On the Cycle Space of a Random Graph
Abstract
Write C(G) for the cycle space of a graph G, C(G) for the subspace of C(G) spanned by the copies of the -cycle C in G, T for the class of graphs satisfying C(G)=C(G), and Q for the class of graphs each of whose edges lies in a C. We prove that for every odd ≥ 3 and G=Gn,p, \[p \, (G ∈ Q T) → 0;\] so the C's of a random graph span its cycle space as soon as they cover its edges. For =3 this was shown by DeMarco, Hamm and Kahn (2013).
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