On the one-sided boundedness of the local discrepancy of $\{nα\}$-sequences (2210.08441v1)

Abstract: The main interest of this article is the one-sided boundedness of the local discrepancy of $\alpha\in\mathbb{R}\setminus\mathbb{Q}$ on the interval $(0,c)\subset(0,1)$ defined by [D_n(\alpha,c)=\sum_{j=1}^n 1_{{{j\alpha}<c}}-cn.] We focus on the special case $c\in (0,1)\cap\mathbb{Q}$. Several necessary and sufficient conditions on $\alpha$ for $(D_n(\alpha,c))$ to be one-side bounded are derived. Using these, certain topological properties are given to describe the size of the set [O_c={\alpha\in \irr: (D_n(\alpha,c)) \text{ is one-side bounded}}.]