Add to ORKGWe prove that the angles of Kloosterman sums over arbitrary finite field are incommensurable with the constant π.Bulgarian NS Funder, Contract KP-06Russia/33/17.12.2020andContractKP-06-N32/2-2019
AbstractWhile most proofs of the Weil bound on one-variable Kloosterman sums over finite fields are ...
We give a purity result for exponential sums of the type P x∈kn ψ(f(x)), where k is a finite field ...
International audienceLet K be a number field and let L/K be an infinite Galois extension with Galoi...
AbstractWe present some general equalities between Kloosterman sums over finite fields of arbitrary ...
This is a preprint of an article published in the Canadian Journal of Mathematics, 55 (2003), pp.225...
AbstractIn a recent work by Charpin, Helleseth, and Zinoviev Kloosterman sums K(a) over a finite fie...
Recently Garashuk and Lisonek evaluated Kloosterman sums K (a) modulo 4 over a finite field F3m ...
We extend to the setting of polynomials over a finite field certain estimates for short Kloosterman ...
AbstractAn expression for the number of times a certain trace function associated with a Kloosterman...
It should be one of the most interesting themes of algebraic number theory to make clear the mutual ...
We use recent results about linking the number of zeros on algebraic varieties over $\mathbb{C}$, de...
AbstractWe apply relations of n-dimensional Kloosterman sums to exponential sums over finite fields ...
AbstractThe Pólya-Vinogradov inequality is generalized to arbitrary algebraic number fields K of fin...
AbstractFor any algebraic number field K there is a positive number ϵ such that if α is a nonzero in...
Kloosterman sums are exponential sums on finite fields with important applications in Cryptography a...
AbstractWhile most proofs of the Weil bound on one-variable Kloosterman sums over finite fields are ...
We give a purity result for exponential sums of the type P x∈kn ψ(f(x)), where k is a finite field ...
International audienceLet K be a number field and let L/K be an infinite Galois extension with Galoi...
AbstractWe present some general equalities between Kloosterman sums over finite fields of arbitrary ...
This is a preprint of an article published in the Canadian Journal of Mathematics, 55 (2003), pp.225...
AbstractIn a recent work by Charpin, Helleseth, and Zinoviev Kloosterman sums K(a) over a finite fie...
Recently Garashuk and Lisonek evaluated Kloosterman sums K (a) modulo 4 over a finite field F3m ...
We extend to the setting of polynomials over a finite field certain estimates for short Kloosterman ...
AbstractAn expression for the number of times a certain trace function associated with a Kloosterman...
It should be one of the most interesting themes of algebraic number theory to make clear the mutual ...
We use recent results about linking the number of zeros on algebraic varieties over $\mathbb{C}$, de...
AbstractWe apply relations of n-dimensional Kloosterman sums to exponential sums over finite fields ...
AbstractThe Pólya-Vinogradov inequality is generalized to arbitrary algebraic number fields K of fin...
AbstractFor any algebraic number field K there is a positive number ϵ such that if α is a nonzero in...
Kloosterman sums are exponential sums on finite fields with important applications in Cryptography a...
AbstractWhile most proofs of the Weil bound on one-variable Kloosterman sums over finite fields are ...
We give a purity result for exponential sums of the type P x∈kn ψ(f(x)), where k is a finite field ...
International audienceLet K be a number field and let L/K be an infinite Galois extension with Galoi...