Add to ORKGWe prove results in arithmetic combinatorics involving sums of prime numbers and also some variants of the Erdös-Szemerédi sum-product phenomenon. In particular, we prove nontrivial lower bounds on the density in the integers of the sumset of a positive relative density subset of the primes. The proof of this result uses Green and Green-Tao pseudorandomness arguments to reduce the problem to an analogous statement for relatively dense subsets of the multiplicative subgroup of integers modulo a large integer N. The latter statement is resolved with a combinatorial argument which bounds high moments of a representation function. We also show that if two distinct sets A and B of complex numbers have very small productset, then they produce...
In their seminal paper Erdös and Szemerédi formulated conjectures on the size of sumset and product ...
Let A be a subset of a ring with cardinality |A | = N. The sum set and the product set are 2A = A+A...
International audienceLet \({\mathcal{A}}\), \({\mathcal{B}}\) be large subsets of \({\{1,\ldots,N\}...
We prove results in arithmetic combinatorics involving sums of prime numbers and also some variants ...
We state and discuss various problems in the general area of arithmetic combinatorics and recent dev...
International audienceIn this paper some links between the density of a set of integers and the dens...
International audienceIn this paper some links between the density of a set of integers and the dens...
International audienceIn this paper some links between the density of a set of integers and the dens...
We prove various results in additive combinatorics for subsets of random sets. In particular we exte...
The sum-product problem of Erdos and Szemeredi asserts that any subset of the integers has many prod...
A primitive set is one in which no element of the set divides another. Erdős conjectured that the su...
In this paper some links between the density of a set of integers and the density of its sumset, pro...
This dissertation deals with four problems concerning arithmetic structures in densesets of integers...
In their seminal paper Erdös and Szemerédi formulated conjectures on the size of sumset and product ...
Products of Differences over Arbitrary Finite Fields, Discrete Analysis 2018:18, 42 pp. A central p...
In their seminal paper Erdös and Szemerédi formulated conjectures on the size of sumset and product ...
Let A be a subset of a ring with cardinality |A | = N. The sum set and the product set are 2A = A+A...
International audienceLet \({\mathcal{A}}\), \({\mathcal{B}}\) be large subsets of \({\{1,\ldots,N\}...
We prove results in arithmetic combinatorics involving sums of prime numbers and also some variants ...
We state and discuss various problems in the general area of arithmetic combinatorics and recent dev...
International audienceIn this paper some links between the density of a set of integers and the dens...
International audienceIn this paper some links between the density of a set of integers and the dens...
International audienceIn this paper some links between the density of a set of integers and the dens...
We prove various results in additive combinatorics for subsets of random sets. In particular we exte...
The sum-product problem of Erdos and Szemeredi asserts that any subset of the integers has many prod...
A primitive set is one in which no element of the set divides another. Erdős conjectured that the su...
In this paper some links between the density of a set of integers and the density of its sumset, pro...
This dissertation deals with four problems concerning arithmetic structures in densesets of integers...
In their seminal paper Erdös and Szemerédi formulated conjectures on the size of sumset and product ...
Products of Differences over Arbitrary Finite Fields, Discrete Analysis 2018:18, 42 pp. A central p...
In their seminal paper Erdös and Szemerédi formulated conjectures on the size of sumset and product ...
Let A be a subset of a ring with cardinality |A | = N. The sum set and the product set are 2A = A+A...
International audienceLet \({\mathcal{A}}\), \({\mathcal{B}}\) be large subsets of \({\{1,\ldots,N\}...