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This book introduces foundational topics such as group theory, fields, linear algebra, matrix theory, and graph theory, providing readers with the essential background needed to understand Feynman diagrams and their integral representations.
The book highlights Feynman's parametrization as a central tool for studying Feynman integrals, starting with the traditional momentum representation. Schwinger and Lee-Pomeransky parametrizations are covered in a supplementary chapter. Readers will develop a clear understanding of the mathematical properties and practical applications of these techniques, with a particular emphasis on Feynman's approach. Advanced topics such as integration-by-parts identities and intersection number theory are explored in the final chapter, offering readers a gateway to key mathematical structures.
The prerequisites are minimal-only a basic familiarity with algebra and calculus is recommended. The content begins with introductory concepts and gradually progresses to more advanced material, ensuring a balanced learning curve. Practical examples throughout the book reinforce the main ideas, allowing readers to apply what they've learned and deepen their understanding as they move through the material.
List of contents
Introduction: what are Feynman Integrals?.- Algebraic Preliminaries.- Graph Theory 101.- Graph Theory 102.- Feynman Integrals in Schwinger-Feynman-Lee-Pomeransky Representations.- Advanced Topics.- Appendices.- Index.
About the author
Ray D. Sameshima earned his Ph.D. in Physics from the Graduate School and University Center of CUNY in 2019, following an M.A. from the City University of New York (CUNY) and a B.S. from Kyoto University. His research focuses on the mathematical structures of Feynman integrals, exploring their algebraic, geometrical, and topological properties. Dr. Sameshima is currently an Adjunct Professor at the New York City College of Technology (CUNY) and the New York Institute of Technology (NYIT).
Summary
This book introduces foundational topics such as group theory, fields, linear algebra, matrix theory, and graph theory, providing readers with the essential background needed to understand Feynman diagrams and their integral representations.
The book highlights Feynman's parametrization as a central tool for studying Feynman integrals, starting with the traditional momentum representation. Schwinger and Lee-Pomeransky parametrizations are covered in a supplementary chapter. Readers will develop a clear understanding of the mathematical properties and practical applications of these techniques, with a particular emphasis on Feynman’s approach. Advanced topics such as integration-by-parts identities and intersection number theory are explored in the final chapter, offering readers a gateway to key mathematical structures.
The prerequisites are minimal—only a basic familiarity with algebra and calculus is recommended. The content begins with introductory concepts and gradually progresses to more advanced material, ensuring a balanced learning curve. Practical examples throughout the book reinforce the main ideas, allowing readers to apply what they’ve learned and deepen their understanding as they move through the material.
