Sidon sets and $C_4$-saturated graphs
Abstract: The problem of determining the Tur\'an number of $C_4$ 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 $C_4$-free graphs. If $\A$ is a Sidon set in the abelian group $X$, the sum graph $G_{X, \A}$ with vertex set $X$ and edges set $E={{x, y}:x\neq y, x+y\in \A}$ is $C_4$-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 $C_4$ in a graph with $ex(q2+q+1, C_4)+1$ edges. Further, we give a sufficient condition for the sum graph of a Sidon set to be $C_4$-saturated and describe new $C_4$-saturated graphs.
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