On the generating function of the integer part: [nα + γ]

Borwein, J. M.; Borwein, P. B.

Title: On the generating function of the integer part: [nα + γ]
Creator: Borwein, J. M.; Borwein, P. B.
Relation: Journal of Number Theory Vol. 43, Issue 3, p. 293-318
Publisher Link: http://dx.doi.org/10.1006/jnth.1993.1023
Publisher: Academic Press
Resource Type: journal article
Date: 1993
Description: We show that [formula could not be replicated]. Here p_n and q_n are the numerators and denominators of the convergents of the continued fraction expansion of α and t**_n and s**_n are particular algorithmically generated sequences of best approximates for the non-homogeneous diophantine approximation problem of minimizing |nα + γ − m|. This generalizes results of Böhmer and Mahler, who considered the special case where γ = 0. This representation allows us to easily derive various transcendence results. For example, ∑^∞_n=1 [ne +1/2 ]/2ⁿ is a Liouville number. Indeed the first series is Liouville for rational z, w∈ [−1, 1] with |zw| ≠ 1 provided α has unbounded continued fraction expansion. A second application, which generalizes a theorem originally due to Lord Raleigh, is to give a new proof of a theorem of Fraenkel, namely [nα + γ]^∞_n=1 and [nα′ + γ′]^∞_n=1 partition the non-negative integers if and only if 1/α + 1/α′ = 1 and γ/α + γ′/α′ = 0 (provided some sign and integer independence conditions are placed on α, β, γ, γ′). The analysis which leads to the results is quite delicate and rests heavily on a functional equation for G. For this a natural generalization of the simple continued fraction to Kronecker′s forms |nα + γ − m| is required.
Subject: integer; Fraenkel; Liouville; Kronecker; fraction expansion
Identifier: http://hdl.handle.net/1959.13/1042533
Identifier: uon:14077
Identifier: ISSN:0022-314X
Language: eng
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