Harmonic Extensions on Z × N and a Discrete Hilbert Transform

Abstract

For a given boundary sequence a=(an)n∈Z, we construct harmonic extensions U,V:Z×\ N R that serve as discrete analogs of the Poisson and conjugate-Poisson integrals. The construction is characterized by: (i) discrete harmonicity with respect to a two-dimensional Laplacian, (ii) a Cauchy-Riemann system, and (iii) boundary values involving a discrete Hilbert transform: U(n,0)=an,\;V(n,0)=(H da)n. We compare H d to the Riesz-Titchmarsh transform and prove weak-type (1,1) and p bounds for p>1. We also extend the constructions to harmonic extensions on Zs × N. These results provide a discrete harmonic-analytic model analogous to the classical theory.

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