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Deformations in G_2 Manifolds

Geometric Topology 2007-05-23 v1 Differential Geometry

Abstract

Here we study the deformations of associative submanifolds inside a G_2 manifold M^7 with a calibration 3-form \phi. A choice of 2-plane field \Lambda on M (which always exits) splits the tangent bundle of M as a direct sum of a 3-dimensional associate bundle and a complex 4-plane bundle TM= E\oplus V, and this helps us to relate the deformations to Seiberg-Witten type equations. Here all the surveyed results as well as the new ones about G_2 manifolds are proved by using only the cross product operation (equivalently \phi). We feel that mixing various different local identifications of the rich G_2 geometry (e.g. cross product, representation theory and the algebra of octonions) makes the study of G_2 manifolds looks harder then it is (e.g. the proof of McLean's theorem \cite{m}). We believe the approach here makes things easier and keeps the presentation elementary. This paper is essentially self contained.

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Cite

@article{arxiv.math/0701790,
  title  = {Deformations in G_2 Manifolds},
  author = {Selman Akbulut and Sema Salur},
  journal= {arXiv preprint arXiv:math/0701790},
  year   = {2007}
}

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13 pages