Endpoint r improving estimates for Prime averages

Abstract

Let denote von Mangoldt's function, and consider the averages align* AN f (x) &=1NΣ1≤ n ≤ Nf(x-n)(n) . align* We prove sharp p-improving for these averages, and sparse bounds for the maximal function. The simplest inequality is that for sets F, G⊂ [0,N] there holds equation* N -1 AN 1F , 1G F · G N 2 ( Log F · G N 2 ) t, equation* where t=2, or assuming the Generalized Riemann Hypothesis, t=1. The corresponding sparse bound is proved for the maximal function N AN 1F. The inequalities for t=1 are sharp. The proof depends upon the Circle Method, and an interpolation argument of Bourgain.

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