The Heegaard distances cover all non-negative integers
Abstract
In this paper, we prove that (1) For any integers n≥ 1 and g≥ 2, there is a closed 3-manifold Mgn which admits a distance n Heegaard splitting of genus g except that the pair of (g, n) is (2, 1). Furthermore, Mgn can be chosen to be hyperbolic except that the pair of (g, n) is (3, 1). (2) For any integers g≥ 2 and n≥ 4, there are infinitely many non-homeomorphic closed 3-manifolds admitting distance n Heegaard splittings of genus g.
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