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Uniqueness of meromorphic functions sharing three sets – Further study
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Veröffentlicht/Copyright:
28. Mai 2014
Abstract
The notion of weighted sharing of sets is employed to deal with the problem of uniqueness of meromorphic functions sharing three sets. We obtain two results which radically improve and extend a number of results in [2] and [3].
AMS (2010): 30D35
Received: 2013-3-1
Accepted: 2014-3-6
Published Online: 2014-5-28
Published in Print: 2014-6-28
©2014 Walter de Gruyter Berlin/Boston
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Artikel in diesem Heft
- Frontmatter
- Pseudo-orthants as a generalisation of orthants
- Uniqueness of meromorphic functions sharing three sets – Further study
- Radius problems associated with pre-Schwarzian and Schwarzian derivatives
- Entire functions sharing certain values with their derivatives
- Alternative proofs of a formula for Bernoulli numbers in terms of Stirling numbers
- Local separability property for Reifenberg sets in parabolic space
- Sharp inequalities for the psi function and harmonic numbers
- Evolution of open elastic curves in ℝn subject to fixed length and natural boundary conditions
- Refinements of the Ostrowski inequality in terms of the cumulative variation and applications
- Erratum to Analysis 34(1), pg. 81–109
- 10.1515/anly-2014-0002
Artikel in diesem Heft
- Frontmatter
- Pseudo-orthants as a generalisation of orthants
- Uniqueness of meromorphic functions sharing three sets – Further study
- Radius problems associated with pre-Schwarzian and Schwarzian derivatives
- Entire functions sharing certain values with their derivatives
- Alternative proofs of a formula for Bernoulli numbers in terms of Stirling numbers
- Local separability property for Reifenberg sets in parabolic space
- Sharp inequalities for the psi function and harmonic numbers
- Evolution of open elastic curves in ℝn subject to fixed length and natural boundary conditions
- Refinements of the Ostrowski inequality in terms of the cumulative variation and applications
- Erratum to Analysis 34(1), pg. 81–109
- 10.1515/anly-2014-0002
