Physics:Adinkra symbols
In supergravity and supersymmetric representation theory, Adinkra symbols are a graphical representation of supersymmetric algebras.[1][2][3][4][5] Mathematically they can be described as colored finite connected simple graphs, that are bipartite and n-regular.[6] Their name is derived from Adinkra symbols of the same name, and they were introduced by Michael Faux and Sylvester James Gates in 2004.[1]
Overview
One approach to the representation theory of super Lie algebras is to restrict attention to representations in one space-time dimension and having [math]\displaystyle{ N }[/math] supersymmetry generators, i.e., to [math]\displaystyle{ (1|N) }[/math] superalgebras. In that case, the defining algebraic relationship among the supersymmetry generators reduces to
- [math]\displaystyle{ \{Q_I, Q_J\} = 2 i \delta _{I J} \partial_\tau }[/math].
Here [math]\displaystyle{ \partial_\tau }[/math] denotes partial differentiation along the single space-time coordinate. One simple realization of the [math]\displaystyle{ (1|1) }[/math] algebra consists of a single bosonic field [math]\displaystyle{ \phi }[/math], a fermionic field [math]\displaystyle{ \psi }[/math], and a generator [math]\displaystyle{ Q }[/math] which acts as
- [math]\displaystyle{ Q \phi= i \psi }[/math],
- [math]\displaystyle{ Q \psi= \partial_\tau \phi }[/math].
Since we have just one supersymmetry generator in this case, the superalgebra relation reduces to [math]\displaystyle{ Q^2 = i \partial _\tau }[/math], which is clearly satisfied. We can represent this algebra graphically using one solid vertex, one hollow vertex, and a single colored edge connecting them.
See also
References
- ↑ 1.0 1.1 Faux, M.; Gates, S. J. (2005). "Adinkras: A graphical technology for supersymmetric representation theory". Physical Review D 71 (6): 065002. doi:10.1103/PhysRevD.71.065002. Bibcode: 2005PhRvD..71f5002F.
- ↑ S. James Gates Jr.: "Superstring Theory: The DNA of Reality " (The Teaching Company)
- ↑ S.J. Gates, Jr.: "Symbols of Power, Physics World, Vol. 23, No 6, June 2010, pp. 34 - 39"
- ↑ S.J. Gates, Jr.: "Quarks to Cosmos "
- ↑ S.J. Gates, Jr., and T. Hubsch, "On Dimensional Extension of Supersymmetry: From Worldlines to Worldsheets"
- ↑ Zhang, Yan X. (2011). "Adinkras for Mathematicians". arXiv:1111.6055 [math.CO].
External links
- http://golem.ph.utexas.edu/category/2007/08/adinkras.html
- https://www.flickr.com/photos/science_and_thecity/2796684536/
- https://www.flickr.com/photos/science_and_thecity/2795836787/
- http://www.thegreatcourses.com/courses/superstring-theory-the-dna-of-reality.html