Arcs on Punctured Disks Intersecting at Most Twice with Endpoints on the Boundary

Abstract

Let $D_n$ be the $n$-punctured disk. We prove that a family of essential simple arcs starting and ending at the boundary and pairwise intersecting at most twice is of size at most $\binom{n+1}{3}$. On the way, we also show that any nontrivial square complex homeomorphic to a disk whose hyperplanes are simple arcs intersecting at most twice must have a corner or a spur.Comment: Assaf Bar-Natan's MSc thesis, written under the supervision of Prof. Piotr Przytyck