Martin boundary of a fractal domain
Journal article, 2003
A uniformly John domain is a domain intermediate between a John domain and a uniform domain. We determine the Martin boundary of a uniformly John domain D as an application of a boundary Harnack principle. We show that a certain self-similar fractal has its complement as a uniformly John domain. In particular, the complement of the 3-dimensional Sierpinacuteski gasket is a uniform domain and its Martin boundary is homeomorphic to the Sierpinacuteski gasket itself.
uniformly John domain
Martin boundary
internal metric
Green function
fractal
boundary Harnack principle
Author
Hiroaki Aikawa
Shimane University
Torbjörn Lundh
University of Gothenburg
Chalmers, Department of Mathematics
Tomohiko Mizutani
Hiroshima University
Potential Analysis
0926-2601 (ISSN) 1572-929X (eISSN)
Vol. 18 4 311-357Subject Categories
Mathematical Analysis
DOI
10.1023/a:1021823023212