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James Oxley
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Charles Semple
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Geoff Whittle
Keywords:
Binary matroids, Circuit-hyperplane relaxations
Abstract
It is well known that a rank-$r$ matroid $M$ is uniquely determined by its circuits of size at most $r$. This paper proves that if $M$ is binary and $r\ge 3$, then $M$ is uniquely determined by its circuits of size at most $r-1$ unless $M$ is a binary spike or a special restriction thereof. In the exceptional cases, $M$ is determined up to isomorphism.
