A Generalization of Varnavides's Theorem
Abstract
A linear equation E is said to be sparse if there is c>0 so that every subset of [n] of size n1-c contains a solution of E in distinct integers. The problem of characterizing the sparse equations, first raised by Ruzsa in the 90's, is one of the most important open problems in additive combinatorics. We say that E in k variables is abundant if every subset of [n] of size n contains at least poly()· nk-1 solutions of E. It is clear that every abundant E is sparse, and Gir\~ao, Hurley, Illingworth and Michel asked if the converse implication also holds. In this note we show that this is the case for every E in 4 variables. We further discuss a generalization of this problem which applies to all linear equations.
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