Edge Preserving Maps of the Nonseparating Curve Graphs, Curve Graphs and Rectangle Preserving Maps of the Hatcher-Thurston Graphs

Abstract

Let R be a compact, connected, orientable surface of genus g with n boundary components with g ≥ 2, n ≥ 0. Let N(R) be the nonseparating curve graph, C(R) be the curve graph and HT(R) be the Hatcher-Thurston graph of R. We prove that if λ : N(R) →N(R) is an edge-preserving map, then λ is induced by a homeomorphism of R. We prove that if θ : C(R) → C(R) is an edge-preserving map, then θ is induced by a homeomorphism of R. We prove that if R is closed and τ: HT(R) →HT(R) is a rectangle preserving map, then τ is induced by a homeomorphism of R. We also prove that these homeomorphisms are unique up to isotopy when (g, n) ≠ (2, 0).