Mirror Duality via G2 and Spin(7) Manifolds

Abstract

The main purpose of this paper is to give a mathematical definition of ``mirror symmetry'' for Calabi-Yau and G2 manifolds. More specifically, we explain how to assign a G2 manifold (M,φ,), with the calibration 3-form φ and an oriented 2-plane field , a pair of parametrized tangent bundle valued 2 and 3-forms of M. These forms can then be used to define various different complex and symplectic structures on certain 6-dimensional subbundles of T(M). When these bundles are integrated they give mirror CY manifolds. In a similar way, one can define mirror dual G2 manifolds inside of a Spin(7) manifold (N8, ). In case N8 admits an oriented 3-plane field, by iterating this process we obtain Calabi-Yau submanifold pairs in N whose complex and symplectic structures determine each other via the calibration form of the ambient G2 (or Spin(7)) manifold.

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