The threshold for combs in random graphs
Abstract
For k n let Combn,k denote the tree consisting of an (n/k)-vertex path with disjoint k-vertex paths beginning at each of its vertices. An old conjecture says that for any k=k(n) the threshold for the random graph G(n,p) to contain Combn,k is at p nn. Here we verify this for k ≤ C n with any fixed C>0. In a companion paper, using very different methods, we treat the complementary range, proving the conjecture for k≥ 0 n (with 0≈ 4.82).
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