The number of rank-k flats in a matroid with no U2,n-minor
Abstract
We show that, if k and are positive integers and r is sufficiently large, then the number of rank-k flats in a rank-r matroid M with no U2,+2-minor is less than or equal to number of rank-k flats in a rank-r projective geometry over GF(q), where q is the largest prime power not exceeding .
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