AbstractIn this paper we apply a modification of a generalized Pringsheim's theorem to obtain a G-continued fraction expansion for the quotient of two contiguous basic hypergeometric functions in arbitrarily many variables. As an application we obtain a G-continued fraction extension of the Rogers–Ramanujan continued fraction
AbstractIn Schweiger (2003) [1], Fritz Schweiger introduced the algorithm of the generalized continu...
A mathematical problem on continued fractions of tails of hypergeometric series is presented. The ta...
We provide explicit solutions for three q-difference equations which arise in Ramanujan and Selberg'...
77 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2001.In this thesis we study genera...
ABSTRACT. In this paper we establish a continued fraction represetatlon for the ratio qf two basic b...
AbstractIn this paper we present a generalization to generalized continued fractions of Pringsheim's...
The paper is related to the classical problem of the rational approximation of analytic functions of...
AbstractWe use continuous relations for the generalised hypergeometric series 3F2 to give new proofs...
Some of the most interesting of Ramanujan's continued fraction identities are those involving ratio...
Abstract: A new theory of generalized continued fractions connected with the Gauss transfo...
Using contiguous relations we construct an infinite number of continued fraction expansions for rati...
Ramanujan's results on continued fractions are simple consequences of three-term relations between h...
AbstractIn this paper the connection between generalised continued fractions (de Bruin 1974)) and G-...
In the present paper we have developed certain new continued fractions representations for the ratio...
AbstractIn this paper we use the invariance property of generalized linear fractional transformation...
AbstractIn Schweiger (2003) [1], Fritz Schweiger introduced the algorithm of the generalized continu...
A mathematical problem on continued fractions of tails of hypergeometric series is presented. The ta...
We provide explicit solutions for three q-difference equations which arise in Ramanujan and Selberg'...
77 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2001.In this thesis we study genera...
ABSTRACT. In this paper we establish a continued fraction represetatlon for the ratio qf two basic b...
AbstractIn this paper we present a generalization to generalized continued fractions of Pringsheim's...
The paper is related to the classical problem of the rational approximation of analytic functions of...
AbstractWe use continuous relations for the generalised hypergeometric series 3F2 to give new proofs...
Some of the most interesting of Ramanujan's continued fraction identities are those involving ratio...
Abstract: A new theory of generalized continued fractions connected with the Gauss transfo...
Using contiguous relations we construct an infinite number of continued fraction expansions for rati...
Ramanujan's results on continued fractions are simple consequences of three-term relations between h...
AbstractIn this paper the connection between generalised continued fractions (de Bruin 1974)) and G-...
In the present paper we have developed certain new continued fractions representations for the ratio...
AbstractIn this paper we use the invariance property of generalized linear fractional transformation...
AbstractIn Schweiger (2003) [1], Fritz Schweiger introduced the algorithm of the generalized continu...
A mathematical problem on continued fractions of tails of hypergeometric series is presented. The ta...
We provide explicit solutions for three q-difference equations which arise in Ramanujan and Selberg'...
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