Spontaneous $$ \mathcal{N} $$ = 2 → $$ \mathcal{N} $$ = 1 supersymmetry breaking in supergravity and type II string theory

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We study holographic renormalization group flows from four-dimensional N = 2 SCFTs to either N = 2 or N = 1 SCFTs. Our approach is based on the framework of five-dimensional half-maximal supergravity with general gauging, which we use to study domain wall solutions interpolating between different supersymmetric AdS 5 vacua. We show that a holographic RG flow connecting two N = 2 SCFTs is only possible if the flavor symmetry of the UV theory admits an SO(3) subgroup. In this case the ratio of the IR and UV central charges satisfies a universal relation which we also establish in field theory. In addition we provide several general examples of holographic flows from N = 2 to N = 1 SCFTs and relate the ratio of the UV and IR central charges to the conformal dimension of the operator triggering the flow. Instrumental to our analysis is a derivation of the general conditions for AdS vacua preserving eight supercharges as well as for domain wall solutions preserving eight Poincaré supercharges in half-maximal supergravity.

Section: Jhep06(2018)086mentioning

confidence: 99%

“…Here we provide their complete characterization (when ξ M = 0), which to the best of our knowledge has not appeared in the literature before. 4 Starting from the gravitino shift matrix P defined in (2.15), we introduce the superpotential W = 2 P mn P mn . (3.27)…”

Section: Conditions For Flows With Eight Poincaré Superchargesmentioning

confidence: 99%

Holographic RG flows for four-dimensional $$ \mathcal{N}=2 $$ SCFTs

Bobev

Triendl

2018

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“…It was indeed shown in [15] that partial supersymmetry breaking can be achieved in any symplectic frame (and in particular in one in which the prepotential does exist) using an embedding tensor [16][17][18] with both electric and magnetic components. Consistency of such gaugings requires the introduction of antisymmetric tensor fields dual to scalars [10][11][12][13][14].…”

Section: Jhep11(2015)061mentioning

confidence: 99%

“…In the latter case, the gauging should involve abelian generators in the universal Heisenberg algebra of isometries of these manifolds [15,[49][50][51].…”

Section: Jhep11(2015)061mentioning

confidence: 99%

Observations on BI from N = 2 $$ \mathcal{N}=2 $$ supergravity and the general Ward identity

Andrianopoli

Concha

D’Auria

et al. 2015

The multi-vector generalization of a rigid, partially-broken N = 2 supersymmetric theory is presented as a rigid limit of a suitable gauged N = 2 supergravity with electric, magnetic charges and antisymmetric tensor fields. This on the one hand generalizes a known result by Ferrara, Girardello and Porrati while on the other hand allows to recover the multi-vector BI models of [4] from N = 2 supergravity as the end-point of a hierarchical limit in which the Planck mass first and then the supersymmetry breaking scale are sent to infinity. We define, in the parent supergravity model, a new symplectic frame in which, in the rigid limit, manifest symplectic invariance is preserved and the electric and magnetic Fayet-Iliopoulos terms are fully originated from the dyonic components of the embedding tensor. The supergravity origin of several features of the resulting rigid supersymmetric theory are then elucidated, such as the presence of a traceless SU(2)-Lie algebra term in the Ward identity and the existence of a central charge in the supersymmetry algebra which manifests itself as a harmless gauge transformation on the gauge vectors of the rigid theory; we show that this effect can be interpreted as a kind of "superspace non-locality" which does not affect the rigid theory on space-time. To set the stage of our analysis we take the opportunity in this paper to provide and prove the relevant identities of the most general dyonic gauging of Special-Kaehler and Quaternionic-Kaehler isometries in a generic N = 2 model, which include the supersymmetry Ward identity, in a fully symplectic-covariant formalism.

“…16 For an N = 4 Minkowski vacuum, we need both K and the J a to be closed, and we find that the manifold is K3 × T 2 . If we want to have at least an N = 2 supersymmetric vacuum, the discussion is rather similar to N = 2 → N = 1 supersymmetry breaking as discussed in [31]. A requirement for an N = 2 Minkowski vacuum therefore is that A ij 1 , given in (B.16), should be of rank one.…”

Section: Jhep04(2013)058mentioning

confidence: 99%

Enhanced supersymmetry from vanishing Euler number

Kashani-Poor

Minasian

Triendl

2013

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We argue that compactifications on Calabi-Yau threefolds with vanishing Euler number yield effective four dimensional theories exhibiting (spontaneously broken) N = 4 supersymmetry. To this end, we derive the low-energy effective action for general SU(2) structure manifolds in type IIA string theory and show its consistency with gauged N = 4 supergravity. Focusing on the special case of Calabi-Yau manifolds with vanishing Euler number, we explain the absence of perturbative corrections at the two-derivative level. In addition, we conjecture that all non-perturbative corrections are governed and constrained by the couplings of N = 4 massive gravitino multiplets.