AbstractThe Apéry numbers, introduced in Apéry's celebrated proof of the irrationality of ζ(3), are defined by an=∑nk=0(nk)2(n+kk)2. They have the following nice property: if p is a prime number, and n = ∑ nj pj is the base p expansion of n, then an ≡ ∏anj mod p. In a paper which appeared in this journal (64 (1995)11–19), C. Radoux asserted that the same property holds, provided p ⩾ 5, if p is replaced by p2 both for the base and for the congruence, and if p is replaced by p3 both for the base and for the congruence. We show that these two statements are not correct
AbstractThe aim of this paper is to show that for any n∈N, n>3, there exist a, b∈N* such that n=a+b,...
AbstractLet p be an odd prime and γ(k,pn) be the smallest positive integer s such that every integer...
AbstractWe study properties of the polynomials φk(X) which appear in the formal development Πk − 0n ...
AbstractWe prove that Apéry numbers satisfy an analog mod p, p2 and p3 of the congruence of Lucas fo...
AbstractIn 1979 R. Apéry introduced the numbers an = Σ0n(kn)2(kn+k)2 in his irrationality proof for ...
AbstractApéry introduced a recurrence relation for a proof of the irrationality of ζ(3). Let an (n ≥...
AbstractIn 1979 R. Apéry introduced the numbers an = Σ0n(kn)2(kn + k) and un = Σ0n(kn)2(kn + k)2 in ...
Version V2 contains cosmetic changes and a modification of the definition of $r$-admissibility.Inter...
AbstractCongruences for the Apéry numbers are proved which generalize the results and conjectures of...
AbstractFor p prime and . A parallel, but rather different congruence holds modulo p3
AbstractIn 1878 Lucas established a method of computing binomial coefficients modulo a prime. We est...
AbstractThe three sequences mentioned in the title are Ramanujan's τ-function, the coefficients cn o...
In this article we introduce Proth numbers and prove two theorems on such numbers being prime [3]. W...
In 2020, Roger Baker \cite{Bak} proved a result on the exceptional set of moduli in the prime number...
Lucas' theorem describes how to reduce a binomial coefficient $\binom{a}{b}$ modulo $p$ by breaking ...
AbstractThe aim of this paper is to show that for any n∈N, n>3, there exist a, b∈N* such that n=a+b,...
AbstractLet p be an odd prime and γ(k,pn) be the smallest positive integer s such that every integer...
AbstractWe study properties of the polynomials φk(X) which appear in the formal development Πk − 0n ...
AbstractWe prove that Apéry numbers satisfy an analog mod p, p2 and p3 of the congruence of Lucas fo...
AbstractIn 1979 R. Apéry introduced the numbers an = Σ0n(kn)2(kn+k)2 in his irrationality proof for ...
AbstractApéry introduced a recurrence relation for a proof of the irrationality of ζ(3). Let an (n ≥...
AbstractIn 1979 R. Apéry introduced the numbers an = Σ0n(kn)2(kn + k) and un = Σ0n(kn)2(kn + k)2 in ...
Version V2 contains cosmetic changes and a modification of the definition of $r$-admissibility.Inter...
AbstractCongruences for the Apéry numbers are proved which generalize the results and conjectures of...
AbstractFor p prime and . A parallel, but rather different congruence holds modulo p3
AbstractIn 1878 Lucas established a method of computing binomial coefficients modulo a prime. We est...
AbstractThe three sequences mentioned in the title are Ramanujan's τ-function, the coefficients cn o...
In this article we introduce Proth numbers and prove two theorems on such numbers being prime [3]. W...
In 2020, Roger Baker \cite{Bak} proved a result on the exceptional set of moduli in the prime number...
Lucas' theorem describes how to reduce a binomial coefficient $\binom{a}{b}$ modulo $p$ by breaking ...
AbstractThe aim of this paper is to show that for any n∈N, n>3, there exist a, b∈N* such that n=a+b,...
AbstractLet p be an odd prime and γ(k,pn) be the smallest positive integer s such that every integer...
AbstractWe study properties of the polynomials φk(X) which appear in the formal development Πk − 0n ...