[1] |
Roper K A, Suffridge T J. Convex mappings on the unit ball of $\mathbb{C}^n$. J Anal Math, 1995, 65:333-347
|
[2] |
Graham I, Kohr G. Univalent mappings associated with the Roper-Suffridge extension operator. J Anal Math, 2000, 81:331-342
|
[3] |
Pfaltzgraff J A, Suffridge T J. An extension theorem and linear invariant families generated by starlike maps. Ann Univ Mariae Curie Sklodowska, 1999, 53:193-207
|
[4] |
Gong S, Liu T S. The generalized Roper-Suffridge extension operator. J Math Anal Appl, 2003, 284:425-434
|
[5] |
Liu X S, Liu T S. The generalized Roper-Suffridge extension operator for locally biholomorphic mappings. Chin Quart J of Math, 2003, 18(3):221-229
|
[6] |
Liu X S. Properties of Some Subclasses od Biholomorphic Mappings in Geometric Function Theory of Several Complex Variables[D]. Hefei:University of Science and Technology of China, 2004
|
[7] |
Duan X L. The Alexander Type Theorem in Several Complex Variables and the Roper-Suffridge Operator[D]. Kaifeng:Henan University, 2009
|
[8] |
Wang J F. Modified Roper-Suffridge operator for some subclasses of starlike mappings on Reinhardt domains. Acta Math Sci, 2013, 33B(6):1627-1638
|
[9] |
Elin M, Levenshtein M. Covering results and perturbed Roper-Suffridge operators. Complex Analysis and Operator Theory, 2014, 8(1):25-36
|
[10] |
Liu H, Xia H C. The generalized Roper-Suffridge operator on Reinhardt domains. Acta Math Sinica, 2016, 59(2):253-266(in Chinese)
|
[11] |
Wang J, Liu T. The Roper-Suffridge extension operator and its applications to convex mappings in $\mathbb{C}^2$. Trans Amer Math Soc, 2018, 370(11):7743-7759
|
[12] |
Pfaltzgraff J A, Suffridge T J. An extension theorem and linear invariant families generated by starlike maps. Ann Univ Mariae Curie-Sklodowska Sect A, 1999, 53:193-207
|
[13] |
Graham I, Kohr G. Geometric Function Theory in One and Higher Dimensions. New York:Marcel Dekker Inc, 2003
|
[14] |
Cai R H, Liu X S. The third and fourth coefficient estimations for the subclasses of strongly spirallike functions, Journal of Zhanjiang Normal College 2010, 31:38-43
|
[15] |
Gao C L. The Generalized Roper-Suffridge Operators on Reinhardt Domains[D]. Jinhua:Zhejiang Normal University, 2012
|
[16] |
Liu X S, Feng S X. A remark on the generalized Roper-Suffridge extension operator for spirallike mappings of type β and order α. Chin Quart J of Math, 2009, 24(2):310-316
|
[17] |
Feng S X, Liu T S, Ren G B. The growth and covering theorems for several mappings on the unit ball in complex Banach spaces. Chin Ann Math, 2007, 28A(2):215-230
|
[18] |
Zhu Y C, Liu M S. The generalized Roper-Suffridge extension operator on Reinhardt domain Dp. Taiwanese J Math, 2010, 14(2):359-372
|
[19] |
Zhao Y. Almost Starlike Mappings of Complex order λ on the Unit Ball of a Complex Banach Space[D]. Jinhua:Zhejiang Normal University, 2013
|
[20] |
Feng S X, Zhang X F, Chen H Y. Parabolic starlike mapping in several complex variables. Acta Math Sin (Chinese Series), 2011, 54(3):467-482
|
[21] |
Suffridge T J. Starlikeness, convexity and other geometric properties of holomorphic maps in higher dimensions. Lecture Notes in Math, 1976, 599:146-159
|
[22] |
Feng S X, Liu X S, Xu Q H. Loewner chains and the generalized Roper-Suffridge extension operator. Acta Mathematica Scientia, 2009, 29A(6):1601-1612
|
[23] |
Liu M S, Zhu Y C. The generalized Roper-Suffridge operator on bounded complete Reinhardt domains. Science in China, 2007, 37A(10):1193-1206
|
[24] |
Gurganus K R. ψ-like holomorphic function in $\mathbb{C}^n$ and Banach spaces. Trans Amer Math Soc, 1975, 205:389-406
|
[25] |
Peng M R. Spirallike Mappings on Bounded Starlike Circular Domains in $\mathbb{C}^n$[D]. Kaifeng:Henan University, 2011
|