Taking rational numbers at random

Abstract

We outline some simple prescriptions to define a distribution on the set Q0 of all the rational numbers in [0,1], and we then explore both a few properties of these distributions, and the possibility of making these rational numbers asymptotically equiprobable in a suitable sense. In particular it will be shown that in the said limit -- albeit no uniform distribution can be properly defined on Q0 -- the probability allotted to a single q∈Q0 asymptotically vanishes, while that of the subset of Q0 falling in an interval [a,b] goes to b-a. We finally give some hints to completely sequencing without repetitions the numbers in Q0 as a prerequisite to the laying down of more distributions on it