Add to ORKGEuler refers to the book by John Wallis “Arithmetica Infinitorum ” in which we find a sequence of co...
summary:Euler's pentagonal number theorem was a spectacular achievement at the time of its discovery...
We study the sum [equation omitted for formating reasons] of consecutive iterations of the Euler fun...
We will generalize the definitions of Eulerian numbers and Eulerian polynomials to general arithmeti...
We prove here some properties of primitive roots and indices in Elementary Number Theory by applying...
Dedicated to Paulo Ribenboim on the occasion of his 80th birthday. RÉSUMÉ. Nous développons une théo...
It is demonstrated that we can represent Euler's φ-function by means of a Δ0-formula in such a way t...
The function φ(n) (the Euler phi function of n, also known as the totient function) gives the number...
A generalized Euler's totient is defined as a Dirichlet convolution of a power function and a produc...
Aquest article explica, a un nivell divulgatiu, diversos resultats sobre progressions aritmètiques f...
Le sujet de cette thèse est l'étude des progressions arithmétiques dans les nombres entiers. Plus pr...
This study presents three different proofs that the Euler series converges to n26. These are the fo...
The concepts of Euler numbers and Euler polynomials are generalized and some basic properties are in...
The aim of this article is to propose a generalisation for Euler's function, This function is c...
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
Euler refers to the book by John Wallis “Arithmetica Infinitorum ” in which we find a sequence of co...
summary:Euler's pentagonal number theorem was a spectacular achievement at the time of its discovery...
We study the sum [equation omitted for formating reasons] of consecutive iterations of the Euler fun...
We will generalize the definitions of Eulerian numbers and Eulerian polynomials to general arithmeti...
We prove here some properties of primitive roots and indices in Elementary Number Theory by applying...
Dedicated to Paulo Ribenboim on the occasion of his 80th birthday. RÉSUMÉ. Nous développons une théo...
It is demonstrated that we can represent Euler's φ-function by means of a Δ0-formula in such a way t...
The function φ(n) (the Euler phi function of n, also known as the totient function) gives the number...
A generalized Euler's totient is defined as a Dirichlet convolution of a power function and a produc...
Aquest article explica, a un nivell divulgatiu, diversos resultats sobre progressions aritmètiques f...
Le sujet de cette thèse est l'étude des progressions arithmétiques dans les nombres entiers. Plus pr...
This study presents three different proofs that the Euler series converges to n26. These are the fo...
The concepts of Euler numbers and Euler polynomials are generalized and some basic properties are in...
The aim of this article is to propose a generalisation for Euler's function, This function is c...
Euler finds the values of ζ(2n), where ζ is now named as the Riemann zeta function. He introduces th...
Euler refers to the book by John Wallis “Arithmetica Infinitorum ” in which we find a sequence of co...
summary:Euler's pentagonal number theorem was a spectacular achievement at the time of its discovery...
We study the sum [equation omitted for formating reasons] of consecutive iterations of the Euler fun...