Projective geometries in exponentially dense matroids. I
Abstract
We show for each positive integer a that, if is a minor-closed class of matroids not containing all rank-(a+1) uniform matroids, then there exists an integer n such that either every rank-r matroid in can be covered by at most rn sets of rank at most a, or contains the (q)-representable matroids for some prime power q, and every rank-r matroid in can be covered by at most rnqr sets of rank at most a. This determines the maximum density of the matroids in up to a polynomial factor.
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