Singularities of N=1 Supersymmetric Gauge Theory and Matrix Models
arXiv:hep-th/0308001 · doi:10.1088/1126-6708/2003/11/025
Abstract
In N=1 supersymmetric U(N) gauge theory with adjoint matter $Φ$ and polynomial tree-level superpotential $W(Φ)$, the massless fluctuations about each quantum vacuum are generically described by $U(1)^n$ gauge theory for some n. However, by tuning the parameters of $W(Φ)$ to non-generic values, we can reach singular vacua where additional fields become massless. Using both the matrix model prescription and the strong-coupling approach, we study in detail three examples of such singularities: the singularities of the n=1 branch, intersections of n=1 and n=2 branches, and a class of N=1 Argyres-Douglas points. In all three examples, we find that the matrix model description of the low-energy physics breaks down in some way at the singularity.
29 pages, 1 figure. Revised section 1, fixed misprints in section 3.1, added clarifications and references