On the one-sided boundedness of the local discrepancy of \nα\-sequences
Abstract
The main interest of this article is the one-sided boundedness of the local discrepancy of α∈R on the interval (0,c)⊂(0,1) defined by \[Dn(α,c)=Σj=1n 1\\jα\<c\-cn.\] We focus on the special case c∈ (0,1). Several necessary and sufficient conditions on α for (Dn(α,c)) to be one-side bounded are derived. Using these, certain topological properties are given to describe the size of the set \[Oc=\α∈ : (Dn(α,c)) is one-side bounded\.\]
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