Finding and excluding b-ary machin-type individual digit formulae

Borwein, Jonathan M.; Borwein, David; Galway, William F.

Title: Finding and excluding b-ary machin-type individual digit formulae
Creator: Borwein, Jonathan M.; Borwein, David; Galway, William F.
Relation: Canadian Journal of Mathematics Vol. 56, Issue 5, p. 897-925
Publisher Link: http://dx.doi.org/10.4153/CJM-2004-041-2
Publisher: University of Toronto Press
Resource Type: journal article
Date: 2004
Description: Constants with formulae of the form treated by D. Bailey, P. Borwein, and S. Plouffe (BBP formulae to a given base b) have interesting computational properties, such as allowing single digits in their base b expansion to be independently computed, and there are hints that they should be normal numbers, i.e., that their base b digits are randomly distributed. We study a formally limited subset of BBP formulae, which we call Machin-type BBP formulae, for which it is relatively easy to determine whether or not a given constant κ has a Machin-type BBP formula. In particular, given b ∈ ℕ, b > 2, b not a proper power, a b-ary Machin-type BBP arctangent formula for κ is a formula of the form κ = ∑_m a_m arctan(−b^−m), a_m ∈ ℚ, while when b = 2 , we also allow terms of the form a_m arctan(1/(1 − 2^m)). Of particular interest, we show that π has no Machin-type BBP arctangent formula when b ≠ 2 . To the best of our knowledge, when there is no Machin-type BBP formula for a constant then no BBP formula of any form is known for that constant.
Subject: BBP formulae; machin type formulae; arctangents; logarithms; normality; Mersenne primes; Bang's theorem
Identifier: http://hdl.handle.net/1959.13/1039922
Identifier: uon:13725
Identifier: ISSN:0008-414X
Language: eng
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