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Restricted sumset - Wikipedia, the free encyclopedia

Restricted sumset

From Wikipedia, the free encyclopedia

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In combinatorial number theory, a restricted sumset has the form

S=\{a_1+\cdots+a_n:\ a_1\in A_1,\ldots,a_n\in A_n \ \mathrm{and}\ P(a_1,\ldots,a_n)\not=0\},

where A_1,\ldots,A_n are finite nonempty subsets of a field F and P(x_1,\ldots,x_n) is a polynomial over F.

When P(x_1,\ldots,x_n)=1, S is the usual sumset A_1+\cdots+A_n which is denoted by nA if A_1=\cdots=A_n=A; when

P(x_1,\ldots,x_n)=\prod_{1\le i<j\le n}(x_j-x_i),

S is written as A_1\dotplus\cdots\dotplus A_n which is denoted by n^{\wedge} A if A_1=\cdots=A_n=A. Note that | S | > 0 if and only if there exist a_1\in A_1,\ldots,a_n\in A_n with P(a_1,\ldots,a_n)\not=0.

The Cauchy-Davenport theorem named after Cauchy and Harold Davenport asserts that for any prime p and nonempty subsets A and B of the field \Bbb Z/p\Bbb Z we have the inequality

|A+B|\ge\min\{p,\ |A|+|B|-1\}.

The Erdős-Heilbronn conjecture posed by Paul Erdős and Hans Heilbronn in 1964 states that |2^\wedge A|\ge\min\{p,2|A|-3\} if p is a prime and A is a nonempty subset of the field \Bbb Z/p\Bbb Z. This was first confirmed by J.A. Dias da Silva and Y.O. Hamidoune in 1994 who showed that

|n^\wedge A|\ge\min\{p(F),\ n|A|-|A|^2+1\},

where A is a finite nonempty subset of a field F, and p(F) is a prime p if F is of characteristic p, and p(F)=\infty if F is of characteristic 0. Various extensions of this result were given by Noga Alon, M. B. Nathanson and I. Ruzsa in 1996, Q. H. Hou and Zhi-Wei Sun in 2002, and G. Karolyi in 2004.

A powerful tool in the study of lower bounds for cardinalities of various restricted sumsets is the following fundamental principle:

Combinatorial Nullstellensatz [1] Let f(x_1,\ldots,x_n) be a polynomial over a field F. Suppose that the coefficient of the monomial x_1^{k_1}\cdots x_n^{k_n} in f(x_1,\ldots,x_n) is nonzero and k_1+\cdots+k_n is the total degree of f(x_1,\ldots,x_n). If A_1,\ldots,A_n are finite subsets of F with | Ai | > ki for i=1,\ldots,n, then there are a_1\in A_1,\ldots,a_n\in A_n such that f(a_1,\ldots,a_n)\not=0.

The method using the Combinatorial Nullstellensatz is also called the polynomial method. This tool was rooted in a paper of N. Alon and M. Tarsi in 1989, and developed by Alon, Nathanson and Ruzsa[2] in 1995-1996, and reformulated by Alon [3] in 1999.

[edit] References

  • Károlyi, Gyula (2004). "The Erdős–Heilbronn problem in abelian groups". Israel Journal of Mathematics 139: 349–359. MR2041798. 

[edit] External links

Retrieved from "http://en.wikipedia.org../../../r/e/s/Restricted_sumset.html"

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