The Erdos-Rado Sunflower Problem for Vector Spaces

Abstract

The famous Erdos-Rado sunflower conjecture suggests that an s-sun\-flower-free family of k-element sets has size at most (Cs)k for some absolute constant C. In this note, we investigate the analog problem for k-spaces over the field with q elements. For s ≥ k+1, we show that the largest s-sunflower-free family F satisfies \[ 1 ≤ |F| / q(s-1) k+12 - k ≤ (q/(q-1))k. \] For s ≤ k, we show that \[ q-k+12 ≤ |F| / q(s-1) k+12 - k ≤ (q/(q-1))k. \] Our lower bounds rely on an iterative construction that uses lifted maximum rank-distance (MRD) codes.