On limit points of subsequences of uniformly distributed sequences (Q2921806)

Let \((x_n)\) be a sequence which is dense in the interval \(I=[0,1]\). The author studies the set of limit points of a subsequence \((x_{n_k})\) when conditions on the growth of \((n_k)\) are imposed. For example, when \(C\) is a nonempty subset of \(I\) with Lebesgue measure \(\lambda\), he proves that if \((h_n)\) is a sequence of positive numbers of \(I\) tending to \(\lambda\), then there exists an increasing sequence of positive integers \((a_n)\) with \(a_n \leq n/h_n\) for \(n\geq1\) such that \(C\) is equal to the set of limit points of the sequence \(x_{a_n}\).