On π1-injectivity of self-maps in low dimensions

Abstract

We show that all self-maps of non-zero degree of 3-manifolds not covered by S3 and of Thurston geometric 4-manifolds and their connected sums not covered by N\#(\#p≥0S2× S2)\#(\#q≥0 C P2), where N is an S2× X2 or S3× R manifold, are π1-injective. We thus determine when these maps induce π1-isomorphisms. The results in dimension three were previously established by Shicheng Wang. We give a uniform group theoretic proof in all cases based only on the residual finiteness of the fundamental groups for the π1-injectivity and then only on numerical invariants for the π1-isomorphisms.

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