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The generalized Matsaev theorem on growth of subharmonic functions admitting a lower bound in ℝn
Zhang,Yan Hui1; Kou,Kit Ian2; Deng,Guan Tie3; Qian,Tao2
2017-05-04
Source PublicationComplex Variables and Elliptic Equations
ISSN1747-6933
Volume62Issue:5Pages:642-653
Abstract

We generalize Matsaev’s theorem for subharmonic functions from two to higher dimension. The proofs are nontrivial and constructive.

KeywordCartwright’s Class Growth Lower Bound Upper Bound
DOI10.1080/17476933.2016.1234464
URLView the original
Indexed BySCIE
Language英語English
WOS IDWOS:000395203300004
Scopus ID2-s2.0-84991246680
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Document TypeJournal article
CollectionUniversity of Macau
Corresponding AuthorZhang,Yan Hui
Affiliation1.Department of Mathematics,Beijing Technology and Business University,Beijing,China
2.Faculty of Science and Technology,Department of Mathematics,University of Macau,Macao
3.Key Laboratory of Mathematics and Complex Systems of Ministry of Education,School of Mathematical Sciences,Beijing Normal University,Beijing,China
Recommended Citation
GB/T 7714		 Zhang,Yan Hui,Kou,Kit Ian,Deng,Guan Tie,et al. The generalized Matsaev theorem on growth of subharmonic functions admitting a lower bound in ℝn[J]. Complex Variables and Elliptic Equations, 2017, 62(5), 642-653.
APA Zhang,Yan Hui., Kou,Kit Ian., Deng,Guan Tie., & Qian,Tao (2017). The generalized Matsaev theorem on growth of subharmonic functions admitting a lower bound in ℝn. Complex Variables and Elliptic Equations, 62(5), 642-653.
MLA Zhang,Yan Hui,et al."The generalized Matsaev theorem on growth of subharmonic functions admitting a lower bound in ℝn".Complex Variables and Elliptic Equations 62.5(2017):642-653.
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