Add to ORKGA systematic procedure for generating cubic multisections of Eisenstein series is given. The relevant series are determined from Fourier expansions for Eisenstein series by restricting the congruence class of the summation index modulo three. We prove that the resulting series are rational functions of η(τ) and η(3τ), where η is the Dedekind eta function. A more general treatment of cubic dissection formulas is given by describing the dissection operators in terms of linear transformations. These operators exhibit properties that mirror those of similarly defined quintic operators
AbstractIn this paper, by using generalized logarithms of Dedekind eta-functions, generalized logari...
This monograph deals with products of Dedekind's eta function, with Hecke theta series on quadratic ...
128 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2003.We prove several infinite ser...
A systematic procedure for generating cubic multisections of Eisenstein series is given. The relevan...
A systematic procedure for generating cubic multisections of Eisenstein series is given. The relevan...
AbstractWe generalize two identities involving Eisenstein series given in Chapter 19 of Ramanujanʼs ...
AbstractWe study the expansion of the Eisenstein series for Fq[T] of weight qk−1, k∈N, and using the...
AbstractWe generalize two identities involving Eisenstein series given in Chapter 19 of Ramanujanʼs ...
AbstractThe Shrikhande graph is classically described in terms of a Galois ring of order 16 viewed a...
In this article, we use the theory of elliptic functions to construct theta function identities whic...
In this work, we define a new type of Eisenstein-like series by using Pell-Lucas numbers and call th...
By means of the multi-section series method, six congruence relations and their corresponding genera...
We employ a modular method to establish the new result that two types of Eisenstein series to the tr...
In this paper, we derive systems of ordinary differential equations (ODEs) satisfied by modular form...
AbstractUsing certain representations for Eisenstein series, we derive several of Ramanujan's series...
AbstractIn this paper, by using generalized logarithms of Dedekind eta-functions, generalized logari...
This monograph deals with products of Dedekind's eta function, with Hecke theta series on quadratic ...
128 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2003.We prove several infinite ser...
A systematic procedure for generating cubic multisections of Eisenstein series is given. The relevan...
A systematic procedure for generating cubic multisections of Eisenstein series is given. The relevan...
AbstractWe generalize two identities involving Eisenstein series given in Chapter 19 of Ramanujanʼs ...
AbstractWe study the expansion of the Eisenstein series for Fq[T] of weight qk−1, k∈N, and using the...
AbstractWe generalize two identities involving Eisenstein series given in Chapter 19 of Ramanujanʼs ...
AbstractThe Shrikhande graph is classically described in terms of a Galois ring of order 16 viewed a...
In this article, we use the theory of elliptic functions to construct theta function identities whic...
In this work, we define a new type of Eisenstein-like series by using Pell-Lucas numbers and call th...
By means of the multi-section series method, six congruence relations and their corresponding genera...
We employ a modular method to establish the new result that two types of Eisenstein series to the tr...
In this paper, we derive systems of ordinary differential equations (ODEs) satisfied by modular form...
AbstractUsing certain representations for Eisenstein series, we derive several of Ramanujan's series...
AbstractIn this paper, by using generalized logarithms of Dedekind eta-functions, generalized logari...
This monograph deals with products of Dedekind's eta function, with Hecke theta series on quadratic ...
128 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2003.We prove several infinite ser...