Date: September 27-28, 2021
Speakers: Selman Akbulut (GGTI) and Eylem Zeliha Yildiz (Duke University)
Title: Shaking Knots
Abstract: “Knot Shaking” is a technique introduced $44$ years ago as a tool to study exotic smoothings of $4$-manifolds with boundary. Let be $K$ be a knot, and $K^{r}$ be the $4$-manifold obtained by attaching a $2$-handle to $B^{4}$ along $K$ with framing $r$. We say that $K$ is $r$-shake slice if a generator of $H_{2}(K^{r})=Z$ is represented by a smoothly imbedded $2$-sphere; this is equivalent to saying that the link consisting of $K$ and an even number of oppositely oriented parallel copies of $K$ (parallel with respect to $r$-framing) to bound disk with holes in $B^4$. Clearly slice knots are $r$-shake slice. It is known that when $r\neq 0$ not all $r$-shake slice knots are slice, and there are knots that are not $r$-shake slice. We address the important remaining case of $r=0$, and prove that $0$-shake slice knots are slice. Along the way, we discuss how shaking is related to the exotic smooth structures and corks.
Lecture 1. Monday, September 27 at 6 AM (PT), 9 AM (EDT), 4 PM (TRT)
By Eylem Zeliha Yildiz
Zoom Meeting ID 937 1654 5820
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Lecture 2. Tuesday, September 28 at 6 AM (PT), 9 AM (EDT), 4 PM (TRT)
By Selman Akbulut
Zoom Meeting ID 912 1482 3818
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