Dense binary PG(t-1,2)-free matroids have critical number t-1 or t

Abstract

The critical threshold of a (simple binary) matroid N is the infimum over all such that any N-free matroid M with |M|>2r(M) has bounded critical number. In this paper, we resolve two conjectures of Geelen and Nelson, showing that the critical threshold of the projective geometry PG(t-1,2) is 1-3·2-t. We do so by proving the following stronger statement: if M is PG(t-1,2)-free with |M|>(1-3·2-t)2r(M), then the critical number of M is t-1 or t. Together with earlier results of Geelen and Nelson [GN14] and Govaerts and Storme [GS06], this completes the classification of dense PG(t-1,2)-free matroids.