A q-weighted analogue of the Trollope-Delange formula
Abstract
Let s(n) denote the number of "1"s in the dyadic representation of a positive integer n and sequence S(n) = s(1)+s(2)+…+s(n-1). The Trollope-Delange formula is a classic result that represents the sequence S in terms of the Takagi function. This work extends the result by introducing a q-weighted analog of s(n), deriving a variant of the Trollope-Delange formula for this generalization. We show that for 1/2<|q|< 1, nondifferentiable Takagi-Landsberg functions appear, whereas for |q|>1, the resulting functions are differentiable almost everywhere. We further show how the result can be used to find limiting curves describing fluctuations in the ergodic theorem for the dyadic odometer.
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