Small intersection numbers in the curve graph
Abstract
Let Sg,p denote the genus g orientable surface with p 0 punctures, and let ω(g,p)= 3g+p-4. We prove the existence of infinitely long geodesic rays \v0,v1, v2, ...\ in the curve graph satisfying the following optimal intersection property: for any natural number k, the endpoints vi,vi+k of any length k subsegment intersect O(ωk-2) times. By combining this with work of the first author, we answer a question of Dan Margalit.
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