Proofs of Two Conjectures of Alon on Subgraph Counts

Abstract

All graphs considered are finite with no isolated vertices. Let N(m,H) be the maximum number of subgraphs of a graph G isomorphic to H, taken over all graphs G with m edges. Alon proved that N(m,H)=ΘH(mγ(H)), where γ(H)=(|V(H)|+D(H))/2 and D(H)=S⊂eq V(H)(|S|-|NH(S)|), and conjectured [Conjecture 1, Isr. J. Math., 1986] that limit of N(m,H)/mγ(H) exists as m∞. We prove this conjecture and identify the limit as λ(H)=Λ(H)/|Aut(H)|, where Λ(H) is characterized by a variational problem over finite cores. We also resolve another conjecture of Alon [Conjecture 2, Isr. J. Math., 1986], which stated that if H is a disjoint union of stars, then for every m an extremal graph attaining N(m,H) may be chosen to be a disjoint union of stars.