Add to ORKGEisenstein recorded twenty elegant continued fraction expansion in his papers. In this paper, we establish several modular relations for a continued fraction of Eisenstein using Ramanujan's modular equations. We establish two integral representations and also explicit evaluations of continued fraction of Eisenstein. © 2011 Pushpa Publishing House
94 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1997.In a manuscript of Ramanujan, ...
As a sequel to some recent works of Berndt and Baruah and Saikia we evaluate G(e(-Pirootn)) for cert...
In this paper, we establish several explicit evaluations, reciprocity theorems and integral represen...
AbstractFound in the collected works of Eisenstein are twenty continued fraction expansions. The exp...
In this paper, we obtain some new modular equations of degree 2. We obtain several general formulas ...
[[abstract]]In this paper, we establish several new modular equations of degree two by using Ramanuj...
AbstractWith two elementary trigonometric sums and the Jacobi theta function θ1, we provide a new pr...
On Page 36 of his “lost” notebook, Ramanujan recorded four q-series representations of the famous Ro...
By employing a method of parameterizations for Ramanujan’s theta-functions, we find several modular ...
Ramanujan has recorded several continued fractions in his notebooks. In this paper, we establish sev...
In this paper, first we establish some new relations for ratios of Ramanujan's theta functions. We a...
AbstractIn this paper we present two new identities providing relations between Ramanujan's cubic co...
AbstractIn this paper we present two new identities providing relations between Ramanujan's cubic co...
In the first part of this thesis, we prove Ramanujan's formulas for the coefficients in the power se...
Ramanujan recorded many beautiful continued fractions in his notebooks. In this paper, we derive sev...
94 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1997.In a manuscript of Ramanujan, ...
As a sequel to some recent works of Berndt and Baruah and Saikia we evaluate G(e(-Pirootn)) for cert...
In this paper, we establish several explicit evaluations, reciprocity theorems and integral represen...
AbstractFound in the collected works of Eisenstein are twenty continued fraction expansions. The exp...
In this paper, we obtain some new modular equations of degree 2. We obtain several general formulas ...
[[abstract]]In this paper, we establish several new modular equations of degree two by using Ramanuj...
AbstractWith two elementary trigonometric sums and the Jacobi theta function θ1, we provide a new pr...
On Page 36 of his “lost” notebook, Ramanujan recorded four q-series representations of the famous Ro...
By employing a method of parameterizations for Ramanujan’s theta-functions, we find several modular ...
Ramanujan has recorded several continued fractions in his notebooks. In this paper, we establish sev...
In this paper, first we establish some new relations for ratios of Ramanujan's theta functions. We a...
AbstractIn this paper we present two new identities providing relations between Ramanujan's cubic co...
AbstractIn this paper we present two new identities providing relations between Ramanujan's cubic co...
In the first part of this thesis, we prove Ramanujan's formulas for the coefficients in the power se...
Ramanujan recorded many beautiful continued fractions in his notebooks. In this paper, we derive sev...
94 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1997.In a manuscript of Ramanujan, ...
As a sequel to some recent works of Berndt and Baruah and Saikia we evaluate G(e(-Pirootn)) for cert...
In this paper, we establish several explicit evaluations, reciprocity theorems and integral represen...