Extremal Graph Theoretic Questions for q-Ary Vectors

Pub Date : 2024-04-24 DOI:10.1007/s00373-024-02787-4
Balázs Patkós, Zsolt Tuza, Máté Vizer
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Abstract

A q-graph H on n vertices is a set of vectors of length n with all entries from \(\{0,1,\dots ,q\}\) and every vector (that we call a q-edge) having exactly two non-zero entries. The support of a q-edge \({\textbf{x}}\) is the pair \(S_{\textbf{x}}\) of indices of non-zero entries. We say that H is an s-copy of an ordinary graph F if \(|H|=|E(F)|\), F is isomorphic to the graph with edge set \(\{S_{\textbf{x}}:{\textbf{x}}\in H\}\), and whenever \(v\in e,e'\in E(F)\), the entries with index corresponding to v in the q-edges corresponding to e and \(e'\) sum up to at least s. E.g., the q-edges (1, 3, 0, 0, 0), (0, 1, 0, 0, 3), and (3, 0, 0, 0, 1) form a 4-triangle. The Turán number \(\mathop {}\!\textrm{ex}(n,F,q,s)\) is the maximum number of q-edges that a q-graph H on n vertices can have if it does not contain any s-copies of F. In the present paper, we determine the asymptotics of \(\mathop {}\!\textrm{ex}(n,F,q,q+1)\) for many graphs F.

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q-Ary 向量的极值图论问题
n 个顶点上的 q 图 H 是一个长度为 n 的向量集合,所有条目都来自 \(\{0,1,\dots ,q\}\),并且每个向量(我们称之为 q 边)都有两个非零条目。q-edge \({\textbf{x}}\)的支持是非零条目索引的一对 \(S_{\textbf{x}}\)。如果 \(|H|=|E(F)|\)、F 与边集 \(\{S_{textbf{x}}:({textbf{x}}\in H\}\), 并且只要 \(v\in e,e'\in E(F)\), 在与 e 和 \(e'\) 对应的 q 条边中与 v 对应的索引项相加至少为 s.例如q 边 (1, 3, 0, 0, 0), (0, 1, 0, 0, 3) 和 (3, 0, 0, 0, 1) 构成一个 4 三角形。图兰数 \(\mathop {}\!\textrm{ex}(n,F,q,s)\)是 n 个顶点上的 q 图 H 在不包含任何 F 的 s 副本的情况下所能拥有的最大 q 边数。
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