Table of contents
About this book
This book collects various perspectives, contributed by both mathematicians and physicists, on the B-model and its role in mirror symmetry. Mirror symmetry is an active topic of research in both the mathematics and physics communities, but among mathematicians, the “A-model” half of the story remains much better-understood than the B-model. This book aims to address that imbalance.
It begins with an overview of several methods by which mirrors have been constructed, and from there, gives a thorough account of the “BCOV” B-model theory from a physical perspective; this includes the appearance of such phenomena as the holomorphic anomaly equation and connections to number theory via modularity. Following a mathematical exposition of the subject of quantization, the remainder of the book is devoted to the B-model from a mathematician’s point-of-view, including such topics as polyvector fields and primitive forms, Givental’s ancestor potential, and integrable systems.
mirror symmetry quantization singularity theory integrable systems holomorphic anomaly equation modularity polyvector fields primitive forms Givental’s ancestor potential
Editors and affiliations
- Book Title B-Model Gromov-Witten Theory
- Series Title Trends in Mathematics
- Series Abbreviated Title Trends in Math.
- DOI https://doi.org/10.1007/978-3-319-94220-9
- Copyright Information Springer Nature Switzerland AG 2018
- Publisher Name Birkhäuser, Cham
- eBook Packages Mathematics and Statistics Mathematics and Statistics (R0)
- Hardcover ISBN 978-3-319-94219-3
- eBook ISBN 978-3-319-94220-9
- Series ISSN 2297-0215
- Series E-ISSN 2297-024X
- Edition Number 1
- Number of Pages XIII, 625
- Number of Illustrations 59 b/w illustrations, 6 illustrations in colour
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