Recently, Lalín, Rodrigue, and Rogers have studied the secant zeta function and its convergence. They found many interesting values of the secant zeta function at some particular quadratic irrational numbers. They also gave modular transformation properties of the secant zeta function. In this paper, we generalized secant zeta function as a Lambert series and proved a result for the Lambert series, from which the main result of Lalín et al. follows as a corollary, using the theory of generalized Dedekind eta-function, developed by Lewittes, Berndt, and Arakawa
AbstractIn this paper, we discuss the generalization of the Hecke's integration formula for the Epst...
We introduce a new type of multiple zeta function, which we call a bilateral zeta function. We prove...
AbstractThe object of this paper is to identify the divided power series corresponding to the zeta m...
It is pointed out that the generalized Lambert series��studied by Kanemitsu, Tanigawa and Yoshimoto ...
Abstract. We use the Arakawa-Berndt theory of generalized η-functions to prove a con-jecture of Lal̀...
AbstractIn this paper, by using generalized logarithms of Dedekind eta-functions, generalized logari...
Abstract. In this paper we obtain multiple-series generating relations involving a class of function...
Herein, we present a sequel to earlier work on a generalization of the Lambert W function. In partic...
AbstractAn elementary proof is given of the author's transformation formula for the Lambert series G...
Abstract. The classical Lamberts series makes it possible to generate many remarkable transformation...
Abstract. We extend the methods of Van der Poorten and Chapman [7] for explicitly evaluating the Ded...
We give a general Lambert series expansion leading to a modular equation of degree m, with this we h...
AbstractThe authors apply the theory of the double gamma function, which was recently revived in the...
An exact transformation, which we call the master identity, is obtained for the first time for the s...
We introduce an “L-function” L built up from the integral representation of the Barnes’ multiple zet...
AbstractIn this paper, we discuss the generalization of the Hecke's integration formula for the Epst...
We introduce a new type of multiple zeta function, which we call a bilateral zeta function. We prove...
AbstractThe object of this paper is to identify the divided power series corresponding to the zeta m...
It is pointed out that the generalized Lambert series��studied by Kanemitsu, Tanigawa and Yoshimoto ...
Abstract. We use the Arakawa-Berndt theory of generalized η-functions to prove a con-jecture of Lal̀...
AbstractIn this paper, by using generalized logarithms of Dedekind eta-functions, generalized logari...
Abstract. In this paper we obtain multiple-series generating relations involving a class of function...
Herein, we present a sequel to earlier work on a generalization of the Lambert W function. In partic...
AbstractAn elementary proof is given of the author's transformation formula for the Lambert series G...
Abstract. The classical Lamberts series makes it possible to generate many remarkable transformation...
Abstract. We extend the methods of Van der Poorten and Chapman [7] for explicitly evaluating the Ded...
We give a general Lambert series expansion leading to a modular equation of degree m, with this we h...
AbstractThe authors apply the theory of the double gamma function, which was recently revived in the...
An exact transformation, which we call the master identity, is obtained for the first time for the s...
We introduce an “L-function” L built up from the integral representation of the Barnes’ multiple zet...
AbstractIn this paper, we discuss the generalization of the Hecke's integration formula for the Epst...
We introduce a new type of multiple zeta function, which we call a bilateral zeta function. We prove...
AbstractThe object of this paper is to identify the divided power series corresponding to the zeta m...