Unavoidable flats in matroids representable over prime fields
Abstract
We show that, for any prime p and integer k ≥ 2, a simple GF(p)-representable matroid with sufficiently high rank has a rank-k flat which is either independent in M, or is a projective or affine geometry. As a corollary we obtain a Ramsey-type theorem for GF(p)-representable matroids. For any prime p and integer k 2, if we 2-colour the elements in any simple GF(p)-representable matroid with sufficiently high rank, then there is a monochromatic flat with rank k.
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