Abstract:
How to place equal balls in the $N$-dimensional Euclidean space in the
densest possible way? The problem is non-trivial even in dimension $N=2$.
In dimension 3 the answer was obtained at the very end of 20th century,
and for $N=4$ it is yet unknown.
In the introduction I shall present the history, the statement of the
problem, and some well-known results. The main part is devoted to
astounding results of Maryna Viazovska, who solved the problem in
dimensions 8 and 24 using quasimodular forms. At the end I plan to recall
some results of mine for very large dimensions $(N \to \infty)$, based on
algebraic geometry and number theory.
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