Representability of matroids with a large projective geometry minor
Abstract
We prove that for each prime power q there is an integer n such that if M is a 3-connected, representable matroid with a PG(n-1,q)-minor and no U2,q2+1-minor, then M is representable over GF(q). We also show that for >= 2, if M is a 3-connected, representable matroid of sufficiently high rank with no U2,+2-minor and |E(M)| ≥ (4)r(M)/2, then M is representable over a field of order at most .
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