Every Dehn surgery manifold of a component-conservatively invertible link is embedded into a closed oriented 4-manifold with the Z/2-homology of S 1×S3, where Z/2 = Z[ 1 2 ] is a subring of Q. This 3-manifold and 4-manifold give a typical example of a closed Samsara 4-manifold on an invertible 3-manifold. After observing that not every closed oriented 3… (More)

@inproceedings{Kawauchi2014ComponentconservativeIO,
title={Component-conservative invertibility of links and Samsara 4-manifolds on 3-manifolds},
author={Akio Kawauchi},
year={2014}
}