It has been said that: “The final mathematical formulation of M-theory will have to make contact with the theory of vector bundles, K-theory and noncommutative geometry.”
2. Robbert Dijkgraaf. The Mathematics of M-Theory.
3. J. Polchinski, Dirichlet-branes and Ramond-Ramond charges, Phys. Rev. Lett. 75 (1995) 4724-4727,
.
4 J. Polchinski, String Theory (Cambridge Monographs on Mathematical Physics), Cambridge University Press, 1998.
5. G. Segal, The definition of conformal field theory, preprint; Two dimensional conformal field theories and modular functors, in IXth International Conference on Mathematical Physics,. B. Simon, A. Truman and I. M. Davies Eds. (Adam Hilger, Bristol,1989).
6. N. Seiberg and E. Witten, String theory and noncommutative geometry, JHEP 9909(1999) 032,
.
7. A. Sen and B. Zwiebach, Tachyon condensation in string field theory, JHEP 0003 (2000) 002,
.
8. Contributed Book, Edited by bci1. M-theory and Supergravity. 372pp, 56Mb ODT doc; 16Mb PDF, April 7, 2010.
9. E. Witten, String theory in various dimensions, Nucl. Phys. B 443 (1995) 85,
.
10. E. Witten, Bound states of strings and p-branes, Nucl. Phys. B460 (1996) 335,
.
11. E. Witten, D-branes and K-theory, JHEP 9812 (1998) 019,
.
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