Spectral Tur\'an Problems for Expanded hypergraphs

TL;DR

This paper establishes spectral stability results for hypergraphs avoiding certain expanded subgraphs, identifies extremal hypergraphs maximizing spectral radius under these constraints, and extends classical Turán-type results to hypergraph expansions.

Contribution

It introduces spectral stability theorems for hypergraphs avoiding expanded subgraphs and characterizes extremal hypergraphs maximizing spectral radius.

Findings

Spectral stability implies hypergraph structure close to Turán hypergraphs.

Identifies extremal hypergraphs for avoiding multiple disjoint expanded cliques.

Extends classical Turán results to hypergraph expansions.

Abstract

Given a graph $F$, the expansion $F^{(r)}$ of $F$ is defined as the $r$-uniform hypergraph obtained from $F$ by adding a set of $(r-2)$ distinct new vertices to each edge of $F$. In this paper, we investigate spectral stability results for hypergraphs and their applications.We first establish a spectral stability property: for any $r$-uniform hypergraph containing no copy of the expansion $F^{(r)}$ of a $(k+1)$-chromatic graph $F$, if its $p$-spectral is close to the extremal value, then the hypergraph is structurally close to $T_r(n, k)$, the complete $k$-partite $r$-uniform hypergraph on $n$ vertices where sizes of any two parts differ by at most one.Using this spectral stability result, we determine the unique extremal hypergraph that maximizes the $p$-spectral radius among all $n$-vertex $r$-uniform hypergraphs without $t$ vertex-disjoint copies of the expansion $K_{k+1}^{(r)}$ of $K_{k+1}$. We prove that this extremal hypergraph is isomorphic to $K_{t-1}^{r} \,\vee\, T_r(n-t+1, k)$, the join of the complete $r$-uniform hypergraph $K_{t-1}^{r}$ and $T_r(n-t+1, k)$.As a corollary, we show that $K_{t-1}^{r} \,\vee\, T_r(n-t+1, k)$ is the unique extremal hypergraph for $tK_{k+1}^{(r)}$, which extends a result of Pikhurko [J. Combin. Theory Ser. B, 103 (2013) 220--225] for expanded complete graphs.