AbstractIn 2001, Jinhee Yi found many explicit values of the famous Rogers–Ramanujan continued fraction by using modular equations and transformation formulas for theta-functions. In this paper, we use her method to find some general theorems for the explicit evaluations of Ramanujan's cubic continued fraction
In this paper, we establish several new P–Q mixed modular equations involving theta–functions which ...
AbstractIn this paper we give a new proof of Ramanujanʼs continued fraction involving the Gamma func...
AbstractRamanujan recorded additive formulae of theta functions that are related to modular equation...
In his notebooks [9], Ramanujan recorded several values of thetafunctions.B. C. Berndt and L-C. Zhan...
In his notebooks [9], Ramanujan recorded several values of thetafunctions.B. C. Berndt and L-C. Zhan...
In this paper, we obtain some new modular equations of degree2. We obtain several general formulas f...
AbstractIn this paper, we present three new identities providing relations between Ramanujan–Göllnit...
On pages 338 and 339 in his first notebook (Notebooks (2 volumes), [1957]), Ramanujan records eighte...
In this paper, we establish several new modular equations of degree 9 using Ramanujan's modular equa...
AbstractWe establish several new analogues of Ramanujan's exact partition identities using the theor...
In his second notebook, Ramanujan recorded altogether 23 P–Q modular equations involving his theta f...
AbstractBy means of the difference equation on the modified Jacobi theta function, we review the pro...
AbstractWith two elementary trigonometric sums and the Jacobi theta function θ1, we provide a new pr...
Ramanujan in his notebooks, has established several new modular equation which he denoted as P and Q...
AbstractIn this paper, we prove a new identity for the product of two partial theta functions. An im...
In this paper, we establish several new P–Q mixed modular equations involving theta–functions which ...
AbstractIn this paper we give a new proof of Ramanujanʼs continued fraction involving the Gamma func...
AbstractRamanujan recorded additive formulae of theta functions that are related to modular equation...
In his notebooks [9], Ramanujan recorded several values of thetafunctions.B. C. Berndt and L-C. Zhan...
In his notebooks [9], Ramanujan recorded several values of thetafunctions.B. C. Berndt and L-C. Zhan...
In this paper, we obtain some new modular equations of degree2. We obtain several general formulas f...
AbstractIn this paper, we present three new identities providing relations between Ramanujan–Göllnit...
On pages 338 and 339 in his first notebook (Notebooks (2 volumes), [1957]), Ramanujan records eighte...
In this paper, we establish several new modular equations of degree 9 using Ramanujan's modular equa...
AbstractWe establish several new analogues of Ramanujan's exact partition identities using the theor...
In his second notebook, Ramanujan recorded altogether 23 P–Q modular equations involving his theta f...
AbstractBy means of the difference equation on the modified Jacobi theta function, we review the pro...
AbstractWith two elementary trigonometric sums and the Jacobi theta function θ1, we provide a new pr...
Ramanujan in his notebooks, has established several new modular equation which he denoted as P and Q...
AbstractIn this paper, we prove a new identity for the product of two partial theta functions. An im...
In this paper, we establish several new P–Q mixed modular equations involving theta–functions which ...
AbstractIn this paper we give a new proof of Ramanujanʼs continued fraction involving the Gamma func...
AbstractRamanujan recorded additive formulae of theta functions that are related to modular equation...