Group rings of three-manifold groups
Abstract
Let G be the fundamental group of a three-manifold. By piecing together many known facts about three manifold groups, we establish two properties of the group ring CG. We show that if G has rational cohomological dimension two, then CG is coherent. We also show that if G is torsion-free, then G satisfies the Strong Atiyah Conjecture over C and hence that CG satisfies Kaplansky's Zero Divisor Conjecture.
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