A Tight Lower bound on Trees in Graphs
Abstract
Mubayi and Verstraete conjectured that if T is a tree on t + 1 vertices, then any n-vertex graph G with average degree d contains at least \[ n d(d - 1) ·s (d - t + 1) \] labeled copies of T as long as d is sufficiently large compared to t. We prove this is true and show that when the diameter of T is at least 3, equality holds iff G is the disjoint union of cliques of size d + 1. When the diameter is 2, equality holds iff G is d-regular.
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