Birkhoff Measures, Birkhoff Sums, and Discrepancies

Abstract: We study the distribution of a sequence of points in the circle generated by rotations by a fixed irrational number $ρ$ with initial condition $x_0$, that is: ${x_0+iρ}{i=1}^n$. The \emph{discrepancy} as defined by Pisot and Van Der Corput \cite{VdCP}, quantifies how evenly distributed such a sequence is. Consider the ergodic or Birkhoff sum of mean zero $S(ρ,n,x):=\sum{i=1}^{n} ({x+iρ}-1/2)$, where ${\cdot}$ denotes the fractional part. This is a piecewise-linear map in the variable $x$ with $n$ branches, each with slope $n$. For fixed $n$ and $ρ$, let $ν(ρ,n,z)$ be the number of pre-images of $S(ρ,n,x)=z$ divided by $n$. Then $ν(ρ,n,z)$ is a probability density. We call the associated measures Birkhoff measures. We investigate how the graph of $ν(ρ,n,z)$ varies with $n$. We prove that the length of the support of the Birkhoff measure $ν(ρ,n,z)dz$ can be expressed in terms of the discrepancy. We also show that if $n$ is a continued fraction denominator of $ρ$, then the graph of $ν(ρ,n,z)$ an approximate isosceles trapezoid. We also give new, brief, proofs of two classical results, one by Ramshaw \cite{Ramshaw} and one found by Kuipers-Niederreiter \cite{KN}. These results allow efficient computation of both Birkhoff sums and discrepancies.