Averaging with the Divisor Function: p-improving and Sparse Bounds

Abstract

We study averages along the integers using the divisor function d(n), and defined as KN f (x) = 1D(N) Σ n ≤ N d(n) \,f(x+n) , where D(N) = Σ n=1 N d(n) . We shall show that these averages satisfy a uniform, scale free p-improving estimate for p ∈ (1,2), that is ( 1N Σ |KNf|p' )1/p' (1N Σ |f|p )1/p as long as f is supported on [0,N]. We also show that the associated maximal function K*f = N |KN f| satisfies (p,p) sparse founds for p ∈ (1,2), which implies that K* is bounded on p (w) for p ∈ (1, ∞ ), for all weights w in the Muckenhoupt Ap class.