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Theory and Methods of Optimisation / by Andrea Carpignani, Massimo Pappalardo.

Springer Nature - Springer Mathematics and Statistics (R0) eBooks 2026 English International Available online

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Format:
Book
Author/Creator:
Carpignani, Andrea.
Series:
La Matematica per il 3+2, 2038-5757 ; 175
Language:
English
Subjects (All):
Mathematical optimization.
Optimization.
Local Subjects:
Optimization.
Physical Description:
1 online resource (270 pages)
Edition:
1st ed. 2026.
Place of Publication:
Cham : Springer Nature Switzerland : Imprint: Springer, 2026.
Summary:
This book originates from the graduate course Theory and Methods of Optimisation taught at the University of Pisa and is primarily intended for students seeking a rigorous yet accessible introduction to optimisation techniques. While designed with graduate students in mind, the text is largely self-contained and may also be approached by motivated undergraduates with a solid foundation in mathematical analysis, linear algebra, and the basic topology of Euclidean spaces. Key results from differential calculus and topology are recalled throughout, ensuring that the material remains accessible without compromising mathematical depth. Structured in three parts, the text offers a coherent progression from foundational theory to algorithmic methods. The first part provides an introduction to convex analysis; the second covers the theory of linear and nonlinear programming; and the third presents key classical algorithms, including the simplex method and gradient-based techniques. Each chapter builds on previous material, with methods presented in detail, including pseudocode and full convergence proofs. Throughout, the book combines theoretical rigour with applied insight. Every result is proved, and numerous worked examples illustrate the methods in action. This dual emphasis gives the work the character of both a rigorous theoretical text and a practical guide to mathematical optimisation. The book serves both as an introduction and as a comprehensive reference for those interested in applying mathematical models to real-world problems. It will be especially valuable to young researchers in applied mathematics looking to understand the theoretical underpinnings of optimisation methods as well as to those working on the practical implementation of such techniques.
Contents:
Part I. Convex Analysis
Chapter 1. Convex sets
Chapter 2. Convex functions
Part II. Theory of Optimisation
Chapter 3. Introduction to Mathematical Programming
Chapter 4. Linear programming
Chapter 5. Non-linear Programming
Chapter 6. Lagrangian Duality
Part III. Methods of Optimisation
Chapter 7. Algorithms and Their Convergence
Chapter 8. The Simplex Method
Chapter 9. Unconstrained Problems
Chapter 10. Constrained Problems.
Notes:
Description based on publisher supplied metadata and other sources.
ISBN:
3-032-01514-6
9783032015143
OCLC:
1574121467

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