The Erd\"os-P\'osa property for clique minors in highly connected graphs
Abstract
We prove the existence of a function f: N2 -> N such that for all p,k in N every (k(p-3) + 14p+14) - connected graph either has k disjoint Kp minors or contains a set of at most f(p,k) vertices whose deletion kills all its Kp minors. For fixed p > 4, the connectivity bound of about k(p-3) is smallest possible, up to an additive constant: if we assume less connectivity in terms of k, there will be no such function f.
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