AbstractAn asymptotic formula is obtained for the number of representations of an element of a finite field as a weighted sum of two prescribed powers of primitive elements. This generalises previous work on sums of primitive elements, including that relating to some conjectures of Golomb
Waring's Problem asks if for given n it is possible to represent n as the sum of a finite number of ...
We prove an asymptotic formula (that refines old results by Walfisz and Mirsky) for the number of...
Let k 651 be an integer. We prove that a suitable asymptotic formula for the average number of repre...
AbstractAn asymptotic formula is obtained for the number of representations of an element of a finit...
Let $X$ be a large integer. We prove that, for any fixed positive integer $k$, a suitable asymptotic...
Let $X$ be a large integer. We prove that, for any fixed positive integer $k$, a suitable asymptotic...
Let $X$ be a large integer. We prove that, for any fixed positive integer $k$, a suitable asymptot...
Abstract of paper [1]. We prove that, for any fixed positive integer k, a suitable asymptotic formul...
AbstractA well-known theorem of Erdös and Fuchs states that we cannot have too good an asymptotic fo...
We prove an asymptotic formula (that refines old results by Walfisz and Mirsky) for the number of ...
The sum of the number of second order polynomial value representations by the sum of two numbers squ...
Let F q be the finite field of q elements. Let H⊆Fq*be a multiplicative subgroup. For a positive int...
AbstractConsider an extension field Fqm=Fq(α) of the finite field Fq. Davenport proved that the set ...
We investigate the number of representations of an integer as the sum of various powers. In particul...
We investigate the number of representations of an integer as the sum of various powers. In particul...
Waring's Problem asks if for given n it is possible to represent n as the sum of a finite number of ...
We prove an asymptotic formula (that refines old results by Walfisz and Mirsky) for the number of...
Let k 651 be an integer. We prove that a suitable asymptotic formula for the average number of repre...
AbstractAn asymptotic formula is obtained for the number of representations of an element of a finit...
Let $X$ be a large integer. We prove that, for any fixed positive integer $k$, a suitable asymptotic...
Let $X$ be a large integer. We prove that, for any fixed positive integer $k$, a suitable asymptotic...
Let $X$ be a large integer. We prove that, for any fixed positive integer $k$, a suitable asymptot...
Abstract of paper [1]. We prove that, for any fixed positive integer k, a suitable asymptotic formul...
AbstractA well-known theorem of Erdös and Fuchs states that we cannot have too good an asymptotic fo...
We prove an asymptotic formula (that refines old results by Walfisz and Mirsky) for the number of ...
The sum of the number of second order polynomial value representations by the sum of two numbers squ...
Let F q be the finite field of q elements. Let H⊆Fq*be a multiplicative subgroup. For a positive int...
AbstractConsider an extension field Fqm=Fq(α) of the finite field Fq. Davenport proved that the set ...
We investigate the number of representations of an integer as the sum of various powers. In particul...
We investigate the number of representations of an integer as the sum of various powers. In particul...
Waring's Problem asks if for given n it is possible to represent n as the sum of a finite number of ...
We prove an asymptotic formula (that refines old results by Walfisz and Mirsky) for the number of...
Let k 651 be an integer. We prove that a suitable asymptotic formula for the average number of repre...
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