AbstractIn this paper, we consider the sequence 11, + 11 + 22, 11 + 22 + 33, ... and prove some of its congruence properties. Surprisingly, this sequence is uniformly distributed in the residue classes (mod m) where m ≢ 0 (mod 4). Using these results and Selberg′s sieve, we obtain an upper hound for the number of primes in the sequence which are ≤ x
Let p be a prime greater than 3. In this paper, by using expansions and congruences for Lucas sequen...
We investigate algebraic and arithmetic properties of a class of sequences of sparse polynomials th...
Morgan Ward pursued the study of elliptic divisibility sequences initiated by Lucas, and Chudnovsky ...
In this paper, we consider the sequence 11, + 11 + 22, 11 + 22 + 33, ... and prove some of its congr...
International audienceAbstract We generalize current known distribution results on Shanks–Rényi prim...
We prove a generalization of the author's work to show that any subset of the primes which is 'well ...
Using A. Weil’s estimates the authors have given bounds for the largest prime P0 such that all prime...
AbstractLet p be a prime, u be a linear recurring sequence of integers of order d and let S=3d2+9d2+...
Let Ω(n) denote the number of prime divisors of n counting multiplicity. One can show that for any p...
AbstractA regularity in the distribution of the solutions of the congruence f(X1 ,…, Xn) 0 (modp) ...
We prove that any set of integers A [1; x] with jAj (log x)r lies in at least A(p) p r r+1 many ...
The arithmetic properties of the ordinary partition function p(n) have been the topic of intensive s...
A regularity in the distribution of the solutions of the congruence f(X1,..., Xn) 0 (modp) is shown
In this paper we investigate about the effective distribution of the numbers coprime with the primes...
Abstract. Consider a set S ⊂ Zn. Suppose that, for many primes p, the distribution of S in congruenc...
Let p be a prime greater than 3. In this paper, by using expansions and congruences for Lucas sequen...
We investigate algebraic and arithmetic properties of a class of sequences of sparse polynomials th...
Morgan Ward pursued the study of elliptic divisibility sequences initiated by Lucas, and Chudnovsky ...
In this paper, we consider the sequence 11, + 11 + 22, 11 + 22 + 33, ... and prove some of its congr...
International audienceAbstract We generalize current known distribution results on Shanks–Rényi prim...
We prove a generalization of the author's work to show that any subset of the primes which is 'well ...
Using A. Weil’s estimates the authors have given bounds for the largest prime P0 such that all prime...
AbstractLet p be a prime, u be a linear recurring sequence of integers of order d and let S=3d2+9d2+...
Let Ω(n) denote the number of prime divisors of n counting multiplicity. One can show that for any p...
AbstractA regularity in the distribution of the solutions of the congruence f(X1 ,…, Xn) 0 (modp) ...
We prove that any set of integers A [1; x] with jAj (log x)r lies in at least A(p) p r r+1 many ...
The arithmetic properties of the ordinary partition function p(n) have been the topic of intensive s...
A regularity in the distribution of the solutions of the congruence f(X1,..., Xn) 0 (modp) is shown
In this paper we investigate about the effective distribution of the numbers coprime with the primes...
Abstract. Consider a set S ⊂ Zn. Suppose that, for many primes p, the distribution of S in congruenc...
Let p be a prime greater than 3. In this paper, by using expansions and congruences for Lucas sequen...
We investigate algebraic and arithmetic properties of a class of sequences of sparse polynomials th...
Morgan Ward pursued the study of elliptic divisibility sequences initiated by Lucas, and Chudnovsky ...