Circuit decompositions of binary matroids
Abstract
Given a simple Eulerian binary matroid M, what is the minimum number of disjoint circuits necessary to decompose M? We prove that |M| / (rank(M) + 1) many circuits suffice if M = F2n \0\ is the complete binary matroid, for certain values of n, and that O(2rank(M) / (rank(M) + 1)) many circuits suffice for general M. We also determine the asymptotic behaviour of the minimum number of circuits in an odd-cover of M.
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