$E_8$ geometry

Martin Cederwall; J. A. Rosabal

$E_8$ geometry

High Energy Physics - Theory 2015-06-02 v3

Authors: Martin Cederwall , J. A. Rosabal

Abstract

We investigate exceptional generalised diffeomorphisms based on $E_{8(8)}$ in a geometric setting. The transformations include gauge transformations for the dual gravity field. The surprising key result, which allows for a development of a tensor formalism, is that it is possible to define field-dependent transformations containing connection, which are covariant. We solve for the spin connection and construct a curvature tensor. A geometry for the Ehlers symmetry SL(n+1) is sketched. Some related issues are discussed.

Keywords

diffeomorphism invariance in gravity supergravity differential geometry in physics

Cite

@article{arxiv.1504.04843,
  title  = {$E_8$ geometry},
  author = {Martin Cederwall and J. A. Rosabal},
  journal= {arXiv preprint arXiv:1504.04843},
  year   = {2015}
}

Comments

plain tex, 24 pp.; v2: refs. added, a sign misprint corrected (eq. 2.7); v3: minor changes, refs. added

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