Let 
be a rational number in the closed interval ![[0,1]](http://mathworld.wolfram.com/images/equations/2xmod1Map/Inline2.svg)
, and generate a sequence using the map
 | (1) |
Then the number of periodic map orbits of period 
(for 
prime) is given by
 | (2) |
(i.e., the number of period-
repeating bit strings, modulo shifts). Since a typical map orbit visits each point with equal probability, the natural invariant is given by
 | (3) |
