Minimal Euler Characteristics of 4-manifolds with 3-manifold groups
Abstract
Let π=π1(M) for a compact 3-manifold M, and let 4, p and q* be the invariants of Hausmann-Weinberger, Kotschick and Hillman respectively. For certain class of compact 3-manifolds M, including all those not containing two-sided RP2, we determine 4(π). We address when does 4(π)=p(π), when does 4(π)=q*(π), and answer a question raised by Hillman.
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