Randomness and non-randomness properties of Piatetski-Shapiro sequences modulo m

Abstract

We study Piatetski-Shapiro sequences ( nc)n modulo m, for non-integer c >1 and positive m, and we are particularly interested in subword occurrences in those sequences. We prove that each block ∈\0,1\k of length k < c + 1 occurs as a subword with the frequency 2-k, while there are always blocks that do not occur. In particular, those sequences are not normal. For 1<c<2, we estimate the number of subwords from above and below, yielding the fact that our sequences are deterministic and not morphic. Finally, using the Daboussi-K\'atai criterion, we prove that the sequence nc modulo m is asymptotically orthogonal to multiplicative functions bounded by 1 and with mean value 0.