Add to ORKGRamanujan (1916) and Shen (1999) discovered differential equations for classical Eisenstein series. Motivated by them, we derive new differential equations for Eisenstein series of level 2 from the second kind of Jacobi theta function. This gives a new characterization of a system of differential equations by Ablowitz-Chakravarty-Hahn (2006), Hahn (2008), Kaneko-Koike (2003), Maier (2011) and Toh (2011). As application, we show some arithmetic results on Ramanujan's tau function.Comment: 21 page
AbstractWe deduce new q-series identities by applying inverse relations to certain identities for ba...
In this paper, we establish several new modular equations of degree 9 using Ramanujan's modular equa...
AbstractWe shall extract the essence of the Adamchik–Srivastava generating function method (Analysis...
Ramanujan (1916) and Shen (1999) discovered differential equations for classical Eisenstein series. ...
AbstractWe generalize two identities involving Eisenstein series given in Chapter 19 of Ramanujanʼs ...
The theory of Mellin transform is an incredibly useful tool in evaluating some of the well known res...
It was shown that numerous (known and new) results involving various special functions, such as the ...
The aim of our present work here is to present few results in the theory of Mellin transforms using ...
In this paper, we obtain some new modular equations of degree2. We obtain several general formulas f...
AbstractIn a recent paper by the authors, a bounded version of Göllnitz's (big) partition theorem wa...
AbstractIn this paper, we prove Ramanujan's circular summation formulas previously studied by S.S. R...
AbstractWe undertake a thorough investigation of the moments of Ramanujanʼs alternative elliptic int...
AbstractRecently, B. C. Berndt, S. Bhargava and F. Garvan provided the first proof to an identity of...
AbstractWith two elementary trigonometric sums and the Jacobi theta function θ1, we provide a new pr...
2010 Mathematics Subject Classification: 33C45, 40G05.In this paper we give some results concerning ...
AbstractWe deduce new q-series identities by applying inverse relations to certain identities for ba...
In this paper, we establish several new modular equations of degree 9 using Ramanujan's modular equa...
AbstractWe shall extract the essence of the Adamchik–Srivastava generating function method (Analysis...
Ramanujan (1916) and Shen (1999) discovered differential equations for classical Eisenstein series. ...
AbstractWe generalize two identities involving Eisenstein series given in Chapter 19 of Ramanujanʼs ...
The theory of Mellin transform is an incredibly useful tool in evaluating some of the well known res...
It was shown that numerous (known and new) results involving various special functions, such as the ...
The aim of our present work here is to present few results in the theory of Mellin transforms using ...
In this paper, we obtain some new modular equations of degree2. We obtain several general formulas f...
AbstractIn a recent paper by the authors, a bounded version of Göllnitz's (big) partition theorem wa...
AbstractIn this paper, we prove Ramanujan's circular summation formulas previously studied by S.S. R...
AbstractWe undertake a thorough investigation of the moments of Ramanujanʼs alternative elliptic int...
AbstractRecently, B. C. Berndt, S. Bhargava and F. Garvan provided the first proof to an identity of...
AbstractWith two elementary trigonometric sums and the Jacobi theta function θ1, we provide a new pr...
2010 Mathematics Subject Classification: 33C45, 40G05.In this paper we give some results concerning ...
AbstractWe deduce new q-series identities by applying inverse relations to certain identities for ba...
In this paper, we establish several new modular equations of degree 9 using Ramanujan's modular equa...
AbstractWe shall extract the essence of the Adamchik–Srivastava generating function method (Analysis...