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Abstract
In this paper we establish the existence of an ideal boundary Δ for X such that the points of Δ correspond to non-negative harmonic functions, Δ supports the maximal representing measures for positive bounded (and quasibounded) harmonic functions, and almost all points of Δ are regular for the Dirichlet problem.
Journal
- The scientific reports of the Kyoto Prefectural University. Natural science and living science [List of Volumes]
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The scientific reports of the Kyoto Prefectural University. Natural science and living science 30, 1-6, 1979-12-20 [Table of Contents]
Kyoto Prefectural University
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