Adapting a result of R. Villemaire on expansions of Presburger arithmetic, we show how to define multiplication in some expansions of the additive reduct of certain Euclidean rings. In particular, this applies to polynomial rings over a finite field
We study of the arithmetic of polynomials under the operation of functional composition, namely, the...
Let D be a domain with quotient field K. We consider the ring IntD.[ fg Kw X x; f D.:Dx of integer-...
AbstractUsing the theory of Witt vectors, we define ring structures on several well-known groups of ...
Montogomery multiplication of two elements a and b of a finite field F(q) is defined as abr(-1) wher...
Montgomery multiplication of two elements a and b of a finite field Fq is defined as abr- 1 where r ...
AbstractThere is a natural action (n,x)↦nx of (N,·) on any semigroup (S,+). When S is compact, there...
We give an overview on recent results concerning additive unit representations. Furthermore the solu...
We give an overview on recent results concerning additive unit representations. Furthermore the solu...
A method for polynomial multiplication over finite fields using field extensions and polynomial inte...
Polynomial multiplication is as close to any problem comes to being “classical” in the field of comp...
AbstractWe introduce the concept of polynomial operation from the Burnside ring functor A to other r...
[[abstract]]The authors first present a class of expansions in a series of Bernoulli polyomials and ...
AbstractA ring R is called (quasi-) Baer if the right annihilator of every (ideal) nonempty subset o...
AbstractLet Fq be a finite field with q elements and p∈Fq[X,Y]. In this paper we study properties of...
Let $P$ and $Q$ be two non-zero multiplicatively independent polynomials with coefficients in a fini...
We study of the arithmetic of polynomials under the operation of functional composition, namely, the...
Let D be a domain with quotient field K. We consider the ring IntD.[ fg Kw X x; f D.:Dx of integer-...
AbstractUsing the theory of Witt vectors, we define ring structures on several well-known groups of ...
Montogomery multiplication of two elements a and b of a finite field F(q) is defined as abr(-1) wher...
Montgomery multiplication of two elements a and b of a finite field Fq is defined as abr- 1 where r ...
AbstractThere is a natural action (n,x)↦nx of (N,·) on any semigroup (S,+). When S is compact, there...
We give an overview on recent results concerning additive unit representations. Furthermore the solu...
We give an overview on recent results concerning additive unit representations. Furthermore the solu...
A method for polynomial multiplication over finite fields using field extensions and polynomial inte...
Polynomial multiplication is as close to any problem comes to being “classical” in the field of comp...
AbstractWe introduce the concept of polynomial operation from the Burnside ring functor A to other r...
[[abstract]]The authors first present a class of expansions in a series of Bernoulli polyomials and ...
AbstractA ring R is called (quasi-) Baer if the right annihilator of every (ideal) nonempty subset o...
AbstractLet Fq be a finite field with q elements and p∈Fq[X,Y]. In this paper we study properties of...
Let $P$ and $Q$ be two non-zero multiplicatively independent polynomials with coefficients in a fini...
We study of the arithmetic of polynomials under the operation of functional composition, namely, the...
Let D be a domain with quotient field K. We consider the ring IntD.[ fg Kw X x; f D.:Dx of integer-...
AbstractUsing the theory of Witt vectors, we define ring structures on several well-known groups of ...
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