New Fuzzy Extra Dimensions from SU( N) Gauge Theories

Abstract

We start with an SU( N) Yang-Mills theory on a manifold M, suitably coupled to two distinct set of scalar fields in the adjoint representation of SU( N), which are forming a doublet and a triplet, respectively under a global SU(2) symmetry. We show that a direct sum of fuzzy spheres SF2 \, Int := SF2() SF2 () SF2 ( + 12 ) SF2 ( - 12 ) emerges as the vacuum solution after the spontaneous breaking of the gauge symmetry and lay the way for us to interpret the spontaneously broken model as a U(n) gauge theory over M × SF2 \, Int. Focusing on a U(2) gauge theory we present complete parameterizations of the SU(2)-equivariant, scalar, spinor and vector fields characterizing the effective low energy features of this model. Next, we direct our attention to the monopole bundles SF2 \, := SF2 () SF2 ( 12 ) over SF2 () with winding numbers 1, which naturally come forth through certain projections of SF2 \, Int, and discuss the low energy behaviour of the U(2) gauge theory over M × SF2 \, . We study models with k-component multiplet of the global SU(2), give their vacuum solutions and obtain a class of winding number (k-1) monopole bundles SF2 \,, (k-1) as certain projections of these vacuum solutions. We make the observation that SF2 \, Int is indeed the bosonic part of the N=2 fuzzy supersphere with OSP(2,2) supersymmetry and construct the generators of the osp(2,2) Lie superalgebra in two of its irreducible representations using the matrix content of the vacuum solution SF2 \, Int. Finally, we show that our vacuum solutions are stable by demonstrating that they form mixed states with non-zero von Neumann entropy.