Aperiodic pseudorandom number generators based on infinite words
Abstract
In this paper we study how certain families of aperiodic infinite words can be used to produce aperiodic pseudorandom number generators (PRNGs) with good statistical behavior. We introduce the \emph{well distributed occurrences} (WELLDOC) combinatorial property for infinite words, which guarantees absence of the lattice structure defect in related pseudorandom number generators. An infinite word on a -ary alphabet has the WELLDOC property if, for each factor of , positive integer , and vector , there is an occurrence of such that the Parikh vector of the prefix of preceding such occurrence is congruent to modulo . (The Parikh vector of a finite word over an alphabet has its -th component equal to the number of occurrences of the -th letter of in .) We prove that Sturmian words, and more generally Arnoux-Rauzy words and some morphic images of them, have the WELLDOC property. Using the TestU01 and PractRand statistical tests, we moreover show that not only the lattice structure is absent, but also other important properties of PRNGs are improved when linear congruential generators are combined using infinite words having the WELLDOC property.
Cite
@article{arxiv.1311.6002,
title = {Aperiodic pseudorandom number generators based on infinite words},
author = {Lubomira Balkova and Michelangelo Bucci and Alessandro De Luca and Jiri Hladky and Svetlana Puzynina},
journal= {arXiv preprint arXiv:1311.6002},
year = {2016}
}
Comments
updated and extended version; 24 pages