English

Sidon sets and $C_4$-saturated graphs

Combinatorics 2019-03-20 v6

Abstract

The problem of determining the Tur\'an number of C4C_4 is a well studied problem that dates back to a paper of Erd\"os from 1938. It is known that Sidon sets can be used to construct C4C_4-free graphs. If \A\A is a Sidon set in the abelian group XX, the sum graph GX,\AG_{X, \A} with vertex set XX and edges set E={{x,y}:xy,x+y\A}E=\{\{x, y\}:x\neq y, x+y\in \A\} is C4C_4-free. Using the sum graph of a Sidon set of type Singer we verify a conjecture of Erd\"os and Simonovits concerning the number of copies of C4C_4 in a graph with ex(q2+q+1,C4)+1ex(q^2+q+1, C_4)+1 edges. Further, we give a sufficient condition for the sum graph of a Sidon set to be C4C_4-saturated and describe new C4C_4-saturated graphs.

Cite

@article{arxiv.1810.05262,
  title  = {Sidon sets and $C_4$-saturated graphs},
  author = {David Fernando Daza and Carlos Alberto Trujillo and Fenando Andrés Benavides},
  journal= {arXiv preprint arXiv:1810.05262},
  year   = {2019}
}

Comments

14 pages, 2 figures, 2 table, paper

R2 v1 2026-06-23T04:37:02.497Z