Cellular Automata and Powers of p/q

Abstract

We consider one-dimensional cellular automata Fp,q which multiply numbers by p/q in base pq for relatively prime integers p and q. By studying the structure of traces with respect to Fp,q we show that for p≥ 2q-1 (and then as a simple corollary for p>q>1) there are arbitrarily small finite unions of intervals which contain the fractional parts of the sequence (p/q)n, (n=0,1,2,…) for some >0. To the other direction, by studying the measure theoretical properties of Fp,q, we show that for p>q>1 there are finite unions of intervals approximating the unit interval arbitrarily well which don't contain the fractional parts of the whole sequence (p/q)n for any >0.