Fatou Type Theorems: Maximal Functions and Approach Regions |
Contents
The Geometric Contexts | 3 |
Approach Regions for Trees | 87 |
Embedded Trees | 99 |
Copyright | |
5 other sections not shown
Other editions - View all
Common terms and phrases
admissible embedding Amer analytic disc approach system B(wg belongs boundary behaviour bounded C₁ cones constant construction contains convergence corresponding cubes defined denoted direct descendant disjoint domains of finite dyadic arc dyadic intervals dyadic tree E.M. Stein Euclidean distance Euclidean half-space exotic Fatou theorem finite type Fourier full measure G+(z geodesic given half-plane Harmonic analysis harmonic functions harmonic measure holomorphic functions homogeneous type implies inequality Koch snowflake L¹(bD Lebesgue Lemma Littlewood London Math maximal function maximal operator missing direction Nagel Nagel-Stein natural approach family NTA domain Observe open set Pf(z Poisson integral Poisson kernel Princeton proof of Theorem Przytycki pseudoconvex domain quasi-dyadic decomposition r₁(x rç(z rq(x Section sequence space of homogeneous subset Sueiro T(bD tangent space tent condition theory tree twist unit ball unit disc vertex vertices Whitney-type wq(x Zygmund