Exhausting Curve Complexes by Finite Superrigid Sets on Nonorientable Surfaces
Abstract
Let N be a compact, connected, nonorientable surface of genus g with n boundary components. Let C(N) be the curve complex of N. We prove that if (g, n) ≠ (1,2) and g + n ≠ 4, then there is an exhaustion of C(N) by a sequence of finite superrigid sets.
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