true
articles
We define and study a new class of 4d superconformal quiver gauge theories associated with a planar bipartite network. While UV description is not unique due to Seiberg duality, we can classify the IR fixed points of the theory by a permutation, or equivalently a cell of the totally non-negative Grassmannian. The story is similar to a bipartite network on the torus classified by a Newton polygon. We then generalize the network to a general bordered Riemann surface and define IR SCFT from the geometric data of a Riemann surface. We also comment on IR R-charges and superconformal indices of our theories.
2012-09-01
http://link.springer.com/10.1007/JHEP09(2012)036
Network and Seiberg duality
2012-09
en
36
https://scigraph.springernature.com/explorer/license/
research_article
2019-04-10T14:04
Xie
Dan
Institute for Advanced Study
Institute for Advanced Study, 08540, Princeton, NJ, U.S.A.
Mathematical Sciences
10.1007/jhep09(2012)036
doi
Pure Mathematics
Springer Nature - SN SciGraph project
Masahito
Yamazaki
2012
1029-8479
1126-6708
Journal of High Energy Physics
readcube_id
b85bce430cc6ef5ac2a0cd178681953fc80889814f0f2a71868da02ff50ec59b
9
pub.1038701666
dimensions_id
Princeton Center for Theoretical Science, Princeton University, 08544, Princeton, NJ, U.S.A.
Princeton University