Geometric Engineering of N=2 CFT4s based on Indefinite Singularities: Hyperbolic Case

Abstract

Using Katz, Klemm and Vafa geometric engineering method of N=2 supersymmetric QFT4s and results on the classification of generalized Cartan matrices of Kac-Moody (KM) algebras, we study the un-explored class of N=2 CFT4s based on indefinite singularities. We show that the vanishing condition for the general expression of holomorphic beta function of N=2 quiver gauge QFT4s coincides exactly with the fundamental classification theorem of KM algebras. Explicit solutions are derived for mirror geometries of CY threefolds with % hyperbolic singularities.

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