On cap sets and the group-theoretic approach to matrix multiplication
arXiv:1605.06702 · doi:10.19086/da.1245
Abstract
In 2003, Cohn and Umans described a framework for proving upper bounds on the exponent $Ï$ of matrix multiplication by reducing matrix multiplication to group algebra multiplication, and in 2005 Cohn, Kleinberg, Szegedy, and Umans proposed specific conjectures for how to obtain $Ï=2$. In this paper we rule out obtaining $Ï=2$ in this framework from abelian groups of bounded exponent. To do this we bound the size of tricolored sum-free sets in such groups, extending the breakthrough results of Croot, Lev, Pach, Ellenberg, and Gijswijt on cap sets. As a byproduct of our proof, we show that a variant of tensor rank due to Tao gives a quantitative understanding of the notion of unstable tensor from geometric invariant theory.
27 pages