The Partition Rank of a Tensor and k-Right Corners in Fqn

Abstract

Following the breakthrough of Croot, Lev, and Pach, Tao introduced a symmetrized version of their argument, which is now known as the slice rank method. In this paper, we introduce a more general version of the slice rank of a tensor, which we call the Partition Rank. This allows us to extend the slice rank method to problems that require the variables to be distinct. Using the partition rank, we generalize a recent result of Ge and Shangguan, and prove that any set A⊂Fqn of size \[|A|>n+(k-1)q(k-1)(q-1)\] contains a k-right-corner, that is distinct vectors x1,…,xk,xk+1 where x1-xk+1,…,xk-xk+1 are mutually orthogonal, for q=pr, a prime power with p>k.