Estimates of Henstock--Kurzweil Poisson integrals

Abstract

If f is a real-valued function on [-π,π] that is Henstock--Kurzweil integrable, let ur(θ) be its Poisson integral. It is shown that \|ur\|p=o(1/(1-r)) as r 1 and this estimate is sharp for 1≤ p≤∞. If μ is a finite Borel measure and ur(θ) is its Poisson integral then for each 1≤ p≤ ∞ the estimate \|ur\|p=O((1-r)1/p-1) as r 1 is sharp. The Alexiewicz norm estimates \|ur\|≤\|f\| (0≤ r<1) and \|ur-f\| 0 (r 1) hold. These estimates lead to two uniqueness theorems for the Dirichlet problem in the unit disc with Henstock--Kurzweil integrable boundary data. There are similar growth estimates when u is in the harmonic Hardy space associated with the Alexiewicz norm and when f is of bounded variation.

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