AbstractM. Filaseta, K. Ford, S. Konyagin, C. Pomerance and G. Yu proved that if the reciprocal sum of the moduli of a covering system is bounded, then the least modulus is also bounded, which confirms a conjecture of P. Erdős and J.L. Selfridge. They also showed that, for K>1, the complement in Z of any union of residue classes r(n)(modn) with distinct n∈(N,KN] has density at least dK for N sufficiently large, which implies a conjecture of P. Erdős and R.L. Graham. In this paper, we extend these results to covering systems of the ring of integers of an arbitrary number field F/Q
In 1950 Erdos made the following conjecture ($1000 reward for a solution): Given an integer {\it m\/...
In 1950 Paul Erdos observed that every integer belonged to a certain system of congruences with dist...
In 1950 Paul Erdos observed that every integer belonged to a certain system of congruences with dist...
AbstractM. Filaseta, K. Ford, S. Konyagin, C. Pomerance and G. Yu proved that if the reciprocal sum ...
Since their introduction by Erdős in 1950, covering systems (that is, finite collections of arithmet...
A covering system or a covering is a set of linear congruences such that every integer satisfies at ...
A covering system or a covering is a set of linear congruences such that every integer satisfies at ...
100 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2006.A collection of congruences w...
AbstractTextPaul Erdős, in 1950, asked whether for each positive integer N there exists a finite set...
A covering system is a finite collection of arithmetic progressions whose union is the set of intege...
Covering systems were introduced by Erd\H{o}s in 1950. In the same article where he introduced them,...
In this paper, we study necessary conditions for small sets of congruences with distinct moduli to c...
The work in this thesis is based on a paper written by Bob Hough in 2013. This thesis addresses the ...
The work in this thesis is based on a paper written by Bob Hough in 2013. This thesis addresses the ...
In 1950 Erdos made the following conjecture ($1000 reward for a solution): Given an integer {\it m\/...
In 1950 Erdos made the following conjecture ($1000 reward for a solution): Given an integer {\it m\/...
In 1950 Paul Erdos observed that every integer belonged to a certain system of congruences with dist...
In 1950 Paul Erdos observed that every integer belonged to a certain system of congruences with dist...
AbstractM. Filaseta, K. Ford, S. Konyagin, C. Pomerance and G. Yu proved that if the reciprocal sum ...
Since their introduction by Erdős in 1950, covering systems (that is, finite collections of arithmet...
A covering system or a covering is a set of linear congruences such that every integer satisfies at ...
A covering system or a covering is a set of linear congruences such that every integer satisfies at ...
100 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2006.A collection of congruences w...
AbstractTextPaul Erdős, in 1950, asked whether for each positive integer N there exists a finite set...
A covering system is a finite collection of arithmetic progressions whose union is the set of intege...
Covering systems were introduced by Erd\H{o}s in 1950. In the same article where he introduced them,...
In this paper, we study necessary conditions for small sets of congruences with distinct moduli to c...
The work in this thesis is based on a paper written by Bob Hough in 2013. This thesis addresses the ...
The work in this thesis is based on a paper written by Bob Hough in 2013. This thesis addresses the ...
In 1950 Erdos made the following conjecture ($1000 reward for a solution): Given an integer {\it m\/...
In 1950 Erdos made the following conjecture ($1000 reward for a solution): Given an integer {\it m\/...
In 1950 Paul Erdos observed that every integer belonged to a certain system of congruences with dist...
In 1950 Paul Erdos observed that every integer belonged to a certain system of congruences with dist...