On the H-space of a random graph

Abstract

The edge space E(G) of a graph G is the vector space F2E(G) with members naturally identified with subgraphs of G, and the H-space is the subspace CH(G) of E(G) spanned by copies of the graph H. We are interested in when the random graph G = Gn,p is likely to satisfy \[CH(G) = WH(G),\] where WH(G) takes one of four natural values, depending on the value of CH(Kn). We show that for strictly 2-balanced H, w.h.p. the above equality holds whenever every edge of G is in a copy of H.

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