Fractional Supersymmetry As a Matrix Model
Abstract
Using parafermionic field theoretical methods, the fundamentals of 2d fractional supersymmetry QK =P are set up. Known difficulties induced by methods based on the Uq(sl(2)) quantum group representations and non commutative geometry are overpassed in the parafermionic approach. Moreover we find that fractional supersymmetric algebras are naturally realized as matrix models. The K=3 case is studied in details. Links between 2d (1 3,0) and ((1 32),0) fractional supersymmetries and N=2 U(1) and N=4 su(2) standard supersymmetries respectively are exhibited. Field theoretical models describing the self couplings of the matter multiplets (02,(1 3)2,(2 3)2) and (04,(1 3)4,(2 3)4) are given.
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