Abstract
The general constraints of “full conformal symmetry”, on n-point correlation functions are discussed. An identity for the three-point correlation function is derived from conformal symmetry, which allows to derive an integral representation for any “irreducible” conformal graph. The connections of these results to conformally covariant “generalized Wilson operator products expansions” are pointed out. Arguments which suggest locality property of a conformal covariant expansion for the n-point functions are discussed.
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