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Neveu–Schwarz sector : ウィキペディア英語版
Super Virasoro algebra
In mathematical physics, a super Virasoro algebra is an extension of the Virasoro algebra to a Lie superalgebra. There are two extensions with particular importance in superstring theory: the Ramond algebra (named after Pierre Ramond) and the Neveu–Schwarz algebra (named after Andre Neveu and John Henry Schwarz). Both algebras have ''N''=1 supersymmetry and an even part given by the Virasoro algebra. They describe the symmetries of a superstring in two different sectors, called the Ramond sector and the Neveu–Schwarz sector.
==The ''N'' = 1 super Virasoro algebras==

There are two minimal extensions of the Virasoro algebra with ''N'' = 1 supersymmetry: the Ramond algebra and the Neveu–Schwarz algebra. They are both Lie superalgebras whose even part is the Virasoro algebra: this Lie algebra has a basis consisting of a central element ''C'' and generators ''L''''m'' (for integer ''m'') satisfying
(L_m , L_n ) = ( m - n ) L_ + \frac m ( m^2 - 1 ) \delta_
where \delta_ is the Kronecker delta.
The odd part of the algebra has basis G_r, where r is either an integer (the Ramond case), or half an odd integer (the Neveu–Schwarz case). In both cases, c is central in the superalgebra, and the additional graded brackets are given by
(L_m , G_r ) = \left( \frac - r \right) G_
\ = 2 L_ + \frac \left( r^2 - \frac \right) \delta_
Note that this last bracket is an anticommutator, not a commutator, because both generators are odd.
The unitary highest weight representations of these algebras have a classification analogous to that for the Virasoro algebra, with a continuum of representations together with an infinite discrete series. The existence of these discrete series was conjectured by Daniel Friedan, Zongan Qiu, and Stephen Shenker (1984). It was proven by Peter Goddard, Adrian Kent and David Olive (1986), using a supersymmetric generalisation of the coset construction or GKO construction.

抄文引用元・出典: フリー百科事典『 ウィキペディア(Wikipedia)
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