On Heegaard splittings with finite many pairs of disjoint compression disks
Abstract
Suppose VS W is a weakly reducible Heegaard splitting of a closed 3-manifold which admits only n pairs of disjoint compression disks on distinct sides and g>2. We show VS W admits an untelescoping: (V1S1W1)F(W2S2V2) such that Wi has only one separating compressing disk and d(Si)≥ 2, for i=1,~2. If n>1, at least one of d(Si) is 2 and S is a critical Heegaard surface.
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