Weakly mixing sets and polynomial equations
Abstract
We investigate polynomial patterns which can be guaranteed to appear in weakly mixing sets introduced by introduced by Furstenberg and studied by Fish. In particular, we prove that if A ⊂ N is a weakly mixing set and p(x) ∈ Z[x] a polynomial of odd degree with positive leading coefficient, then all sufficiently large integers N can be represented as N = n1 + n2, where p(n1) + m,\ p(n2) + m ∈ A for some m ∈ A.
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