Asymptotics of the Upper Matching Conjecture
Abstract
We give upper bounds for the number (G) of matchings of size in (i) bipartite graphs G=(X Y, E) with specified degrees dx (x∈ X), and (ii) general graphs G=(V,E) with all degrees specified. In particular, for d-regular, N-vertex graphs, our bound is best possible up to an error factor of the form [od(1)N], where od(1) → 0 as d → ∞. This represents the best progress to date on the "Upper Matching Conjecture" of Friedland, Krop, Lundow and Markstr\"om. Some further possibilities are also suggested.
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