Cyclic matroids
Abstract
For all positive integers s and t exceeding one, a matroid M on n elements is nearly (s, t)-cyclic if there is a cyclic ordering σ of its ground set such that every s-1 consecutive elements of σ are contained in an s-element circuit and every t-1 consecutive elements of σ are contained in a t-element cocircuit. In the case s=t, nearly (s, s)-cyclic matroids have been studied previously. In this paper, we show that if M is nearly (s, t)-cyclic and n is sufficiently large, then these s-element circuits and t-element cocircuits are consecutive in σ in a prescribed way, that is, M is "(s, t)-cyclic". Furthermore, we show that, given s and t where t s, every (s, t)-cyclic matroid on n > s+t-2 elements is a weak-map image of the (t-s2)-th truncation of a certain (s, s)-cyclic matroid. If s=3, this certain matroid is the rank-n2 whirl, and if s=4, this certain matroid is the rank-n2 free swirl.
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