
Essentials of Complex Analysis
Book Details:
- Publisher: Sultan Chand & Sons
- Author: Nagpal Ritika (Dr), Yadav Arvind (Dr)
- Language: English
- Edition: 1st Edition
- ISBN: 9789349290815
- Pages: Not specified
- Weight: 0.00 g
- Title Code: 1305
About the Book:
This book is meticulously designed in alignment with the Undergraduate Curriculum to meet the academic requirements of students pursuing undergraduate mathematics and related disciplines. It strikes a perfect balance between theoretical rigor and practical insights, serving as a self-sufficient guide for mastering Complex Analysis.
The book provides clear and lucid explanations of complex concepts, supported by detailed proofs and illustrative examples. It covers a wide range of topics, from fundamental concepts such as complex numbers, mappings, and transformations to advanced topics like complex integration, conformal mappings, series expansions, singularities, and residues.
A distinctive feature is Chapter 9, “Bridging Theory and Practice: Computational and Visual Analysis,” which introduces Mathematica-based practicals. These hands-on exercises allow students to visualize, simulate, and verify complex analysis concepts through computational experimentation.
Designed for B.Sc. (Hons.) Mathematics, B.Tech., and multidisciplinary courses, the book is also an invaluable resource for competitive examinations. Whether you're a student, educator, or mathematics enthusiast, this book offers a comprehensive journey into Complex Analysis, fostering academic success and a deeper understanding of the subject.
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Description
Book Details:
- Publisher: Sultan Chand & Sons
- Author: Nagpal Ritika (Dr), Yadav Arvind (Dr)
- Language: English
- Edition: 1st Edition
- ISBN: 9789349290815
- Pages: Not specified
- Weight: 0.00 g
- Title Code: 1305
About the Book:
This book is meticulously designed in alignment with the Undergraduate Curriculum to meet the academic requirements of students pursuing undergraduate mathematics and related disciplines. It strikes a perfect balance between theoretical rigor and practical insights, serving as a self-sufficient guide for mastering Complex Analysis.
The book provides clear and lucid explanations of complex concepts, supported by detailed proofs and illustrative examples. It covers a wide range of topics, from fundamental concepts such as complex numbers, mappings, and transformations to advanced topics like complex integration, conformal mappings, series expansions, singularities, and residues.
A distinctive feature is Chapter 9, “Bridging Theory and Practice: Computational and Visual Analysis,” which introduces Mathematica-based practicals. These hands-on exercises allow students to visualize, simulate, and verify complex analysis concepts through computational experimentation.
Designed for B.Sc. (Hons.) Mathematics, B.Tech., and multidisciplinary courses, the book is also an invaluable resource for competitive examinations. Whether you're a student, educator, or mathematics enthusiast, this book offers a comprehensive journey into Complex Analysis, fostering academic success and a deeper understanding of the subject.












