A characterization of eventually periodicity

Abstract

In this article, we show that the Kamae-Xue complexity function for an infinite sequence classifies eventual periodicity completely. We prove that an infinite binary word x1x2 ·s is eventually periodic if and only if (x1x2·s xn)/n3 has a positive limit, where (x1x2·s xn) is the sum of the squares of all the numbers of appearance of finite words in x1 x2 ·s xn, which was introduced by Kamae-Xue as a criterion of randomness in the sense that x1x2·s xn is more random if (x1x2·s xn) is smaller. In fact, it is known that the lower limit of (x1x2·s xn) /n2 is at least 3/2 for any sequence x1x2 ·s, while the limit exists as 3/2 almost surely for the (1/2,1/2) product measure. For the other extreme, the upper limit of (x1x2·s xn)/n3 is bounded by 1/3. There are sequences which are not eventually periodic but the lower limit of (x1x2·s xn)/n3 is positive, while the limit does not exist.