The panted cobordism group of cusped hyperbolic 3-manifolds
Abstract
For any oriented cusped hyperbolic 3-manifold M, we study its (R,ε)-panted cobordism group, which is the abelian group generated by (R,ε)-good curves in M modulo the oriented boundaries of (R,ε)-good pants. In particular, we prove that for sufficiently small ε>0 and sufficiently large R>0, some modified version of the (R,ε)-panted cobordism group of M is isomorphic to H1(SO(M);Z).
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