A constructive characterisation of circuits in the simple (2,1)-sparse matroid
Abstract
A simple graph G=(V,E) is a (2,1)-circuit if |E|=2|V| and |E(H)|≤ 2|V(H)|-1 for every proper subgraph H of G. Motivated, in part, by ongoing work to understand unique realisations of graphs on surfaces, we derive a constructive characterisation of (2,1)-circuits. The characterisation uses the well known 1-extension and X-replacement operations as well as several summation moves to glue together (2,1)-circuits over small cutsets.
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