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Department of Mathematics,
University of California San Diego

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Math 269 - Combinatorics Seminar

Josh Zahl

University of British Columbia (UBC)

Breaking the 3/2 barrier for unit distances in three dimensions

Abstract:

The unit distance problem asks: given $n$ points in $\mathbb R^d$, how many pairs of points can have distance one? This problem can be re-phrased as a question in incidence geometry, and standard machinery from that field leads to certain non-optimal bounds. I will discuss some recent progress on the unit distance problem in three dimensions that goes beyond the standard tools of incidence geometry.

Host: Andrew Suk

May 15, 2018

4:00 PM

AP&M 7321

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