Shape of the asymptotic maximum sum-free sets in integer lattice grids

Abstract

We determine the shape of all sum-free sets in \1,2,…,n\2 of size close to the maximum 35n2, solving a problem of Elsholtz and Rackham. We show that all such asymptotic maximum sum-free sets lie completely in the stripe 45n-o(n) x+y85n+ o(n). We also determine for any positive integer p the maximum size of a subset A⊂eq \1,2,…,n\2 which forbids the triple (x,y,z) satisfying px+py=z.