Hypergraph Extensions of Spectral Tur\'an Theorem

Abstract

The spectral Tur\'an theorem states that the k-partite Tur\'an graph is the unique graph attaining the maximum adjacency spectral radius among all graphs of order n containing no the complete graph Kk+1 as a subgraph. This result is known to be stronger than the classical Tur\'an theorem. In this paper, we consider hypergraph extensions of spectral Tur\'an theorem. For k≥ r≥ 2, let Hk+1(r) be the r-uniform hypergraph obtained from Kk+1 by enlarging each edge with a new set of (r-2) vertices. Let Fk+1(r) be the r-uniform hypergraph with edges: \1,2,…,r\ =: [r] and Eij \i,j\ over all pairs \i,j\∈ [k+1]2[r]2, where Eij are pairwise disjoint (r-2)-sets disjoint from [k+1]. Generalizing the Tur\'an theorem to hypergraphs, Pikhurko [J. Combin. Theory Ser. B, 103 (2013) 220--225] and Mubayi and Pikhurko [J. Combin. Theory Ser. B, 97 (2007) 669--678] respectively determined the exact Tur\'an number of Hk+1(r) and Fk+1(r), and characterized the corresponding extremal hypergraphs. Our main results show that Tr(n,k), the complete k-partite r-uniform hypergraph on n vertices where no two parts differ by more than one in size, is the unique hypergraph having the maximum p-spectral radius among all n-vertex Hk+1(r)-free (resp. Fk+1(r)-free) r-uniform hypergraphs for sufficiently large n. These findings are obtained by establishing p-spectral version of the stability theorems. Our results offer p-spectral analogues of the results by Mubayi and Pikhurko, and connect both hypergraph Tur\'an theorem and hypergraph spectral Tur\'an theorem in a unified form via the p-spectral radius.