Manifolds of G2 Holonomy from N=4 Sigma Model

Abstract

Using two dimensional (2D) N=4 sigma model, with U(1)r gauge symmetry, and introducing the ADE Cartan matrices as gauge matrix charges, we build " toric" hyper-Kahler eight real dimensional manifolds X8. Dividing by one toric geometry circle action of X8 manifolds, we present examples describing quotients X7=X8 U(1) of G2 holonomy. In particular, for the Ar Cartan matrix, the quotient space is a cone on a S2 bundle over r intersecting WCP2(1,2,1) projective spaces according to the Ar Dynkin diagram.

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