π1-injective bounding and application to 3- and 4-manifolds

Abstract

Suppose a closed oriented n-manifold M bounds an oriented (n+1)-manifold. It is known that M π1-injectively bounds an oriented (n+1)-manifold W. We prove that π1(W) can be residually finite if π1(M) is, and π1(W) can be finite if π1(M) is. In particular, each closed 3-manifold M π1-injectively bounds a 4-manifold with residually finite π1, and bounds a 4-manifold with finite π1 if π1(M) is finite. Applications to 3- and 4-manifolds are given: (1) We study finite group actions on closed 4-manifolds and π1-isomorphic cobordism of 3-dimensional lens spaces. Results including: (a) Two lens spaces are π1-isomorphic cobordant if and only if there is a degree one map between them. (b) Each spherical 3-manifold M S3 can be realized as the unique non-free orbit type for a finite group action on a closed 4-manifold. (2) The minimal bounding index Ob(M) for closed 3-manifolds M are defined, %and bounding Euler charicteristic b(M). the relations between finiteness of Ob(M) and virtual achirality of aspherical (hyperbolic) M are addressed. We calculate Ob(M) for some lens spaces M. Each prime is realized as a minimal bounding index. (3) We also discuss some concrete examples:Surface bundle often bound surface bundles, and prime 3-manifolds often virtually bound surface bundles, W bounded by some lens spaces realizing Ob is constructed.