The toric cobordisms

Abstract

A smooth closed 3-manifold M fibered by tori T2 is characterized by an element φ ∈ GL(2,Z). We show that M is the boundary of a 4-manifold fibered by tori over a surface such that the bundle structure on M is the restriction of the bundle structure on the 4-manifold if and only if φ is from the commutator subgroup (GL(2,Z))'. The notions of oriented and unoriented cobordisms in the class of closed 3-manifolds fibered by tori are introduced. It turns out that in this case the cobordisms form a group, namely Z12 in the oriented case and Z22 in the unoriented one. When the surface on the base of oriented cobordism is orientable, it is shown that its minimal genus can be calculated by Culler's algorithm.

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