Mutation Symmetries in BPS Quiver Theories: Building the BPS Spectra

Abstract

We study the basic features of BPS quiver mutations in 4D N=2 supersymmetric quantum field theory with G=ADE gauge symmetries.\ We show, for these gauge symmetries, that there is an isotropy group GMutG associated to a set of quiver mutations capturing information about the BPS spectra. In the strong coupling limit, it is shown that BPS chambers correspond to finite and closed groupoid orbits with an isotropy symmetry group GstrongG isomorphic to the discrete dihedral groups Dih2hG contained in Coxeter(G) with % hG the Coxeter number of G. These isotropy symmetries allow to determine the BPS spectrum of the strong coupling chamber; and give another way to count the total number of BPS and anti-BPS states of N=2 gauge theories. We also build the matrix realization of these mutation groups % GstrongG from which we read directly the electric-magnetic charges of the BPS and anti-BPS states of N=2 QFT4 as well as their matrix intersections. We study as well the quiver mutation symmetries in the weak coupling limit and give their links with infinite Coxeter groups. We show amongst others that Gweaksu2 is contained in GL(2,Z) ; and isomorphic to the infinite Coxeter I2∞. Other issues such as building G%weakso4 and Gweaksu3 are also studied.