Large-N limit of non-local 2D generalized Yang-Mills theories on non-orientable surface
arXiv:hep-th/0304068 · doi:10.1142/S0217751X04017707
Abstract
The large-group behavior of the non-local two dimensional generalized Yang-Mills theories (nlgYM$_2$'s) on arbitrary closed non-orientable surfaces is investigated. It is shown that all order of $Ï^{2k}$ model of these theories have thired order phase transition only on projective plane (RP$^2$). Also the phase structure of $Ï^2 + \fracγ{4}Ï^4$ model of nlgYM$_2$ is studied and it is found that for $γ>0$, this model has third order phase transition only on RP$^2$ and for $γ<0$ it has third order phase transition on any closed non-orientable surfaces except RP$^2$ and Klein bottel.
11 pages, no figures, Latex. to be appear in IJMPA