Secondary Fields in D>2 Conformal Theories

Abstract

We consider the secondary fields in D-dimensional space, D3, generated by the non-abelian current and energy-momentum tensor. These fields appear in the operator product expansions jaμ(x)φ(0) and Tμ(x)φ(0). The secondary fields underlie the construction proposed herein (see [1,2] for more details) and aimed at the derivation of exact solutions of conformal models in D3. In the case of D=2 this construction leads to the known [5] exactly solvable models based on the infinite-dimensional conformal symmetry. It is shown that for D3 the existence of the secondary fields is governed by the existence of anomalous operator contributions (the scalar fields Rj and RT of dimensions dj = dT = D-2) into the operator product expansions jaμ jb and Tμ Tσ. The coupling constant between the field Rj and the fundamental field is found. The fields Rj and RT are shown to beget two infinite sets of secondary tensor fields of canonical dimensions D-2+s, where s is the tensor rank. The current and the energy-momentum tensor belong to those families, their Green functions being expressed through the Green functions of the fields Rj and RT correspondingly. We demonstrate that the Ward identities give rise to the closed set of equations for the Green functions of the fields Rj and RT.

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