More on the $ \mathcal{N}=2 $ superconformal systems of type D p (G)

Abstract: A large family of 4d N = 2 SCFT's was introduced in 1210.2886. Its elements D p (G) are labelled by a positive integer p ∈ N and a simply-laced Lie group G; their flavor symmetry is at least G. In the present paper we study their physics in detail. We also analyze the properties of the theories obtained by gauging the diagonal symmetry of a collection of D p i (G) models. In all cases the computation of the physical quantities reduces to simple Lie-theoretical questions.To make the analysis more functorial, we… Show more

“…JHEP11 (2015)123 which is exactly the SW geometry for D p (SU(n)) [13][14][15]. Proceeding analogously, replacing Z n with Γ a DE subgroup of SU (2), one obtains…”

“…SCFTs which are A, D and E gauge theories where the matter involves gauging three or four copies of D p (G = ADE) [13][14][15] (which are generalizations of D-type Argyres-Douglas theories, which have SU(2) global symmetry, to theories with arbitrary A, D and E global symmetries). Also the N = 2 vacuum geometry for some theories we study is captured by an LG period geometry rather than a curve or a local Calabi-Yau 3-fold.…”

“…The resulting SCFTs were introduced in [15] as generalization of the findings of [60] in the G = SU(2) case. We denote them by (E (1,1) n , G), n = 4, 6, 7, 8.…”

“…These models are examples of the E (1,1) n G systems constructed in [15] where this other notation was used to emphasize that the product is not a standard product in between quivers, because the elliptic quivers have non-trivial potential.…”

“…Coulomb mass marginal Relevant BPS quiver parameter Since these theories all have exactly marginal deformations, we would like to find a weakly coupled gauge theory description: this is precisely how these models have been introduced in [15]. In such S-duality frame these systems have the following form:…”

Geometric engineering, mirror symmetry and 6 d 1 0 → 4 d N = 2 $$ 6{\mathrm{d}}_{\left(1,0\right)}\to 4{\mathrm{d}}_{\left(\mathcal{N}=2\right)} $$

“…JHEP11 (2015)123 which is exactly the SW geometry for D p (SU(n)) [13][14][15]. Proceeding analogously, replacing Z n with Γ a DE subgroup of SU (2), one obtains…”

“…SCFTs which are A, D and E gauge theories where the matter involves gauging three or four copies of D p (G = ADE) [13][14][15] (which are generalizations of D-type Argyres-Douglas theories, which have SU(2) global symmetry, to theories with arbitrary A, D and E global symmetries). Also the N = 2 vacuum geometry for some theories we study is captured by an LG period geometry rather than a curve or a local Calabi-Yau 3-fold.…”

“…The resulting SCFTs were introduced in [15] as generalization of the findings of [60] in the G = SU(2) case. We denote them by (E (1,1) n , G), n = 4, 6, 7, 8.…”

“…These models are examples of the E (1,1) n G systems constructed in [15] where this other notation was used to emphasize that the product is not a standard product in between quivers, because the elliptic quivers have non-trivial potential.…”

“…Coulomb mass marginal Relevant BPS quiver parameter Since these theories all have exactly marginal deformations, we would like to find a weakly coupled gauge theory description: this is precisely how these models have been introduced in [15]. In such S-duality frame these systems have the following form:…”

Geometric engineering, mirror symmetry and 6 d 1 0 → 4 d N = 2 $$ 6{\mathrm{d}}_{\left(1,0\right)}\to 4{\mathrm{d}}_{\left(\mathcal{N}=2\right)} $$

N=2 Supersymmetric Dynamics for Pedestrians

Theories with Other Simple Gauge Groups