Universal geometric non-embedding of random regular graphs
Abstract
Let 3 be fixed, n n be a large integer. It is a classical result that --regular expanders on n vertices are not embeddable as geometric (distance) graphs into Euclidean space of dimension less than c n, for some universal constant c. We show that for typical -regular graphs, this obstruction is universal with respect to the choice of norm. More precisely, for a uniform random -regular graph G on n vertices, it holds with high probability: there is no normed space of dimension less than c n which admits a geometric graph isomorphic to G. The proof is based on a seeded multiscale --net argument.
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