Maximum subsets of Fnq containing no right angles

Abstract

Recently, Croot, Lev, and Pach (Ann. of Math., 185:331--337, 2017.) and Ellenberg and Gijswijt (Ann. of Math., 185:339--443, 2017.) developed a new polynomial method and used it to prove upper bounds for three-term arithmetic progression free sets in Z4n and F3n, respectively. Their approach was later summarized by Tao and is now known as the slice rank method. In this paper, we apply this method to obtain a new upper bound on the cardinality of subsets of Fnq which contain no right angles. More precisely, let q be a fixed odd prime power and x· y be the standard inner product of two vectors x,y∈Fqn, we prove that the maximum cardinality of a subset A⊂eqFqn without three distinct elements x,y,z∈ A satisfying (z-x)· (y-x)=0 is at most n+qq-1+3. For sufficiently large n, our result significantly improves the previous upper bound of Bennett (European J. Combin., 70:155--163, 2018.), who showed that |A|=O(qn+23).