On the joint normality of certain digit expansions
Abstract
We prove that a point x is normal with respect to an ergodic, number-theoretic transformation T if and only if x is normal with respect to Tn for any n 1. This corrects an erroneous proof of Schweiger. Then, using some insights from Schweiger's original proof, we extend these results, showing for example that a number is normal with respect to the regular continued fraction expansion if and only if it is normal with respect to the odd continued fraction expansion.
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