On the dynamics of certain recurrence relations

Borwein, D.; Borwein, J.; Crandall, R.; Mayer, R.

Title: On the dynamics of certain recurrence relations
Creator: Borwein, D.; Borwein, J.; Crandall, R.; Mayer, R.
Relation: The Ramanujan Journal Vol. 13, Issue 1-3, p. 63-101
Publisher Link: http://dx.doi.org/10.1007/s11139-006-0243-3
Publisher: Springer
Resource Type: journal article
Date: 2007
Description: In recent analyses the remarkable AGM continued fraction of Ramanujan—denoted R₁(a, b)—was proven to converge for almost all complex parameter pairs (a, b). It was conjectured that R₁ diverges if and only if (0 ≠ a = be iφ with cos² φ ≠ 1) or (a² = b² ∊ (−∞, 0)). In the present treatment we resolve this conjecture to the positive, thus establishing the precise convergence domain for R₁. This is accomplished by analyzing, using various special functions, the dynamics of sequences such as (tn) satisfying a recurrence tn = (tn₋₋₁ + (n - 1)κn₋₋₁ᵗtn₋₂)/n, where κn := a², b² as n be even, odd respectively. As a byproduct, we are able to give, in some cases, exact expressions for the n-th convergent to the fraction R1 , thus establishing some precise convergence rates. It is of interest that this final resolution of convergence depends on rather intricate theorems for complex-matrix products, which theorems evidently being extensible to more general continued fractions.
Subject: complex continued fractions; dynamical systems; arithmetic-geometric mean; matrix analysis; stability theory
Identifier: http://hdl.handle.net/1959.13/928084
Identifier: uon:10335
Identifier: ISSN:1382-4090
Language: eng
Reviewed

Hits: 2900
Visitors: 3273
Downloads: 0

		Thumbnail	File	Description	Size	Format