A Counterexample in the Classification of Open Riemann Surfaces

An HD-function (harmonic and Dirichlet-finite) ω on a Riemann surface R is called HD-minimal if $\omega > 0$ and every HD-function ω' with 0 ≤ ω' ≤ ω reduces to a constant multiple of ω. An HD∼-function is the limit of a decreasing sequence of positive HD-functions and HD∼-...

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Bibliographic Details
Main Author: Kwon, Young Koan
Format: text
Language:English
Published: Institutional Knowledge at Singapore Management University 1974
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Online Access:https://ink.library.smu.edu.sg/soa_research/668
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Institution: Singapore Management University
Language: English
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