Sparse Bounds for Random Discrete Carleson Theorems

Abstract

We study discrete random variants of the Carleson maximal operator. Intriguingly, these questions remain subtle and difficult, even in this setting. Let \Xm\ be an independent sequence of \0,1\ random variables with expectations \[ E Xm = σm = m-α, \ 0 < α < 1/2, \] and Sm = Σk=1 m Xk. Then the maximal operator below almost surely is bounded from p to p, provided the Minkowski dimension of ⊂ [-1/2, 1/2] is strictly less than 1- α . \[ λ ∈ | Σm≠ 0 X m e( λ m ) sgn (m)S |m| f(x- m) |. \] This operator also satisfies a sparse type bound. The form of the sparse bound immediately implies weighted estimates in all 2, which are novel in this setting. Variants and extensions are also considered.