Eric Naslund scite author profile

In 2003, Cohn and Umans described a framework for proving upper bounds on the exponent ω 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 ω = 2. In this paper we rule out obtaining ω = 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.

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Upper Bounds for Sunflower-Free Sets

Naslund

Sawin

2017

Forum of Mathematics, Sigma

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Exponential bounds for the Erdős-Ginzburg-Ziv constant

Naslund¹

2020

Journal of Combinatorial Theory, Series A

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The partition rank of a tensor and k-right corners in Fqn

Naslund¹

2020

Journal of Combinatorial Theory, Series A

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On Improving Roth's Theorem in the Primes

Naslund

2014

Mathematika

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Let A ⊂ {1, . . . , N } be a set of prime numbers containing no nontrivial arithmetic progressions. Suppose that A has relative density α = |A|/π(N ), where π(N ) denotes the number of primes in the set {1, . . . , N }. By modifying Helfgott and De Roton's work [Improving Roth's theorem in the primes. Int. Math. Res. Not. IMRN 2011 (4) (2011), 767-783], we improve their bound and show thatIn 1939, Van Der Corput [13] showed that P contains infinitely many nontrivial three-term arithmetic progressions. Green [4] proved an analogue of

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Eric Naslund

On cap sets and the group-theoretic approach to matrix multiplication

Upper Bounds for Sunflower-Free Sets

Exponential bounds for the Erdős-Ginzburg-Ziv constant

The partition rank of a tensor and k-right corners in Fqn

On Improving Roth's Theorem in the Primes

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