Symplectic Majorana Spinors in 5 Dimension

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Discussion Overview

The discussion centers on the advantages of Symplectic Majorana spinors in 5 dimensions compared to Dirac spinors, particularly in the context of their properties and applications in theoretical physics, including supergravity.

Discussion Character

  • Exploratory, Technical explanation, Debate/contested

Main Points Raised

  • One participant inquires about potential advantages of Symplectic Majorana spinors over Dirac spinors, specifically regarding symmetry and ease of use.
  • Another participant suggests checking a specific arXiv paper for more information on the topic.
  • A participant notes that Majorana spinors cannot be defined in 5 dimensions, but Symplectic Majorana spinors can be, and highlights their significance in supergravity.
  • It is mentioned that while there are no Majorana representations in 5 dimensions, pairs of complex Symplectic Majorana spinors can be combined into a Dirac spinor, which may complicate the construction of five-dimensional supergravities.

Areas of Agreement / Disagreement

Participants express differing views on the implications of using Symplectic Majorana spinors versus Dirac spinors, indicating that the discussion remains unresolved with multiple competing perspectives.

Contextual Notes

There are references to specific literature that may provide further insights, but access to some materials is limited, which could affect the completeness of the discussion.

Francisca Ramirez
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I need to know if the Symplectic Majorana spinors in 5 dimension have any advantage with respect to the Dirac spinors in 5 dimension, since they have the same number of components. For example if the Symplectic Majorana spinors have a manifested symmetry that the Dirac spinors don't have, or if it's more easy to work with the Symplectic Majorana spinors.
 
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No, i have not see it. I am going to check it.
Thank you!
 
Well, just a small hint: they got their name from a certain symm. property :P

Especially in supergravity, where chirality often is not that important, we like Majorana spinors. In 2,3 and 4 dimensions we can define them, but in 5 dimensions we can't. But we can go the the next best thing: symplectic Majorana. Van Proeyen explains how and why.
 
Tomas Ortin, in appendix D of "Gravity and Strings" (SECOND edition), says
There are no Majorana representations in d = 5, but only pairs of (complex) symplectic-Majorana spinors that can be combined into a single unconstrained Dirac spinor. Doing this, however, hides this structure and makes it more difficult (or impossible) to construct five-dimensional supergravities with the most general couplings. We will show how to deal with these spinors...
but in Australia, Google's preview is limited and doesn't let me see the actual argument.
 
Thank you very mach!
 

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