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Caltech

Geometry and Topology Seminar

Friday, February 16, 2024
4:00pm to 5:00pm
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Online Event
Freedman's Link Packing Question
Elia Portnoy, Department of Mathematics, MIT,

Freedman recently posed a new question in quantitative topology about link packings. Given a link L, define the $\epsilon$-diagonal packing number $n_{L(\epsilon)}$ to be the number of copies of L that can be simultaneously embedded in $[0,1]^3$ so that (1) Each copy of $L$ is contained in a ball which is disjoint from the other copies. (2) Within each copy, the components are separated by a distance of at least $\epsilon$. We'll discuss a new construction for obtaining a lower bound on $n_{L(\epsilon)}$ and expand on Freedman's ideas to obtain an upper bound on $n_{L(\epsilon)}$ when $L$ has a non-trivial Milnor Invariant. At the end we'll mention several related open problems about link packings. This is joint work with Fedya Manin.

For more information, please contact Math Department by phone at 626-395-4335 or by email at [email protected] or visit https://sites.google.com/site/caltechgtseminar/home.