The study of many problems in additive combinatorics, such as Szemer\'edi's theorem on arithmetic progressions, is made easier by first studying models for the problem in F_p^n for some fixed small prime p. We give a number of examples of finite field models of this type, which allows us to introduce some of the central ideas in additive combinatorics relatively cleanly. We also give an indication of how the intuition gained from the study of finite field models can be helpful for addressing the original questions
Additive Combinatorics is new discipline in mathematics with connections to additive number theory, ...
The research field of finite geometries investigates structures with a finite number of objects. Cla...
We show that there exists an interesting non-uniform model of computational complexity within chara...
Poised to become the leading reference in the field, the Handbook of Finite Fields is exclusively de...
This book provides a brief and accessible introduction to the theory of finite fields and to some of...
The most famous open problems concerning prime numbers are binary additive problems, with the twin-p...
We consider two problems regarding arithmetic progressions in symmetric sets in the finite field (pr...
The study of sum and product problems in finite fields motivates the investigation of additive struc...
Proofs for most of the results in this chapter can be found in Chapters 2 and 3 of [1939]; see also ...
Additive combinatorics is built around the famous theorem by Sze-merédi which asserts existence of ...
I will report on joint work with Pillay and Terry on arithmetic regularity (a group theoretic analog...
330 páginas.-- 2000 Mathematical Subject Classification 11P70, 11B50, 11R27.This book collects the m...
This series of lectures concentrates on deterministic algorithms for finite fields. The emphasis is ...
AbstractLet Fq be a finite field with q elements and p∈Fq[X,Y]. In this paper we study properties of...
AbstractWe investigate the computational power of finite-field arithmetic operations as compared to ...
Additive Combinatorics is new discipline in mathematics with connections to additive number theory, ...
The research field of finite geometries investigates structures with a finite number of objects. Cla...
We show that there exists an interesting non-uniform model of computational complexity within chara...
Poised to become the leading reference in the field, the Handbook of Finite Fields is exclusively de...
This book provides a brief and accessible introduction to the theory of finite fields and to some of...
The most famous open problems concerning prime numbers are binary additive problems, with the twin-p...
We consider two problems regarding arithmetic progressions in symmetric sets in the finite field (pr...
The study of sum and product problems in finite fields motivates the investigation of additive struc...
Proofs for most of the results in this chapter can be found in Chapters 2 and 3 of [1939]; see also ...
Additive combinatorics is built around the famous theorem by Sze-merédi which asserts existence of ...
I will report on joint work with Pillay and Terry on arithmetic regularity (a group theoretic analog...
330 páginas.-- 2000 Mathematical Subject Classification 11P70, 11B50, 11R27.This book collects the m...
This series of lectures concentrates on deterministic algorithms for finite fields. The emphasis is ...
AbstractLet Fq be a finite field with q elements and p∈Fq[X,Y]. In this paper we study properties of...
AbstractWe investigate the computational power of finite-field arithmetic operations as compared to ...
Additive Combinatorics is new discipline in mathematics with connections to additive number theory, ...
The research field of finite geometries investigates structures with a finite number of objects. Cla...
We show that there exists an interesting non-uniform model of computational complexity within chara...