On $AP_3$ - covering sequences (1711.00172v1)

Abstract: Recently, motivated by Stanley sequences, Kiss, S\' andor and Yang introduced a new type sequence: a sequence $A$ of nonnegative integers is called an $AP_k$ - covering sequence if there exists an integer $n_0$ such that if $n > n_0$, then there exist $a_1\in A, \dots , a_{k-1}\in A$, $a_1<a_2<\cdots <a_{k-1}<n$ such that $a_1, \dots , a_{k-1}, n$ form a $k$-term arithmetic progression. They prove that there exists an $AP_3$ - covering sequence $A$ such that $\limsup\limits_{n\to\infty}{A(n)}/{\sqrt n}\le 34$. In this note, we prove that there exists an $AP_3$ - covering sequence $A$ such that $\limsup\limits_{n\to\infty}{A(n)}/{\sqrt n}=\sqrt{15}$.