Beating Product Constructions for Linear Equations Over Finite Fields
Abstract
We show that for any A⊂eq Fqn lacking non-trivial solutions to a translation-invariant linear equation of genus one, meaning that no nonempty proper subset of the coefficients sums to 0, there is a set B⊂eq Fqm in some higher dimension which also lacks non-trivial solutions, such that \[|B|1/m>|A|1/n.\] In particular, this implies that no fixed cap set in F3n gives an asymptotically optimal lower bound by direct products alone.
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