Nilsequences, null-sequences, and multiple correlation sequences
Abstract
A (d-parameter) basic nilsequence is a sequence of the form (n)=f(anx), n ∈ Zd, where x is a point of a compact nilmanifold X, a is a translation on X, and f is a continuous function on X; a nilsequence is a uniform limit of basic nilsequences. If X is a compact nilmanifold, Y is a subnilmanifold of X, g(n) is a (d-parameter) polynomial sequence of translations of X, and f is a continuous function on X, we show that the sequence ∫g(n)Yf is the sum of a basic nilsequence and a sequence that converges to zero in uniform density (a null-sequence). We also show that an integral of a family of nilsequences is a nilsequence plus a null-sequence. We deduce that for any invertible finite measure preserving system (W,μ,T), integer polynomials p1,...,pk on Zd, and measurable sets A1,...,Ak in W, the sequence μ(Tp1(n)A1... Tpk(n)Ak), n∈ Zd, is the sum of a nilsequence and a null-sequence.
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