A Second Course in Topos Quantum Theory (Lecture Notes in Physics, 944) by Cecilia Flori (PDF)

8

 

Ebook Info

  • Published: 2018
  • Number of pages: 356 pages
  • Format: PDF
  • File Size: 10.72 MB
  • Authors: Cecilia Flori

Description

This advanced course, a sequel to the first volume of this lecture series on topos quantum theory, delves deeper into the theory, addressing further technical aspects and recent advances. These include, but are not limited to, the development of physical quantities and self-adjoint operators; insights into the quantization process; the description of an alternative, covariant version of topos quantum theory; and last but not least, the development of a new concept of spacetime. The book builds on the concepts introduced in the first volume (published as Lect. Notes Phys. 868), which presents the main building blocks of the theory and how it could provide solutions to interpretational problems in quantum theory, such as: What are the main conceptual issues in quantum theory? And how can these issues be solved within a new theoretical framework of quantum theory? These two volumes together provide a complete, basic course on topos quantum theory, offering a set of mathematical tools to readers interested in tackling fundamental issues in quantum theory in general, and in quantum gravity in particular. From the reviews of the first volume: The book is self-contained and can be used as a textbook or self-study manual teaching the usage of category theory and topos theory, in particular in theoretical physics or in investigating the foundations of quantum theory in mathematically rigorous terms. [The] book is a very welcome contribution. Frank Antonsen, Mathematical Reviews, December, 2013

User’s Reviews

Editorial Reviews: From the Back Cover This advanced course, a sequel to the first volume of this lecture series on topos quantum theory, delves deeper into the theory, addressing further technical aspects and recent advances. These include, but are not limited to, the development of physical quantities and self-adjoint operators; insights into the quantization process; the description of an alternative, covariant version of topos quantum theory; and last but not least, the development of a new concept of spacetime. The book builds on the concepts introduced in the first volume (published as Lect. Notes Phys. 868), which presents the main building blocks of the theory and how it could provide solutions to interpretational problems in quantum theory, such as: What are the main conceptual issues in quantum theory? And how can these issues be solved within a new theoretical framework of quantum theory? These two volumes together provide a complete, basic course on topos quantum theory, offering a set of mathematical tools to readers interested in tackling fundamental issues in quantum theory in general, and in quantum gravity in particular. From the reviews of the first volume: The book is self-contained and can be used as a textbook or self-study manual teaching the usage of category theory and topos theory, in particular in theoretical physics or in investigating the foundations of quantum theory in mathematically rigorous terms. [The] book is a very welcome contribution. Frank Antonsen, Mathematical Reviews, December, 2013 About the Author

Keywords

Free Download A Second Course in Topos Quantum Theory (Lecture Notes in Physics, 944) in PDF format
A Second Course in Topos Quantum Theory (Lecture Notes in Physics, 944) PDF Free Download
Download A Second Course in Topos Quantum Theory (Lecture Notes in Physics, 944) 2018 PDF Free
A Second Course in Topos Quantum Theory (Lecture Notes in Physics, 944) 2018 PDF Free Download
Download A Second Course in Topos Quantum Theory (Lecture Notes in Physics, 944) PDF
Free Download Ebook A Second Course in Topos Quantum Theory (Lecture Notes in Physics, 944)

Previous articleGroup Theory in Physics 1st Edition by Wu-Ki Tung (PDF)
Next articleExercises and Problems in Mathematical Methods of Physics (Undergraduate Lecture Notes in Physics) 2nd Edition by Giampaolo Cicogna (PDF)