(E1, E2) is finite if M2 is hyperbolic and e2 is not torsion. ( R) For any finite set A of integers containing 0 and each n>2, A is the mapping degree set D(M,N) for some closed oriented n-manifolds M and N. Items (i) and ( F) extend in all dimensions ≥ 3 the previously known 3-dimensional case (i.e., for maps between circle bundles over hyperbolic surfaces). Item ( R) gives a complete answer to the realization problem for finite sets (containing 0) in any dimension, establishing in particular the previously unknown cases in dimensions n= 4, 5.