| Time | Items |
|---|---|
| All day |
|
| 10am |
10/27/2023 - 10:00am In this talk I will explain my recent solution of the Halpern-Weaver Conjecture. The result is that a strip of paper that is 1 unit wide must be more than sqrt(3) units long in order for it to be smoothly folded into a paper Moebius band, and this bound is sharp. The proof is elemetary enough that I can explain the whole thing during the talk. I’ll also talk about lots of related unsolved problems.
Location:
KT 801
|
| 2pm |
10/27/2023 - 2:00pm Abstract: For a long time, there has been a folklore conjecture, often attributed to Thurston, which asserts that every almost Fuchsian manifold is foliated by closed incompressible constant mean curvature (CMC) surfaces. In this talk I will discuss our recent work using the modified mean curvature flow to prove the existence of closed incompressible surfaces of constant mean curvature in a certain class of almost Fuchsian manifolds. As an application, we confirm this CMC foliation conjecture for such a class of almost Fuchsian manifolds. This is joint work with Zheng Huang and Zhou Zhang. Location:
KT 906
|
Links
[1] https://math.yale.edu/calendar/grid/day/2023-10-26
[2] https://math.yale.edu/calendar/grid/day/2023-10-28
[3] https://math.yale.edu/event/optimal-paper-moebius-band
[4] https://math.yale.edu/event/modified-mean-curvature-flow-and-cmc-foliation-conjecture-almost-fuchsian-manifolds
[5] https://math.yale.edu/print/list/calendar/grid/day/2023-10-27
[6] webcal://math.yale.edu/calendar/export.ics