Add to ORKG8 pagesWe consider the limit periodic continued fractions of Stieltjes $$ \frac{1}{1-} \frac{g_1 z}{1-} \frac{g_2(1-g_1) z}{1-} \frac{g_3(1-g_2)z}{1-...,}, z\in \mathbb C, g_i\in(0,1), \lim\limits_{i\to \infty} g_i=1/2, \quad (1) $$ appearing as Shur--Wall $g$-fraction representations of certain analytic self maps of the unit disc $|w|< 1$, $w \in \mathbb C$. We precise the convergence behavior and prove the general convergence [2, p. 564 ] of (1) at the Runckel's points of the singular line $(1,+\infty)$ It is shown that in some cases the convergence holds in the classical sense. As a result a counterexample to the Ramanujan conjecture [1, p. 38-39] stating the divergence of a certain class of limit periodic continued fractions is construc...
The purpose of this paper is to study convergence of certain continued fractions
We provide explicit solutions for three q-difference equations which arise in Ramanujan and Selberg'...
AbstractIf the odd and even parts of a continued fraction converge to different values, the continue...
We give a brief account of the general analytic theory of continued fractions and state and prove th...
91 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2002.General convergence is a conce...
s of the lectures L. Lorentzen Convergence of continued fractions In contrast to the title, the t...
The Ramanujan continued fraction [formula could not be replicated] is interesting in many ways; e.g....
We study several generalizations of the AGM continued fraction of Ramanujan inspired by a series of ...
AbstractLet V be a subset of the complex plane C. Let {fn}n=1∞ be a sequence of self-mappings of V; ...
This thesis contains the results of a new approach to the problem of finding sufficient conditions f...
AbstractIn this paper we present a convergence theorem for continued fractions of the form Kn=1∞an/1...
AbstractThe only linearly convergent continued fractions are the limit periodic ones
In Chapter I of this paper, fundamental definitions in the theory of continued fractions are set for...
AbstractThe only linearly convergent continued fractions are the limit periodic ones
AbstractGiven any infinite set B of positive integers b1<b2<⋯, let τ(B) denote the exponent of conve...
The purpose of this paper is to study convergence of certain continued fractions
We provide explicit solutions for three q-difference equations which arise in Ramanujan and Selberg'...
AbstractIf the odd and even parts of a continued fraction converge to different values, the continue...
We give a brief account of the general analytic theory of continued fractions and state and prove th...
91 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2002.General convergence is a conce...
s of the lectures L. Lorentzen Convergence of continued fractions In contrast to the title, the t...
The Ramanujan continued fraction [formula could not be replicated] is interesting in many ways; e.g....
We study several generalizations of the AGM continued fraction of Ramanujan inspired by a series of ...
AbstractLet V be a subset of the complex plane C. Let {fn}n=1∞ be a sequence of self-mappings of V; ...
This thesis contains the results of a new approach to the problem of finding sufficient conditions f...
AbstractIn this paper we present a convergence theorem for continued fractions of the form Kn=1∞an/1...
AbstractThe only linearly convergent continued fractions are the limit periodic ones
In Chapter I of this paper, fundamental definitions in the theory of continued fractions are set for...
AbstractThe only linearly convergent continued fractions are the limit periodic ones
AbstractGiven any infinite set B of positive integers b1<b2<⋯, let τ(B) denote the exponent of conve...
The purpose of this paper is to study convergence of certain continued fractions
We provide explicit solutions for three q-difference equations which arise in Ramanujan and Selberg'...
AbstractIf the odd and even parts of a continued fraction converge to different values, the continue...