Turán Number of Nonbipartite Graphs and the Product Conjecture

Xing Peng; Ge Song; Long Tu Yuan

doi:10.1007/s40304-023-00375-1

Turán Number of Nonbipartite Graphs and the Product Conjecture

Xing Peng
, Ge Song^*
, Long Tu Yuan

^*Corresponding author for this work

School of Mathematical Sciences

School of Mathematical Science, Anhui University
University of Science and Technology of China

Research output: Contribution to journal › Article › peer-review

Abstract

The decomposition family of a family of graphs often helps us to determine the error term in the well-known Erdős–Stone–Simonovits theorem. We study the Turán number of families of nonbipartite graphs such that their decomposition families contain a matching and a star. To be precisely, we prove tight bounds on the Turán number of such families of graphs. Moreover, we find a graph which is a counterexample to an old conjecture of Erdős and Simonovits, while all previous counterexamples are families of graphs.

Original language	English
Pages (from-to)	205-218
Number of pages	14
Journal	Communications in Mathematics and Statistics
Volume	14
Issue number	2
DOIs	https://doi.org/10.1007/s40304-023-00375-1
State	Published - Apr 2026

Keywords

Decomposition family
Matching
Product conjecture
Star
Turán number

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10.1007/s40304-023-00375-1

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title = "Tur{\'a}n Number of Nonbipartite Graphs and the Product Conjecture",

abstract = "The decomposition family of a family of graphs often helps us to determine the error term in the well-known Erd{\H o}s–Stone–Simonovits theorem. We study the Tur{\'a}n number of families of nonbipartite graphs such that their decomposition families contain a matching and a star. To be precisely, we prove tight bounds on the Tur{\'a}n number of such families of graphs. Moreover, we find a graph which is a counterexample to an old conjecture of Erd{\H o}s and Simonovits, while all previous counterexamples are families of graphs.",

keywords = "Decomposition family, Matching, Product conjecture, Star, Tur{\'a}n number",

author = "Xing Peng and Ge Song and Yuan, \{Long Tu\}",

note = "Publisher Copyright: {\textcopyright} School of Mathematical Sciences, University of Science and Technology of China and Springer-Verlag GmbH Germany, part of Springer Nature 2023.",

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T1 - Turán Number of Nonbipartite Graphs and the Product Conjecture

AU - Peng, Xing

AU - Song, Ge

AU - Yuan, Long Tu

N1 - Publisher Copyright: © School of Mathematical Sciences, University of Science and Technology of China and Springer-Verlag GmbH Germany, part of Springer Nature 2023.

PY - 2026/4

Y1 - 2026/4

N2 - The decomposition family of a family of graphs often helps us to determine the error term in the well-known Erdős–Stone–Simonovits theorem. We study the Turán number of families of nonbipartite graphs such that their decomposition families contain a matching and a star. To be precisely, we prove tight bounds on the Turán number of such families of graphs. Moreover, we find a graph which is a counterexample to an old conjecture of Erdős and Simonovits, while all previous counterexamples are families of graphs.

AB - The decomposition family of a family of graphs often helps us to determine the error term in the well-known Erdős–Stone–Simonovits theorem. We study the Turán number of families of nonbipartite graphs such that their decomposition families contain a matching and a star. To be precisely, we prove tight bounds on the Turán number of such families of graphs. Moreover, we find a graph which is a counterexample to an old conjecture of Erdős and Simonovits, while all previous counterexamples are families of graphs.

KW - Decomposition family

KW - Matching

KW - Product conjecture

KW - Star

KW - Turán number

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VL - 14

SP - 205

EP - 218

JO - Communications in Mathematics and Statistics

JF - Communications in Mathematics and Statistics

IS - 2

ER -

Turán Number of Nonbipartite Graphs and the Product Conjecture

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