Return to Colloquia & Seminar listing

### Distance and Intersection number in the curve complex

**Geometry/Topology**

Speaker: | Bill Menasco, University of Buffalo |

Location: | 3106 MSB |

Start time: | Thu, Mar 1 2018, 1:10PM |

Let $S_g$ be a closed oriented surface of genus $g \geq 2$ and $\mathcal{C}^1(S_g)$ be its curve complex—vertices are

homotopy classes of essential simple closed curves with two vertices sharing an edge if they have disjoint representatives. It is known that

$\mathcal{C}(S_g)$ is path connected , and the

distance, $d(\alpha , \beta)$, between two vertices $\alpha , \beta \in \mathcal{C}^1(S)$ is just the minimal count of the number of edges in an

edge-path between $\alpha$ and $\beta$. One can also consider, $ i(\alpha , \beta)$, the minimal intersection between curve representatives of

$\alpha$ and $\bet$. This talk discusses how $i(\alpha , \beta)$ will grow as $d(\alpha, \beta)$ grows. This is joint work with Dan Margalit.

Please note special time/day