Add to ORKGsummary:After some remarks about the analogy between the classical gamma-function and Gaussian sums over finite fields a complete, very short explicit proof is given of an identity expressing a certain sum of products of Gaussian sums as a product of Gaussian sums. This identity is an analogue of the classical Barnes' first lemma for the gamma-function. Four multiplicative characters of a finite field are concerned; the usually necessary restrictions on the triviality of certain products of these characters are avoided by the use of corrective terms. References are given for other approaches of this identity.\par In [2] a parallel proof is given for the classical identity and its finite analogue; the status of this reference has meanwhile c...
In this article, we study several properties of extended Gauss hypergeometric and extended confluent...
AbstractIn this paper we give a few explicit formulae for the dual coefficients and some of the root...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2011.Cataloged from PD...
summary:After some remarks about the analogy between the classical gamma-function and Gaussian sums ...
summary:After some remarks about the analogy between the classical gamma-function and Gaussian sums ...
AbstractGauss' original proof for the value of Gaussian sums relies on a summation of Gaussian polyn...
We give a definition of generalized hypergeometric functions over finite fields using modified Gauss...
AbstractLet d(ω; α, γ) be the number of divisors of the Gaussian integer ω which lie in the arithmet...
AbstractLet X be a vector space of dimension n over a finite field Fq of characteristic p ≠ 2. We de...
AbstractEvans has conjectured the value of a certain character sum. The conjecture is confirmed usin...
AbstractThe elementary manipulation of series is applied to obtain a quite general transformation in...
AbstractWe show a p-adic limit formula for Gauss sums, which implies the Katz limit formula (in “Aut...
AbstractThe elementary manipulation of series together with summations of Gauss, Saalschutz and Dixo...
We compute the Artin $L$-function of a diagonal hypersurface D_{\lambda} over a finite field associa...
H.Hasse conjectured that all multiplicative relations between Gauss sums essentially follow from the...
In this article, we study several properties of extended Gauss hypergeometric and extended confluent...
AbstractIn this paper we give a few explicit formulae for the dual coefficients and some of the root...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2011.Cataloged from PD...
summary:After some remarks about the analogy between the classical gamma-function and Gaussian sums ...
summary:After some remarks about the analogy between the classical gamma-function and Gaussian sums ...
AbstractGauss' original proof for the value of Gaussian sums relies on a summation of Gaussian polyn...
We give a definition of generalized hypergeometric functions over finite fields using modified Gauss...
AbstractLet d(ω; α, γ) be the number of divisors of the Gaussian integer ω which lie in the arithmet...
AbstractLet X be a vector space of dimension n over a finite field Fq of characteristic p ≠ 2. We de...
AbstractEvans has conjectured the value of a certain character sum. The conjecture is confirmed usin...
AbstractThe elementary manipulation of series is applied to obtain a quite general transformation in...
AbstractWe show a p-adic limit formula for Gauss sums, which implies the Katz limit formula (in “Aut...
AbstractThe elementary manipulation of series together with summations of Gauss, Saalschutz and Dixo...
We compute the Artin $L$-function of a diagonal hypersurface D_{\lambda} over a finite field associa...
H.Hasse conjectured that all multiplicative relations between Gauss sums essentially follow from the...
In this article, we study several properties of extended Gauss hypergeometric and extended confluent...
AbstractIn this paper we give a few explicit formulae for the dual coefficients and some of the root...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 2011.Cataloged from PD...