Complexes of Nonseparating Curves and Mapping Class Groups
Abstract
Let R be a compact, connected, orientable surface of genus g, ModR* be the extended mapping class group of R, C(R) be the complex of curves on R, and N(R) be the complex of nonseparating curves on R. We prove that if g ≥ 2 and R has at most g-1 boundary components, then a simplicial map λ: N(R) N(R) is superinjective if and only if it is induced by a homeomorphism of R. We prove that if g ≥ 2 and R is not a closed surface of genus two then Aut(N(R))= ModR*, and if R is a closed surface of genus two then Aut(N(R))= ModR * /C(ModR*). We also prove that if g=2 and R has at most one boundary component, then a simplicial map λ: C(R) C(R) is superinjective if and only if it is induced by a homeomorphism of R. As a corollary we prove some new results about injective homomorphisms from finite index subgroups to ModR*. The last two results complete the author's previous results to connected orientable surfaces of genus at least two.
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