Add to ORKGIn this paper, we express three different, yet related, character sums in terms of generalized Bernoulli numbers. Two of these sums are generalizations of sums introduced and studied by Berndt and Arakawa–Ibukiyama–Kaneko in the context of the theory of modular forms. A third sum generalizes a sum already studied by Ramanujan in the context of theta function identities. Our methods are elementary, relying only on basic facts from algebra and number theory
We give a transformation formula for certain infinite series in which some elliptic Dedekind-Rademac...
In this paper we introduce an elliptic analogue of the generalized Dedekind-Rademacher sums which sa...
AbstractAn elementary proof is given of the author's transformation formula for the Lambert series G...
In this paper, we express three different, yet related, character sums in terms of generalized Berno...
We express three imprimitive character sums in terms of generalized Bernoulli numbers. These sums ar...
AbstractGeneralized reciprocity formulas and Dedekind-Petersson-Knopp-type formulas are given to gen...
We generalize a theorem of Ibukiyama and express periodic generalized Bernoulli functions by general...
AbstractIn this paper we give a simple proof for the reciprocity formula for the generalized Dedekin...
AbstractIn this article a simple proof for a reciprocity formula for sums of cotangent functions is ...
AbstractIn this paper, we study on two subjects. We first construct degenerate analogues of Dedekind...
Theoretical thesis.Bibliography: pages [47]-50.1. Introduction -- 2. Elementary properties -- 3. The...
73 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1997.In 1877, R. Dedekind introduce...
130 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1981.Certain arithmetical sums ari...
AbstractSums of Dedekind type are defined by the formula f(h, k) = Σμ(mod k) A(μk) B(hμk), where eac...
AbstractIn this paper we introduce an elliptic analogue of the generalized Dedekind–Rademacher sums ...
We give a transformation formula for certain infinite series in which some elliptic Dedekind-Rademac...
In this paper we introduce an elliptic analogue of the generalized Dedekind-Rademacher sums which sa...
AbstractAn elementary proof is given of the author's transformation formula for the Lambert series G...
In this paper, we express three different, yet related, character sums in terms of generalized Berno...
We express three imprimitive character sums in terms of generalized Bernoulli numbers. These sums ar...
AbstractGeneralized reciprocity formulas and Dedekind-Petersson-Knopp-type formulas are given to gen...
We generalize a theorem of Ibukiyama and express periodic generalized Bernoulli functions by general...
AbstractIn this paper we give a simple proof for the reciprocity formula for the generalized Dedekin...
AbstractIn this article a simple proof for a reciprocity formula for sums of cotangent functions is ...
AbstractIn this paper, we study on two subjects. We first construct degenerate analogues of Dedekind...
Theoretical thesis.Bibliography: pages [47]-50.1. Introduction -- 2. Elementary properties -- 3. The...
73 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1997.In 1877, R. Dedekind introduce...
130 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1981.Certain arithmetical sums ari...
AbstractSums of Dedekind type are defined by the formula f(h, k) = Σμ(mod k) A(μk) B(hμk), where eac...
AbstractIn this paper we introduce an elliptic analogue of the generalized Dedekind–Rademacher sums ...
We give a transformation formula for certain infinite series in which some elliptic Dedekind-Rademac...
In this paper we introduce an elliptic analogue of the generalized Dedekind-Rademacher sums which sa...
AbstractAn elementary proof is given of the author's transformation formula for the Lambert series G...