DOIAbstract
AbstractA simple proof of the identity D(a, c) = − D(a, c) for the Dedekind sums D(a, c) introduced by Sczech will be given
AbstractA simple proof of the identity D(a, c) = − D(a, c) for the Dedekind sums D(a, c) introduced by Sczech will be given
AbstractWe prove the following result on the distribution of Dedekind sums: limM→∞logMM∑c=1M1c∑Dmodc...
AbstractSums of Dedekind type are defined by the formula f(h, k) = Σμ(mod k) A(μk) B(hμk), where eac...
AbstractTextIn this paper we investigate higher order dimensional Dedekind–Rademacher sums given by ...
AbstractA simple proof of the identity D(a, c) = − D(a, c) for the Dedekind sums D(a, c) introduced ...
We give a transformation formula for certain infinite series in which some elliptic Dedekind-Rademac...
1. Background. Dedekind sums are classical objects of study intro-duced by Richard Dedekind in the 1...
Theoretical thesis.Bibliography: pages [47]-50.1. Introduction -- 2. Elementary properties -- 3. The...
For a positive integer k and an arbitrary integer h, the Dedekind sum s(h; k) is de ned by s(h; k) =...
AbstractIn this paper we introduce an elliptic analogue of the generalized Dedekind–Rademacher sums ...
In this paper we introduce an elliptic analogue of the generalized Dedekind-Rademacher sums which sa...
AbstractIf h, k ∈ Z, k > 0, the Dedekind sum is given by s(h,k) = ∑μ=1kμkhμk, with ((x)) = x − [x] −...
73 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1997.In 1877, R. Dedekind introduce...
summary:The various properties of classical Dedekind sums $S(h, q)$ have been investigated by many a...
We give a transformation formula for certain infinite series in which some elliptic Dedekind-Rademac...
AbstractWe prove a simple and explicit formula, which expresses the 26th power of Dedekind's η-funct...
AbstractWe prove the following result on the distribution of Dedekind sums: limM→∞logMM∑c=1M1c∑Dmodc...
AbstractSums of Dedekind type are defined by the formula f(h, k) = Σμ(mod k) A(μk) B(hμk), where eac...
AbstractTextIn this paper we investigate higher order dimensional Dedekind–Rademacher sums given by ...
AbstractA simple proof of the identity D(a, c) = − D(a, c) for the Dedekind sums D(a, c) introduced ...
We give a transformation formula for certain infinite series in which some elliptic Dedekind-Rademac...
1. Background. Dedekind sums are classical objects of study intro-duced by Richard Dedekind in the 1...
Theoretical thesis.Bibliography: pages [47]-50.1. Introduction -- 2. Elementary properties -- 3. The...
For a positive integer k and an arbitrary integer h, the Dedekind sum s(h; k) is de ned by s(h; k) =...
AbstractIn this paper we introduce an elliptic analogue of the generalized Dedekind–Rademacher sums ...
In this paper we introduce an elliptic analogue of the generalized Dedekind-Rademacher sums which sa...
AbstractIf h, k ∈ Z, k > 0, the Dedekind sum is given by s(h,k) = ∑μ=1kμkhμk, with ((x)) = x − [x] −...
73 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1997.In 1877, R. Dedekind introduce...
summary:The various properties of classical Dedekind sums $S(h, q)$ have been investigated by many a...
We give a transformation formula for certain infinite series in which some elliptic Dedekind-Rademac...
AbstractWe prove a simple and explicit formula, which expresses the 26th power of Dedekind's η-funct...
AbstractWe prove the following result on the distribution of Dedekind sums: limM→∞logMM∑c=1M1c∑Dmodc...
AbstractSums of Dedekind type are defined by the formula f(h, k) = Σμ(mod k) A(μk) B(hμk), where eac...
AbstractTextIn this paper we investigate higher order dimensional Dedekind–Rademacher sums given by ...
Add to ORKG