Radius properties for subclasses of univalent functions
Само за регистроване кориснике
2005
Чланак у часопису (Објављена верзија)
Метаподаци
Приказ свих података о документуАпстракт
A normalized analytic function It is known that where S denotes the set of all normalized analytic functions that correctly rounded to six decimal places, is the unique root of the equation.
Кључне речи:
coefficient inequality / analytic / univalent / close-to-convex / starlike and convex finctionsИзвор:
Analysis (Germany), 2005, 25, 38412, 183-188Издавач:
- R. Oldenbourg Verlag
Институција/група
Tehnološko-metalurški fakultetTY - JOUR AU - Obradović, Milutin AU - Ponnusamy, Saminathan PY - 2005 UR - http://TechnoRep.tmf.bg.ac.rs/handle/123456789/5476 AB - A normalized analytic function It is known that where S denotes the set of all normalized analytic functions that correctly rounded to six decimal places, is the unique root of the equation. PB - R. Oldenbourg Verlag T2 - Analysis (Germany) T1 - Radius properties for subclasses of univalent functions EP - 188 IS - 38412 SP - 183 VL - 25 DO - 10.1524/anly.2005.25.3.183 ER -
@article{ author = "Obradović, Milutin and Ponnusamy, Saminathan", year = "2005", abstract = "A normalized analytic function It is known that where S denotes the set of all normalized analytic functions that correctly rounded to six decimal places, is the unique root of the equation.", publisher = "R. Oldenbourg Verlag", journal = "Analysis (Germany)", title = "Radius properties for subclasses of univalent functions", pages = "188-183", number = "38412", volume = "25", doi = "10.1524/anly.2005.25.3.183" }
Obradović, M.,& Ponnusamy, S.. (2005). Radius properties for subclasses of univalent functions. in Analysis (Germany) R. Oldenbourg Verlag., 25(38412), 183-188. https://doi.org/10.1524/anly.2005.25.3.183
Obradović M, Ponnusamy S. Radius properties for subclasses of univalent functions. in Analysis (Germany). 2005;25(38412):183-188. doi:10.1524/anly.2005.25.3.183 .
Obradović, Milutin, Ponnusamy, Saminathan, "Radius properties for subclasses of univalent functions" in Analysis (Germany), 25, no. 38412 (2005):183-188, https://doi.org/10.1524/anly.2005.25.3.183 . .