On a subclass of tilted starlike functions with respect to conjugate points / Nur Hazwani Aqilah Abdul Wahid

This thesis is concerned with the function / defined on an open unit disk E = {z : |z| < l} of the complex plane. Let As be the class o f analytic functions defined on E which is normalized and has the Taylor series representation of the form oe f ( z ) = z + a2z 2 + ciyZ* H----- b anz" 4— =...

Full description

Saved in:
Bibliographic Details
Main Author: Abdul Wahid, Nur Hazwani Aqilah
Format: Thesis
Language:English
Published: 2015
Subjects:
Online Access:https://ir.uitm.edu.my/id/eprint/15892/1/TM_NUR%20HAZWANI%20AQILAH%20ABDUL%20WAHID%20CS%2015_5.PDF
https://ir.uitm.edu.my/id/eprint/15892/
Tags: Add Tag
No Tags, Be the first to tag this record!
id my.uitm.ir.15892
record_format eprints
spelling my.uitm.ir.158922022-03-10T01:51:40Z https://ir.uitm.edu.my/id/eprint/15892/ On a subclass of tilted starlike functions with respect to conjugate points / Nur Hazwani Aqilah Abdul Wahid Abdul Wahid, Nur Hazwani Aqilah Elementary mathematics. Arithmetic Analytical methods used in the solution of physical problems This thesis is concerned with the function / defined on an open unit disk E = {z : |z| < l} of the complex plane. Let As be the class o f analytic functions defined on E which is normalized and has the Taylor series representation of the form oe f ( z ) = z + a2z 2 + ciyZ* H----- b anz" 4— = z + ^ anz ". Let H be the class of functions 11=2 co which are analytic and univalent in E of the form co(z)=txz + t2z 2 h— + tnz" h— = ^ t nz". We define the class S ’(a ,S ,A ,B ) for «= 1 which functions in the class S ' (a, S, A,B) satisfy the condition f ia zf'(z) . . ^ 1 1 + Aco(z) /x /(z)+ f(z ) e .— 8 - 1 sin a -----= ---------- 7- - , cog H where g\z) - - — and V J L , 1 + Bco(z) 2 I I 71 tm = c o s a - S with |ar| < —, cos« > <*>, 0 < S < 1 and - \< B < A < \ . Some of the basic properties are obtained for the class S '(a ,S ,A , B) such as distortion theorem, z f ' ( z ) growth theorem, argument of -—7—^. and coefficient bounds. The upper and lower g{z ) zf'(z) z f ' i2) bounds of Re—— and Im ■: .r~ for functions in the class S (a,S ,A,B) are also g \z ) g\z) given. This thesis also discusses on the radius problems which are the radius of convexity and the radius of starlikeness for the defined class. Lastly, the coefficient inequalities problems which are the upper bounds for the Second Hankel determinant a2aA- a ^ | and Fekete-Szego functional a3 - /w , 2 are determined for functions in the class S ’(a,S,A, B). Also included the coefficient determinant with Fekete-Szego parameter which is la,a, - f i a \ 2015 Thesis NonPeerReviewed text en https://ir.uitm.edu.my/id/eprint/15892/1/TM_NUR%20HAZWANI%20AQILAH%20ABDUL%20WAHID%20CS%2015_5.PDF ID15892 Abdul Wahid, Nur Hazwani Aqilah (2015) On a subclass of tilted starlike functions with respect to conjugate points / Nur Hazwani Aqilah Abdul Wahid. Masters thesis, thesis, Universiti Teknologi MARA.
institution Universiti Teknologi Mara
building Tun Abdul Razak Library
collection Institutional Repository
continent Asia
country Malaysia
content_provider Universiti Teknologi Mara
content_source UiTM Institutional Repository
url_provider http://ir.uitm.edu.my/
language English
topic Elementary mathematics. Arithmetic
Analytical methods used in the solution of physical problems
spellingShingle Elementary mathematics. Arithmetic
Analytical methods used in the solution of physical problems
Abdul Wahid, Nur Hazwani Aqilah
On a subclass of tilted starlike functions with respect to conjugate points / Nur Hazwani Aqilah Abdul Wahid
description This thesis is concerned with the function / defined on an open unit disk E = {z : |z| < l} of the complex plane. Let As be the class o f analytic functions defined on E which is normalized and has the Taylor series representation of the form oe f ( z ) = z + a2z 2 + ciyZ* H----- b anz" 4— = z + ^ anz ". Let H be the class of functions 11=2 co which are analytic and univalent in E of the form co(z)=txz + t2z 2 h— + tnz" h— = ^ t nz". We define the class S ’(a ,S ,A ,B ) for «= 1 which functions in the class S ' (a, S, A,B) satisfy the condition f ia zf'(z) . . ^ 1 1 + Aco(z) /x /(z)+ f(z ) e .— 8 - 1 sin a -----= ---------- 7- - , cog H where g\z) - - — and V J L , 1 + Bco(z) 2 I I 71 tm = c o s a - S with |ar| < —, cos« > <*>, 0 < S < 1 and - \< B < A < \ . Some of the basic properties are obtained for the class S '(a ,S ,A , B) such as distortion theorem, z f ' ( z ) growth theorem, argument of -—7—^. and coefficient bounds. The upper and lower g{z ) zf'(z) z f ' i2) bounds of Re—— and Im ■: .r~ for functions in the class S (a,S ,A,B) are also g \z ) g\z) given. This thesis also discusses on the radius problems which are the radius of convexity and the radius of starlikeness for the defined class. Lastly, the coefficient inequalities problems which are the upper bounds for the Second Hankel determinant a2aA- a ^ | and Fekete-Szego functional a3 - /w , 2 are determined for functions in the class S ’(a,S,A, B). Also included the coefficient determinant with Fekete-Szego parameter which is la,a, - f i a \
format Thesis
author Abdul Wahid, Nur Hazwani Aqilah
author_facet Abdul Wahid, Nur Hazwani Aqilah
author_sort Abdul Wahid, Nur Hazwani Aqilah
title On a subclass of tilted starlike functions with respect to conjugate points / Nur Hazwani Aqilah Abdul Wahid
title_short On a subclass of tilted starlike functions with respect to conjugate points / Nur Hazwani Aqilah Abdul Wahid
title_full On a subclass of tilted starlike functions with respect to conjugate points / Nur Hazwani Aqilah Abdul Wahid
title_fullStr On a subclass of tilted starlike functions with respect to conjugate points / Nur Hazwani Aqilah Abdul Wahid
title_full_unstemmed On a subclass of tilted starlike functions with respect to conjugate points / Nur Hazwani Aqilah Abdul Wahid
title_sort on a subclass of tilted starlike functions with respect to conjugate points / nur hazwani aqilah abdul wahid
publishDate 2015
url https://ir.uitm.edu.my/id/eprint/15892/1/TM_NUR%20HAZWANI%20AQILAH%20ABDUL%20WAHID%20CS%2015_5.PDF
https://ir.uitm.edu.my/id/eprint/15892/
_version_ 1728054723974529024
score 13.214268