Partial Breaking in Rigid Limit of N=2 Gauged Supergravity

Abstract

Using a new manner to rescale fields in N=2 gauged supergravity with nV vector multiplets and nH hypermultiplets, we develop the explicit derivation of the rigid limit of quaternionic isometry Ward identities agreeing with known results. We show that the rigid limit can be achieved, amongst others, by performing two successive transformations on the covariantly holomorphic sections VM( z,z) of the special Kahler manifold: a particular symplectic change followed by a particular Kahler transformation. We also give a geometric interpretation of the ηi parameters used in arXiv:1508.01474 to deal with the expansion of the holomorphic prepotential F( z) of the N=2 theory. We give as well a D- brane realisation of gauged quaternionic isometries and an interpretation of the embedding tensor Mu in terms of type IIA/IIB mirror symmetry. Moreover, we construct explicit metrics for a new family of 4r- dimensional quaternionic manifolds MQK( nH) classified by ADE Lie algebras generalising the SO( 1,4) /SO( 4) geometry which corresponds to A1 su( 2) . The conditions of the partial breaking of N=2 supersymmetry in the rigid limit are also derived for both the observable and the hidden sectors. Other features are also studied.