Non-linear Structures in Non-critical NSR String
Abstract
We investigate the Ward identities of the ∞ symmetry in the super-Liouville theory coupled to the super-conformal matter of central charge cM = 1-2(p-q)2 /pq. The theory is classified into two chiralities. For the positive chirality, all gravitationally dressed scaling operators are generated from the q-1 gravitational primaries by acting one of the ring generators in the R-sector on them repeatedly. After fixing the normalizations of the dressed scaling operators, we find that the Ward identities are expressed in the form of the usual q algebra constraints as in the bosonic case: (k+1)n τ =0, (k=1,·s,q-1 ;~ n ∈ Z≥ 1-k), where the equations for even and odd n come from the currents in the NS- and the R-sector respectively. The non-linear terms come from the anomalous contributions at the boundaries of moduli space. The negative chirality is defined by interchanging the roles of p and q. Then we get the p algebra constraints.
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