Fractionally modulated discrete Carleson's Theorem and pointwise Ergodic Theorems along certain curves

Abstract

For c∈(1,2) we consider the following operators \[ Ccf(x) = λ ∈ [-1/2,1/2)| Σn ≠ 0f(x-n) e2π iλ |n|c n|, Csgncf(x) = λ ∈ [-1/2,1/2)| Σn ≠ 0f(x-n) e2π iλ sign(n) |n|c n| , \] and prove that both extend boundedly on p(Z), p∈(1,∞). The second main result is establishing almost everywhere pointwise convergence for the following ergodic averages \[ ANf(x)=1NΣn=1Nf(TnS ncx), \] where T,S X X are commuting measure-preserving transformations on a σ-finite measure space (X,μ), and f∈ Lμp(X), p∈(1,∞). The point of departure for both proofs is the study of exponential sums with phases 2 |nc|+ 1n through the use of a simple variant of the circle method.

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