On subtensors of high partition rank

Abstract

We prove that for every positive integer d 2 there exist polynomial functions Fd, Gd: N N such that for each positive integer r, every order-d tensor T over an arbitrary field and with partition rank at least Gd(r) contains a Fd(r) × ·s × Fd(r) subtensor with partition rank at least r. We then deduce analogous results on the Schmidt rank of polynomials in zero or high characteristic.