On a conjecture of Dekking : The sum of digits of even numbers
Abstract
Let q≥ 2 and denote by sq the sum-of-digits function in base q. For j=0,1,...,q-1 consider # \0 n < N : \;\;sq(2n) j q \. In 1983, F. M. Dekking conjectured that this quantity is greater than N/q and, respectively, less than N/q for infinitely many N, thereby claiming an absence of a drift (or Newman) phenomenon. In this paper we prove his conjecture.
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