"Number theory and physics"의 두 판 사이의 차이
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| 9번째 줄: | 9번째 줄: | ||
* On p-adic and Adelic generalization of quantum field theory<br> | * On p-adic and Adelic generalization of quantum field theory<br> | ||
** Branko Dragovich | ** Branko Dragovich | ||
| + | * Low-dimensional Topology and Number Theory<br> Arriving Sunday, October 21 and departing Friday, October 26, 2007 | ||
| + | |||
| + | http://www.birs.ca/birspages.php?task=displayevent&event_id=07w5052 | ||
2009년 10월 5일 (월) 17:45 판
- ANALOGIES BETWEEN KNOTS AND PRIMES, 3-MANIFOLDS AND NUMBER RINGs
- Masanori Morishita
- A general approach to quantum fields and strings on adeles
- Bernard David Barkan Roth
- The Weil proof and the geometry of the adeles class space
- Alain Connes (College de France), Caterina Consani (Johns Hopkins), Matilde Marcolli (MPI Bonn)
- Quantum field theory, Grassmannians, and algebraic curves
- Edward Witten
- On p-adic and Adelic generalization of quantum field theory
- Branko Dragovich
- Low-dimensional Topology and Number Theory
Arriving Sunday, October 21 and departing Friday, October 26, 2007
http://www.birs.ca/birspages.php?task=displayevent&event_id=07w5052
Number theory and statistical mechanics
From number theory to statistical mechanics: Bose-Einstein condensation in isolated traps
Authors: Siegfried Grossmann, Martin Holthaus
Number theory, dynamical systems and statistical mechanics.
Andreas Knauf