Fractional Superspace Formulation of Generalized Super-Virasoro Algebras
Abstract
We present a fractional superspace formulation of the centerless parasuper-Viraso-ro and fractional super-Virasoro algebras. These are two different generalizations of the ordinary super-Virasoro algebra generated by the infinitesimal diffeomorphisms of the superline. We work on the fractional superline parametrized by t and θ, with t a real coordinate and θ a paragrassmann variable of order M and canonical dimension 1/F. We further describe a more general structure labelled by M and F with M≥ F. The case F=2 corresponds to the parasuper-Virasoro algebra of order M, while the case F=M leads to the fractional super-Virasoro algebra of order F. The ordinary super-Virasoro algebra is recovered at F=M=2. The connection with q-oscillator algebras is discussed.
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