Resolution of the Quinn-Rand-Strogatz constant of nonlinear physics

Bailey, D. H.; Borwein, J. M.; Crandall, R. E.

Title: Resolution of the Quinn-Rand-Strogatz constant of nonlinear physics
Creator: Bailey, D. H.; Borwein, J. M.; Crandall, R. E.
Relation: Experimental Mathematics Vol. 18, Issue 1, p. 107-116
Publisher Link: http://dx.doi.org/10.1080/10586458.2009.10128885
Publisher: A. K. Peters
Resource Type: journal article
Date: 2009
Description: Herein we develop connections between zeta functions and some recent "mysterious" constants of nonlinear physics. In an important analysis of coupled Winfree oscillators, Quinn, Rand, and Strogatz [Quinn et al. 07] developed a certain N-oscillator scenario whose bifurcation phase offset small ⍉ is implicitly defined, with a conjectured asymptotic behavior sin ⍉ ~ 1−ᴄ₁/N, with experimental estimate ᴄ₁ = 0.605443657 . . .. We are able to derive the exact theoretical value of this "QRS constant" ᴄ₁ as a real zero of a particular Hurwitz zeta function. This discovery enables, for example, the rapid resolution of c1 to extreme precision. Results and conjectures are provided in regard to higher-order terms of the sin ⍉ asymptotic, and to yet more physics constants emerging from the original QRS work.
Subject: Winfree oscillators; high-precision arithmetic; Hurwitz zeta; Richardson extrapolation
Identifier: http://hdl.handle.net/1959.13/807948
Identifier: uon:7552
Identifier: ISSN:1058-6458
Rights: This is an electronic version of an article published in Experimental Mathematics Vol. 18, Issue 1, p. 107-116. Experimental Mathematics is available online at: http://www.tandfonline.com/openurl?genre=article&issn=1058-6458&volume=18&issue=1&spage=107
Language: eng
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