The number of trees in a graph
Abstract
Let T be a tree with t edges. We show that the number of isomorphic (labeled) copies of T in a graph G = (V,E) of minimum degree at least t is at least \[2|E| Πv ∈ V (d(v) - t + 1)(t-1)d(v)2|E|.\] Consequently, any n-vertex graph of average degree d and minimum degree at least t contains at least nd(d-t+1)t-1 isomorphic (labeled) copies of T. This answers a question of Dellamonica et. al. (where the above statement was proved when T is the path with three edges) while extending an old result of Erd os and Simonovits.
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