Higher uniformity of arithmetic functions in short intervals II. Almost all intervals

Abstract

We study higher uniformity properties of the von Mangoldt function , the M\"obius function μ, and the divisor functions dk on short intervals (x,x+H] for almost all x ∈ [X, 2X]. Let and dk be suitable approximants of and dk, G/ a filtered nilmanifold, and F G/ C a Lipschitz function. Then our results imply for instance that when X1/3+ ≤ H ≤ X we have, for almost all x ∈ [X, 2X], \[ g ∈ Poly(Z G) | Σx < n ≤ x+H ((n)-(n)) F(g(n)) | H-A X \] for any fixed A>0, and that when X ≤ H ≤ X we have, for almost all x ∈ [X, 2X], \[ g ∈ Poly(Z G) | Σx < n ≤ x+H (dk(n)-dk(n)) F(g(n)) | = o(H k-1 X). \] As a consequence, we show that the short interval Gowers norms \|-\|Us(X,X+H] and \|dk-dk\|Us(X,X+H] are also asymptotically small for any fixed s in the same ranges of H. This in turn allows us to establish the Hardy-Littlewood conjecture and the divisor correlation conjecture with a short average over one variable. Our main new ingredients are type II estimates obtained by developing a "contagion lemma" for nilsequences and then using this to "scale up" an approximate functional equation for the nilsequence to a larger scale. This extends an approach developed by Walsh for Fourier uniformity.

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