Otro
Higher spin constraints and the super (W∞/2 ⊕ W1+∞/2) algebra in the super eigenvalue model
Registro en:
Physics Letters, Section B: Nuclear, Elementary Particle and High-Energy Physics, v. 393, n. 3-4, p. 321-330, 1997.
0370-2693
WOS:A1997WJ45800012
2-s2.0-18344416917
Autor
Buffon, L. O.
Dalmazi, D.
Zadra, A.
Resumen
We show that the partition function of the super eigenvalue model satisfies, for finite N (non-perturbatively), an infinite set of constraints with even spins s = 4, 6, . . . , ∞. These constraints are associated with half of the bosonic generators of the super (W∞/2 ⊕ W1+∞/2) algebra. The simplest constraint (s = 4) is shown to be reducible to the super Virasoro constraints, previously used to construct the model.