Add to ORKGAbstract: If the Ramanujan cubic continued fraction (or its reciprocal) is expanded as a power series, the sign of the coefficients is periodic with period 3. We give the combinatorial interpretations for the coefficients from which the result follows immediate. We also derive some interesting identities involving coefficients
Ramanujan's results on continued fractions are simple consequences of three-term relations between h...
AbstractIn 2001, Jinhee Yi found many explicit values of the famous Rogers–Ramanujan continued fract...
Abstract: We propose a new twodimensional generalization of the algorithm for expansion of...
[[abstract]]We give 2-, 4-, 8- and 16-dissections of a continued fraction of order sixteen. We show ...
AbstractWe study the numerator and denominator of a continued fraction R(a, b) of Ramanujan and esta...
Abstract. In this paper, we give a new proof for two identities involving Ramanujan’s cubic continue...
Ramanujan has recorded several continued fractions in his notebooks. In this paper, we establish sev...
As a sequel to some recent works of Berndt and Baruah and Saikia we evaluate G(e(-Pirootn)) for cert...
On Page 36 of his “lost” notebook, Ramanujan recorded four q-series representations of the famous Ro...
On page 366 of his lost notebook 15, Ramanujan recorded a cubic contin- ued fraction and several the...
Ramanujan recorded many beautiful continued fractions in his notebooks. In this paper, we derive sev...
AbstractIn this paper we present two new identities providing relations between Ramanujan's cubic co...
We show that when certain infinite products associated with a continued fraction of Basil Gordon are...
In this paper, first we establish some new relations for ratios of Ramanujan's theta functions. We a...
On page 44 of his lost notebook, Ramanujan has recorded many continued fractions of orders 4, 5, 6 a...
Ramanujan's results on continued fractions are simple consequences of three-term relations between h...
AbstractIn 2001, Jinhee Yi found many explicit values of the famous Rogers–Ramanujan continued fract...
Abstract: We propose a new twodimensional generalization of the algorithm for expansion of...
[[abstract]]We give 2-, 4-, 8- and 16-dissections of a continued fraction of order sixteen. We show ...
AbstractWe study the numerator and denominator of a continued fraction R(a, b) of Ramanujan and esta...
Abstract. In this paper, we give a new proof for two identities involving Ramanujan’s cubic continue...
Ramanujan has recorded several continued fractions in his notebooks. In this paper, we establish sev...
As a sequel to some recent works of Berndt and Baruah and Saikia we evaluate G(e(-Pirootn)) for cert...
On Page 36 of his “lost” notebook, Ramanujan recorded four q-series representations of the famous Ro...
On page 366 of his lost notebook 15, Ramanujan recorded a cubic contin- ued fraction and several the...
Ramanujan recorded many beautiful continued fractions in his notebooks. In this paper, we derive sev...
AbstractIn this paper we present two new identities providing relations between Ramanujan's cubic co...
We show that when certain infinite products associated with a continued fraction of Basil Gordon are...
In this paper, first we establish some new relations for ratios of Ramanujan's theta functions. We a...
On page 44 of his lost notebook, Ramanujan has recorded many continued fractions of orders 4, 5, 6 a...
Ramanujan's results on continued fractions are simple consequences of three-term relations between h...
AbstractIn 2001, Jinhee Yi found many explicit values of the famous Rogers–Ramanujan continued fract...
Abstract: We propose a new twodimensional generalization of the algorithm for expansion of...