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Mathematica Bohemica, Vol. 144, No. 2, pp. 191-202, 2019

Some properties of certain subclasses of bounded Mocanu variation with respect to $2k$-symmetric conjugate points

Rasoul Aghalary, Jafar Kazemzadeh

Received December 18, 2017.   Published online September 4, 2018.
Abstract:  We introduce subclasses of analytic functions of bounded radius rotation, bounded boundary rotation and bounded Mocanu variation with respect to $2k$-symmetric conjugate points and study some of its basic properties.
Keywords:  $2k$-symmetric conjuqate points; bounded Mocanu variation; bounded radius rotation; bounded boundary rotation
Classification MSC:  30C45, 30C80
DOI:  10.21136/MB.2018.0141-17
PDF available at:  Institute of Mathematics CAS   Digital Mathematics Library
References:
[1] P. Eenigenberg, S. S. Miller, P. T. Mocanu, M. O. Reade: On a Briot-Bouquet differential subordination. General Inequalities 3 (E. F. Beckenbach et al., eds.). International Series of Numerical Mathematics 64. Birkhäuser, Basel (1983), 339-348. DOI 10.1007/978-3-0348-6290-5_26 | MR 0785788 | Zbl 0527.30008
[2] I. Graham, G. Kohr: Geometric Function Theory in One and Higher Dimensions. Pure and Applied Mathematics 255. Marcel Dekker, New York (2003). DOI 10.1201/9780203911624 | MR 2017933 | Zbl 1042.30001
[3] S. S. Miller, P. T. Mocanu: Differential Subordinations: Theory and Applications. Pure and Applied Mathematics 225. Marcel Dekker, New York (2000). DOI 10.1201/9781482289817 | MR 1760285 | Zbl 0954.34003
[4] K. I. Noor: On subclasses of close-to-convex functions of higher order. Int. J. Math. Math. Sci. 15 (1992), 279-289. DOI 10.1155/S016117129200036X | MR 1155521 | Zbl 0758.30010
[5] K. S. Padmanabhan, R. Parvatham: Properties of a class of functions with bounded boundary rotation. Ann. Pol. Math. 31 (1976), 311-323. DOI 10.4064/ap-31-3-311-323 | MR 0390199 | Zbl 0337.30009
[6] B. Pinchuk: Functions with bounded boundary rotation. Isr. J. Math. 10 (1971), 6-16. DOI 10.1007/BF02771515 | MR 0301180 | Zbl 0224.30024
[7] K. Sakaguchi: On a certain univalent mapping. J. Math. Soc. Japan. 11 (1959), 72-75. DOI 10.2969/jmsj/01110072 | MR 0107005 | Zbl 0085.29602
[8] Z.-G. Wang, C.-Y. Gao: On starlike and convex functions with respect to $2k$-symmetric conjugate points. Tamsui Oxf. J. Math. Sci. 24 (2008), 277-287. MR 2456132 | Zbl 1343.30014
[9] Z.-G. Wang, C.-Y. Gao, S.-M. Yuan: On certain subclasses of close-to-convex and quasi-convex functions with respect to $k$-symmetric points. J. Math. Anal. Appl. 322 (2006), 97-106. DOI 10.1016/j.jmaa.2005.08.060 | MR 2238151 | Zbl 1102.30015
Affiliations:   Rasoul Aghalary, Jafar Kazemzadeh, Department of Mathematics, Faculty of Sciences, Urmia University, 11km SERO Road, Urmia City 5756151818, Iran, e-mail: raghalary@yahoo.com, r.aghalary@urmia.ac.ir, j.kazemzadeh@urmia.ac.ir
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