Add to ORKGLet $\mathcal{A}$ and $\mathcal{B}$ be sets of polynomials of degree $n$ over a finite field. We show, that if $\mathcal{A}$ and $\mathcal{B}$ are large enough, then $A+B$ has an irreducible divisor of large degree for some $A\in\mathcal{A}$ and $B\in \mathcal{B}$
AbstractLet a(k,n) be the k-th coefficient of the n-th cyclotomic polynomials. In 1987, J. Suzuki pr...
After the proof of Zhang about the existence of infinitely many bounded gaps between consecutive pri...
AbstractLet M∈Fq[t] be a fixed polynomial and k≥2 be an integer. In this paper we will give the dens...
summary:In this paper we generalize the method used to prove the Prime Number Theorem to deal with f...
summary:In this paper we generalize the method used to prove the Prime Number Theorem to deal with f...
For a given monic integral polynomial $f(x)$ of degree $n$, we define local roots $r_i$ of $f(x)$ fo...
AbstractLet A=Fq[t] denote the ring of polynomials over the finite field Fq. We denote by e a certai...
In this paper, we show under the abc conjecture that the Diophantine equation f(x)=u!+v! has only fi...
AbstractIf A is a set of positive integers, we denote by p(A,n) the number of partitions of n with p...
AbstractWe obtain an equivalent version of Carlitz's formula for the number of monic irreducible pol...
AbstractLet f(x) be a real valued polynomial in x of degree k⩾4 with leading coefficient α. In this ...
In this paper it is shown that if the volume sum ∑r = 1∞ Ψ(r) converges for a monotonic function Ψ t...
AbstractLet GF(q) denote the finite field of order q, a power of a prime p, and m a positive integer...
In this paper, we show under the abc conjecture that the Diophantine equation f(x)=u!+v! has only fi...
AbstractNew lower bounds are given for the sum of degrees of simple and distinct irreducible factors...
AbstractLet a(k,n) be the k-th coefficient of the n-th cyclotomic polynomials. In 1987, J. Suzuki pr...
After the proof of Zhang about the existence of infinitely many bounded gaps between consecutive pri...
AbstractLet M∈Fq[t] be a fixed polynomial and k≥2 be an integer. In this paper we will give the dens...
summary:In this paper we generalize the method used to prove the Prime Number Theorem to deal with f...
summary:In this paper we generalize the method used to prove the Prime Number Theorem to deal with f...
For a given monic integral polynomial $f(x)$ of degree $n$, we define local roots $r_i$ of $f(x)$ fo...
AbstractLet A=Fq[t] denote the ring of polynomials over the finite field Fq. We denote by e a certai...
In this paper, we show under the abc conjecture that the Diophantine equation f(x)=u!+v! has only fi...
AbstractIf A is a set of positive integers, we denote by p(A,n) the number of partitions of n with p...
AbstractWe obtain an equivalent version of Carlitz's formula for the number of monic irreducible pol...
AbstractLet f(x) be a real valued polynomial in x of degree k⩾4 with leading coefficient α. In this ...
In this paper it is shown that if the volume sum ∑r = 1∞ Ψ(r) converges for a monotonic function Ψ t...
AbstractLet GF(q) denote the finite field of order q, a power of a prime p, and m a positive integer...
In this paper, we show under the abc conjecture that the Diophantine equation f(x)=u!+v! has only fi...
AbstractNew lower bounds are given for the sum of degrees of simple and distinct irreducible factors...
AbstractLet a(k,n) be the k-th coefficient of the n-th cyclotomic polynomials. In 1987, J. Suzuki pr...
After the proof of Zhang about the existence of infinitely many bounded gaps between consecutive pri...
AbstractLet M∈Fq[t] be a fixed polynomial and k≥2 be an integer. In this paper we will give the dens...