A Sylvester-Gallai-type theorem for complex-representable matroids
Abstract
The Sylvester-Gallai Theorem states that every rank-3 real-representable matroid has a two-point line. We prove that, for each k 2, every complex-representable matroid with rank at least 4k-1 has a rank-k flat with exactly k points. For k=2, this is a well-known result due to Kelly, which we use in our proof. A similar result was proved earlier by Barak, Dvir, Wigderson, and Yehudayoff and later refined by Dvir, Saraf, and Wigderson, but we get slightly better bounds with a more elementary proof.
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