Multivariate Polynomial Values in Difference Sets
Abstract
For ≥ 2 and h∈ Z[x1,…,x] of degree k≥ 2, we show that every set A⊂eq \1,2,…,N\ lacking nonzero differences in h(Z) satisfies |A|h Ne-c( N)μ, where c=c(h)>0, μ=[(k-1)2+1]-1 if =2, and μ=1/2 if ≥ 3, provided h(Z) contains a multiple of every natural number and h satisfies certain nonsingularity conditions. We also explore these conditions in detail, drawing on a variety of tools from algebraic geometry.
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