Abstract. The Ramanujan AGM continued fraction is a construct Rη(a, b) = a η + b2 η
In his 'lost' notebook, S. Ramanujan introduced the parameter μ(q):= R(q)R(q 4) related to the Roge...
AbstractBy establishing uniform convergence of some of Ramanujan's continued fractions, we are able ...
On page 366 of his lost notebook 15, Ramanujan recorded a cubic contin- ued fraction and several the...
The Ramanujan AGM continued fraction is a construct enjoying attractive algebraic properties, such a...
The Ramanujan continued fraction [formula could not be replicated] is interesting in many ways; e.g....
As a sequel to some recent works of Berndt and Baruah and Saikia we evaluate G(e(-Pirootn)) for cert...
AbstractWe study the numerator and denominator of a continued fraction R(a, b) of Ramanujan and esta...
Ramanujan has recorded several continued fractions in his notebooks. In this paper, we establish sev...
AbstractIn this paper we present two new identities providing relations between Ramanujan's cubic co...
On Page 36 of his “lost” notebook, Ramanujan recorded four q-series representations of the famous Ro...
We study several generalizations of the AGM continued fraction of Ramanujan inspired by a series of ...
this paper we establish four values for R(q) stated on page 311 in Ramanujan's first notebook, ...
Ramanujan recorded many beautiful continued fractions in his notebooks. In this paper, we derive sev...
We study several generalizations of the AGM continued fraction of Ramanujan inspired by a series of ...
Various topics related to the work of Ramanujan are discussed in this thesis. In Chapter 2, we give ...
In his 'lost' notebook, S. Ramanujan introduced the parameter μ(q):= R(q)R(q 4) related to the Roge...
AbstractBy establishing uniform convergence of some of Ramanujan's continued fractions, we are able ...
On page 366 of his lost notebook 15, Ramanujan recorded a cubic contin- ued fraction and several the...
The Ramanujan AGM continued fraction is a construct enjoying attractive algebraic properties, such a...
The Ramanujan continued fraction [formula could not be replicated] is interesting in many ways; e.g....
As a sequel to some recent works of Berndt and Baruah and Saikia we evaluate G(e(-Pirootn)) for cert...
AbstractWe study the numerator and denominator of a continued fraction R(a, b) of Ramanujan and esta...
Ramanujan has recorded several continued fractions in his notebooks. In this paper, we establish sev...
AbstractIn this paper we present two new identities providing relations between Ramanujan's cubic co...
On Page 36 of his “lost” notebook, Ramanujan recorded four q-series representations of the famous Ro...
We study several generalizations of the AGM continued fraction of Ramanujan inspired by a series of ...
this paper we establish four values for R(q) stated on page 311 in Ramanujan's first notebook, ...
Ramanujan recorded many beautiful continued fractions in his notebooks. In this paper, we derive sev...
We study several generalizations of the AGM continued fraction of Ramanujan inspired by a series of ...
Various topics related to the work of Ramanujan are discussed in this thesis. In Chapter 2, we give ...
In his 'lost' notebook, S. Ramanujan introduced the parameter μ(q):= R(q)R(q 4) related to the Roge...
AbstractBy establishing uniform convergence of some of Ramanujan's continued fractions, we are able ...
On page 366 of his lost notebook 15, Ramanujan recorded a cubic contin- ued fraction and several the...