Self-Similar Corrections to the Ergodic Theorem for the Pascal-Adic Transformation
Abstract
Let T be the Pascal-adic transformation. For any measurable function g, we consider the corrections to the ergodic theorem sumk=0j-1 g(Tk x) - j/l sumk=0l-1 g(Tk x). When seen as graphs of functions defined on 0,...,l-1, we show for a suitable class of functions g that these quantities, once properly renormalized, converge to (part of) the graph of a self-affine function. The latter only depends on the ergodic component of x, and is a deformation of the so-called Blancmange function. We also briefly describe the links with a series of works on Conway recursive $10,000 sequence.
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