Special Member's Seminar
Lattice Packing of Spheres in High Dimensions Using a Stochastically Evolving Ellipsoid
We prove that in any dimension n there exists an origin-symmetric ellipsoid of volume c n^2 that contains no points of Z^n other than the origin. Here c > 0 is a universal constant. Equivalently, there exists a lattice sphere packing in R^n whose density is at least c n^2 / 2^n. Previously known constructions of sphere packings in R^n had densities of the order of magnitude of n / 2^n, up to logarithmic factors. Our proof utilizes a stochastically evolving ellipsoid that accumulates at least c n^2 lattice points on its boundary, while containing no lattice points in its interior except for the origin.
Date & Time
March 06, 2026 | 2:00pm – 3:00pm
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03/06/2026 14:00
03/06/2026 15:00
Special Member's Seminar
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Topic: Lattice Packing of Spheres in High Dimensions Using a Stochastically Evolving Ellipsoid
Speakers: Boaz Klartag, Tel Aviv University & Weizmann Institute of Science
More: https://www.ias.edu/math/events/special-members-seminar-2
We prove that in any dimension n there exists an origin-symmetric
ellipsoid of volume c n^2 that contains no points of Z^n other than
the origin. Here c > 0 is a universal constant. Equivalently, there
exists a lattice sphere packing in R^n whose density is at least c n^2
/ 2^n. Previously known constructions of sphere packings in R^n had
densities of the order of magnitude of n / 2^n, up to logarithmic
factors. Our proof utilizes a stochastically evolving ellipsoid that
accumulates at least c n^2 lattice points on its boundary, while
containing no lattice points in its interior except for the origin.
Simonyi 101
a7a99c3d46944b65a08073518d638c23
Location
Simonyi 101Speakers
Boaz Klartag, Tel Aviv University & Weizmann Institute of Science