The extremal functions of classes of matroids of bounded branch-width
Abstract
For a set of matroids M, let exM(n) be the maximum size of a simple rank-n matroid in M. We prove that, for any finite field F, if M is a minor-closed class of F-representable matroids of bounded branch-width, then n → ∞ exM(n) / n exists and is a rational number, . We also show that exM(n) - n is periodic when n is sufficiently large and that exM is achieved by a subclass of M of bounded path-width.
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