A test for Picard principle
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Publication:4059720
DOI10.1017/S002776300001641XzbMath0304.31002MaRDI QIDQ4059720
Publication date: 1975
Published in: Nagoya Mathematical Journal (Search for Journal in Brave)
Harmonic, subharmonic, superharmonic functions in two dimensions (31A05) Boundary behavior (theorems of Fatou type, etc.) of harmonic functions in two dimensions (31A20)
Related Items (6)
The range of Picard dimensions ⋮ A remark on Picard principle, II ⋮ A remark on Picard principle ⋮ Nonmonotoneity of Picard Principle ⋮ Das Picard-Prinzip und verwandte Fragen bei Störungen von harmonischen Räumen ⋮ Minimal thinness in an isolated singularity of the Schrödinger equation and application to the Picard principle
Cites Work
- Martin boundary over an isolated singularity of rotation free density
- Martin boundary for linear elliptic differential operators of second order in a manifold
- Riemann surfaces of infinite genus
- Order Comparisons on Canonical Isomorphisms
- Les solutions positives de l'équation $\Delta u=Pu$ sur une surface de Riemann
- The space of non-negative solutions of the equation $\Delta u=pu$ on a Riemann surface
- Classification of Riemann surfaces
- Some classes of positive solutions of $\Delta u=Pu$ on Riemann surfaces. I.
- Some classes of positive solutions of $\Delta u=P u$ on Riemann surfaces. II.
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