The extremal function for disconnected minors
Abstract
For a graph H let c(H) denote the supremum of |E(G)|/|V(G)| taken over all non-null graphs G not containing H as a minor. We show that c(H) ≤ |V(H)|+comp(H)2-1, when H is a union of cycles, verifying conjectures of Reed and Wood, and Harvey and Wood. We derive the above result from a theorem which allows us to find two vertex disjoint subgraphs with prescribed densities in a sufficiently dense graph, which might be of independent interest.
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