Home
Add
Get on Google Play
Home
> Edit
Add/Update Thesis
Title*
Author's Name*
Supervisor's Name
Abstract
The core objective of this research is to introduce new classes of analytic functions by using the concept of bounded boundary rotation and some of its generalization. This research heavily depends on the recent techniques of convolution (Hadamard product) and the differential subordination. The Ruscheweyh derivative and Carlson-Shaffer operator are utilized to define certain new classes of analytic functions. We also investigate these classes for certain linear operators such as Jung-Kim-Srivastava operator, generalized Bernardi integral operator, Frasin integral operator and some others. Some geometrical and analytical properties, which include distortion bounds, radius problems, inclusion relation, rate of growth problem and integral representation, are explored systematically. Relevant connections of the results presented here with those obtained in earlier works are pointed out. This research is updated with the advancement and changing trends in the field of Geometric Function Theory and emerging new open problems are added for investigation.
Subject/Specialization
Language
Program
Faculty/Department's Name
Institute Name
Univeristy Type
Public
Private
Campus (if any)
Institute Affiliation Inforamtion (if any)
City where institute is located
Province
Country
Degree Starting Year
Degree Completion Year
Year of Viva Voce Exam
Thesis Completion Year
Thesis Status
Completed
Incomplete
Number of Pages
Urdu Keywords
English Keywords
Link
Select Category
Religious Studies
Social Sciences & Humanities
Science
Technology
Any other inforamtion you want to share such as Table of Contents, Conclusion.
Your email address*