Super Minkowski space
In mathematics and physics, super Minkowski space or Minkowski superspace is a supersymmetric extension of Minkowski space, sometimes used as the base manifold for superfields. It is acted on by the super Poincaré algebra.
Definition
The underlying supermanifold of super Minkowski space is isomorphic to a super vector space given by the direct sum of ordinary Minkowski spacetime in d dimensions (often taken to be 4) and a number N of real spinor representations of the Lorentz algebra. (When d is 2 mod 4 this is slightly ambiguous because there are 2 different real spin representations, so one needs to replace N by a pair of integers N=N1+N2, though some authors use a different convention and take N copies of both spin representations.)
However this construction is misleading for two reasons: first, super Minkowski space is really an affine space over a group rather than a group, or in other words it has no distinguished "origin", and second, the underlying supergroup of translations is not a super vector space but a nilpotent supergroup of nilpotent length 2. This supergroup has the following Lie algebra. Suppose that M is Minkowski space, and S is a finite sum of irreducible real spinor representations. Then there is an invariant symmetric bilinear map [,] from S×S to M that is positive definite in the sense that the image of s×s is in the closed positive cone of M, and is nonzero if s is nonzero. This bilinear map is unique up to isomorphism. The Lie superalgebra has M as its even part, S as its odd or fermionic part, and the Lie bracket is given by [,] (and the Lie bracket of anything in M with anything is zero).
The dimensions of the irreducible real spinor representations for various dimensions d of spacetime are given by the following table:
Spacetime dimension d | Real dimension of spinor representations | Structure | Bilinear form |
---|---|---|---|
1 | 1 | Real | symmetric |
2 | 1,1 | Real | Two dual representations |
3 | 2 | Real | alternating |
4 | 4 | Complex (dimension 2) | alternating |
5 | 8 | Quaternionic (dimension 2) | symmetric |
6 | 8,8 | Quaternionic (dimension 2,2) | Two dual representations |
7 | 16 | Quaternionic (dimension 4) | alternating |
8 | 16 | Complex (dimension 8) | symmetric |
9 | 16 | Real | symmetric |
10 | 16, 16 | Real | Two dual representations |
11 | 32 | Real | alternating |
12 | 64 | Complex (dimension 32) | alternating |
The table repeats whenever the dimension increases by 8, except that the dimensions of the spin representations are multiplied by 16.
Notation
In the physics literature, Minkowski spacetime is often specified by giving the dimension d of the even bosonic part, and the number of times N that each irreducible spinor representation occurs in the odd fermionic part. In mathematics, Minkowski spacetime is sometimes specified in the form Mm|n where m is the dimension of the even part and n the dimension of the odd part. The relation is as follows: the integer d in the physics notation is the integer m in the mathematics notation, while the integer n in the mathematics notation is a power of 2 times the integer N in the physics notation, where the power of 2 is the dimension of the irreducible real spinor representation (or twice this if there are two irreducible real spinor representations). For example, the d=4, N=1 Minkowski spacetime is M4|4 while the N=2 Minkowski spacetime is M4|8. When the dimension d or m is 2 mod 4 there are two different irreducible real spinor representations, and authors use various different conventions.
In physics the letter P is used for a basis of the even bosonic part of the Lie superalgebra, and the letter Q is often used for a basis of the complexification of the odd fermionic part, so in particular the structure constants of the Lie superalgebra may be complex rather than real. Often the basis elements Q come in complex conjugate pairs, so the real subspace can be recovered as the fixed points of complex conjugation.
References
Deligne, Pierre; Morgan, John W. (1999), "Notes on supersymmetry (following Joseph Bernstein)", in Deligne, Pierre; Etingof, Pavel; Freed, Daniel S.; Jeffrey, Lisa C.; Kazhdan, David; Morgan, John W.; Morrison, David R.; Witten., Edward, Quantum fields and strings: a course for mathematicians, Vol. 1, Providence, R.I.: American Mathematical Society, pp. 41–97, ISBN 978-0-8218-1198-6, MR 1701597