Abstract:
Erdős introduced the quantity $S=T\sum^T_{i=1}|X_i|$, where
$X_1,\dots, X_T$ are arithmetic progressions that cover the squares up
to $N$. He conjectured that $S$ is close to $N$, i.e. the square numbers
cannot be covered "economically" by arithmetic progressions. Sárközy
confirmed this conjecture and proved that $S\geq cN/\log^2N$. In this
paper we extend this to shrinking polynomials and so-called $\{X_i\}$
quasi progressions.
Passcode: a six digit number $N=(4!)^2+(p-5)^2$ where $p$ is the smallest prime such that $p>600.$
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