Energy-Momentum tensor correlators in φ4 theory I: The spin-zero sector

Abstract

We revisit the construction of the renormalized trace of the Energy-Momentum tensor in the four-dimensional λφ4 theory,using dimensional regularization in d=4- dimensions. We first construct several basic correlators such as φ2 φφ, φ4 φ φ to order λ2 and from these the correlators KI φ φ and KI KJ with KI the basis of dimension d operators. We then match the limit of their expressions on the Wilson-Fisher fixed point to the corresponding expressions obtained in Conformal Field Theory. Then, using the 3-point function φφ, we construct the operator as a certain linear combination of the basis operators, using the requirements that should vanish on the fixed point and that it should have zero anomalous dimension. Finally, we compute the 2-point function and we show that it obeys an eigenvalue equation that gives additional information about the internal structure of the Energy-Momentum tensor operator to what is already contained in its Callan-Symanzik equation.

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