Want to take part in these discussions? Sign in if you have an account, or apply for one below
Vanilla 1.1.10 is a product of Lussumo. More Information: Documentation, Community Support.
I have expanded the Idea-section at AGT correspondence, saying more explicitly how this may be thought of as regarding the 6d (2,0)-theory as a “2d SCFT with values in 4d SYM theories” and added pointers to further references (including some reviews).
I have similarly expanded/added brief remarks on AGT/generalized S-duality pointing to this at 6d (2,0)-SCFT – Compactification on Riemann surface and at S-duality – for SYM – From compactification
added references relating to the 3d-3d correspondence:
Clay Cordova, Daniel Jafferis, Toda Theory From Six Dimensions, J. High Energ. Phys. (2017) 2017: 106 (arxiv:1605.03997)
Sam van Leuven, Gerben Oling, Generalized Toda Theory from Six Dimensions and the Conifold, J. High Energ. Phys. (2017) 2017: 50 (arxiv:1708.07840)
added pointer to today’s
added these pointers:
Andrei Mironov, Andrey Morozov, Sh. Shakirov, A direct proof of AGT conjecture at , JHEP 1102:067 (2011) [arXiv:1012.3137, doi:10.1007/JHEP02(2011)067]
Qing-Jie Yuan, Shao-Ping Hu, Zi-Hao Huang, Kilar Zhang, A proof of An AGT conjecture at [arXiv:2305.11839]
1 to 6 of 6