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Differential Geometry and Physics - Proceedings of the 23th International Conference of Differential Geometric Methods in Theoretical Physics
Contributor(s): Zhang, Weiping (Editor), Ge, Mo-Lin (Editor)
ISBN: 9812703772     ISBN-13: 9789812703774
Publisher: World Scientific Publishing Company
OUR PRICE:   $186.20  
Product Type: Hardcover
Published: December 2006
Qty:
Temporarily out of stock - Will ship within 2 to 5 weeks
Annotation: This volumes provides an comprehensive review of interactions between differential geometry and theoretical physics, contributed by many leading scholars in these fields. The contributions promise to play an important role in promoting the developments in these exciting areas. Besides the plenary talks, the coverage includes: models and related topics in statistical physics; quantum fields, strings and M-theory; Yang-Mills fields, knot theory and related topics; K-theory, including index theory and non-commutative geometry; mirror symmetry, conformal and topological quantum field theory; development of integrable systems; and random matrix theory.
Additional Information
BISAC Categories:
- Mathematics | Geometry - Differential
- Science | Physics - Mathematical & Computational
Dewey: 516.36
LCCN: 2007278658
Series: Nankai Tracts in Mathematics (Hardcover)
Physical Information: 1.3" H x 6.52" W x 9.23" (1.97 lbs) 540 pages
 
Descriptions, Reviews, Etc.
Publisher Description:
This volumes provides a comprehensive review of interactions between differential geometry and theoretical physics, contributed by many leading scholars in these fields. The contributions promise to play an important role in promoting the developments in these exciting areas. Besides the plenary talks, the coverage includes: models and related topics in statistical physics; quantum fields, strings and M-theory; Yang-Mills fields, knot theory and related topics; K-theory, including index theory and non-commutative geometry; mirror symmetry, conformal and topological quantum field theory; development of integrable systems; and random matrix theory.