Almost regular subgraphs under spectral radius constrains

Weilun Xu, Guorong Gao, An Chang
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Abstract

A graph is called $K$-almost regular if its maximum degree is at most $K$ times the minimum degree. Erd\H{o}s and Simonovits showed that for a constant $0< \varepsilon< 1$ and a sufficiently large integer $n$, any $n$-vertex graph with more than $n^{1+\varepsilon}$ edges has a $K$-almost regular subgraph with $n'\geq n^{\varepsilon\frac{1-\varepsilon}{1+\varepsilon}}$ vertices and at least $\frac{2}{5}n'^{1+\varepsilon}$ edges. An interesting and natural problem is whether there exits the spectral counterpart to Erd\H{o}s and Simonovits's result. In this paper, we will completely settle this issue. More precisely, we verify that for constants $\frac{1}{2}<\varepsilon\leq 1$ and $c>0$, if the spectral radius of an $n$-vertex graph $G$ is at least $cn^{\varepsilon}$, then $G$ has a $K$-almost regular subgraph of order $n'\geq n^{\frac{2\varepsilon^2-\varepsilon}{24}}$ with at least $ c'n'^{1+\varepsilon}$ edges, where $c'$ and $K$ are constants depending on $c$ and $\varepsilon$. Moreover, for $0<\varepsilon\leq\frac{1}{2}$, there exist $n$-vertex graphs with spectral radius at least $cn^{\varepsilon}$ that do not contain such an almost regular subgraph. Our result has a wide range of applications in spectral Tur\'{a}n-type problems. Specifically, let $ex(n,\mathcal{H})$ and $spex(n,\mathcal{H})$ denote, respectively, the maximum number of edges and the maximum spectral radius among all $n$-vertex $\mathcal{H}$-free graphs. We show that for $1\geq\xi > \frac{1}{2}$, $ex(n,\mathcal{H}) = O(n^{1+\xi})$ if and only if $spex(n,\mathcal{H}) = O(n^\xi)$.
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光谱半径约束下的几乎规则子图
如果一个图的最大度数最多是最小度数的 $K$ 倍,那么这个图就被称为 $K$-almost regular。Erd\H{o}s 和 Simonovits 证明,对于常数$0< \varepsilon< 1$和足够大的整数 $n$、任何具有超过 $n^{1+\varepsilon}$ 边的 $n$ 顶点图都有一个 $K$ 几乎规则的子图,该子图具有 $n'\geq n^\{varepsilon\frac{1-\varepsilon}{1+\varepsilon}}$ 顶点和至少 $\frac{2}{5}n'^{1+\varepsilon}$ 边。一个有趣而自然的问题是,是否存在与 Erd\H{o}s 和 Simonovits 的结果相对应的谱。本文将彻底解决这个问题。更准确地说,我们将证明,对于常数 $\frac{1}{2}0$,如果一个 $n$ 顶点图 $G$ 的谱半径至少为 $cn^\{varepsilon}$、那么$G$有一个阶为$n'\geqn^{frac{2\varepsilon^2-\varepsilon}{24}}$的$K$-几乎规则的子图,至少有$c'n'^{1+\varepsilon}$边,其中$c'$和$K$是取决于$c$和$\varepsilon$的常数。此外,对于 $0 \frac{1}{2}$,当且仅当 $spex(n,\mathcal{H}) =O(n^{1+\xi})$时,$ex(n,\mathcal{H}) =O(n^\xi)$。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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