Distance 4 curves on closed surfaces of arbitrary genus
Abstract
Let Sg denote a closed, orientable surface of genus g ≥ 2 and C(Sg) be the associated curve complex. The mapping class group of Sg, Mod(Sg) acts on C(Sg) by isometries. Since Dehn twists about certain curves generate Mod(Sg), one can ask how Dehn twists move specific vertices in C(Sg) away from themselves. We show that if two curves represent vertices at a distance 3 in C(Sg) then the Dehn twist of one curve about another yields two vertices at distance 4. This produces many tractable examples of distance 4 vertices in C(Sg). We also show that the minimum intersection number of any two curves at a distance 4 on Sg is at most (2g-1)2.
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