Complete minors in graphs without sparse cuts
Abstract
We show that if G is a graph on n vertices, with all degrees comparable to some d = d(n), and without a sparse cut, for a suitably chosen notion of sparseness, then it contains a complete minor of order \[ ( n d d ). \] As a corollary we determine the order of a largest complete minor one can guarantee in d-regular graphs for which the second largest eigenvalue is bounded away from d/2, in (d/n, o(d))-jumbled graphs, and in random d-regular graphs, for almost all d = d(n).
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