Add to ORKGLet p be an odd prime, and define f(x) as follows: f(x) as the sum from 1 to k of a_i times x raised to the power of (p to the power of (alpha_i+1)) in F_(p to the power of n)[x] where 0 is less than or equal to alpha_1 \u3c alpha_2 \u3c ... \u3c alpha_k where alpha_k is equal to alpha. We consider the exponential sum S(f, n) equal to the sum_(x as x runs over the finite field with (p to the n elements) of zeta_(p to the power of Tr_n (f(x))), where zeta_p equals e to the power of (2i times pi divided by p) and Tr_n is the trace from the finite field with p to the n elements to the finite field with p elements.We provide necessary background from number theory and review the basic facts about quadratic forms over a finite field with p eleme...
AbstractWe consider incomplete exponential sums in several variables of the form S(f,n,m)=12n∑x1∈{-1...
AbstractUsing a special ordering {x0,…,xpf−1} of the elements of an arbitrary finite field and the t...
Let $\mathbb{F}_{q}$ be a finite field with characteristic $p$. A fundamental problem in number theo...
Let p be an odd prime, and define f(x) as follows: f(x) as the sum from 1 to k of a_i times x raised...
Let p be an odd prime, and define f(x) as follows: f(x) as the sum from 1 to k of a_i times x raised...
AbstractIn this paper, by using the factorization of the companion polynomial of the binary quadrati...
International audienceLet F be a finite field with q elements (q odd), Q is an element of F[T] and f...
International audienceLet F be a finite field with q elements (q odd), Q is an element of F[T] and f...
In this paper, by using the factorization of the companion polynomial of the binary quadratic functi...
Exponential sums of quadratic forms over finite fields have many applications to various areas such ...
AbstractLet 0<α1<⋯<αk be integers and f(x)=∑i=1kaix2αi+1+bx∈F2m[x], ak≠0. Define S(f,n)=∑x∈F2ne(f(x)...
. Let E be a cyclic algebraic number field of a prime degree. We prove an identity which lifts an ex...
AbstractLet A=Fq[t] denote the ring of polynomials over the finite field Fq. We denote by e a certai...
Let f(x, y) be a polynomial in Zp[x, y] and p be a prime. For α > 1, the exponential sums associate...
AbstractBy use of p-adic analytic methods, we study the L-functions associated to certain exponentia...
AbstractWe consider incomplete exponential sums in several variables of the form S(f,n,m)=12n∑x1∈{-1...
AbstractUsing a special ordering {x0,…,xpf−1} of the elements of an arbitrary finite field and the t...
Let $\mathbb{F}_{q}$ be a finite field with characteristic $p$. A fundamental problem in number theo...
Let p be an odd prime, and define f(x) as follows: f(x) as the sum from 1 to k of a_i times x raised...
Let p be an odd prime, and define f(x) as follows: f(x) as the sum from 1 to k of a_i times x raised...
AbstractIn this paper, by using the factorization of the companion polynomial of the binary quadrati...
International audienceLet F be a finite field with q elements (q odd), Q is an element of F[T] and f...
International audienceLet F be a finite field with q elements (q odd), Q is an element of F[T] and f...
In this paper, by using the factorization of the companion polynomial of the binary quadratic functi...
Exponential sums of quadratic forms over finite fields have many applications to various areas such ...
AbstractLet 0<α1<⋯<αk be integers and f(x)=∑i=1kaix2αi+1+bx∈F2m[x], ak≠0. Define S(f,n)=∑x∈F2ne(f(x)...
. Let E be a cyclic algebraic number field of a prime degree. We prove an identity which lifts an ex...
AbstractLet A=Fq[t] denote the ring of polynomials over the finite field Fq. We denote by e a certai...
Let f(x, y) be a polynomial in Zp[x, y] and p be a prime. For α > 1, the exponential sums associate...
AbstractBy use of p-adic analytic methods, we study the L-functions associated to certain exponentia...
AbstractWe consider incomplete exponential sums in several variables of the form S(f,n,m)=12n∑x1∈{-1...
AbstractUsing a special ordering {x0,…,xpf−1} of the elements of an arbitrary finite field and the t...
Let $\mathbb{F}_{q}$ be a finite field with characteristic $p$. A fundamental problem in number theo...