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Boundary limit theorems for positive hyperharmonic functions |
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| Abstract: | We prove the following result: Let u be a positive hyperharmonic function on the open unit ball B?R n whose almost all radial limits are equal to zero and there are no such radial limits along which u tends to infinity. Then u is identically equal to zero. |
| Keywords: | Positive hyperharmonic functions Boundary limit Cone Polar cap Radial limit 2000 Mathematics Subject Classifications: 31C05 31B25 |