# Wilsonian renormalisation of CFT correlation functions: Field theory

**Authors:** J. M. Lizana, M. Perez-Victoria

arXiv: 1702.07773 · 2018-05-08

## TL;DR

This paper explores the connection between the exact renormalisation group with local couplings and the renormalisation of correlation functions in scale-invariant theories, providing a geometric framework and comparing with standard diagrammatic methods.

## Contribution

It introduces a geometric description of theory space, identifies normal parameters for simplified RG flows, and relates renormalised correlators to cutoff-dependent correlators in a novel way.

## Key findings

- Normal correlators are defined via functional differentiation in normal parameters.
- Renormalised correlators in minimal subtraction schemes match finite cutoff correlators.
- Comparison with scalar free-field theory confirms the formalism's consistency.

## Abstract

We examine the precise connection between the exact renormalisation group with local couplings and the renormalisation of correlation functions of composite operators in scale-invariant theories. A geometric description of theory space allows us to select convenient non-linear parametrisations that serve different purposes. First, we identify normal parameters in which the renormalisation group flows take their simplest form; normal correlators are defined by functional differentiation with respect to these parameters. The renormalised correlation functions are given by the continuum limit of correlators associated to a cutoff-dependent parametrisation, which can be related to the renormalisation group flows. The necessary linear and non-linear counterterms in any arbitrary parametrisation arise in a natural way from a change of coordinates. We show that, in a class of minimal subtraction schemes, the renormalised correlators are exactly equal to normal correlators evaluated at a finite cutoff. To illustrate the formalism and the main results, we compare standard diagrammatic calculations in a scalar free-field theory with the structure of the perturbative solutions to the Polchinski equation close to the Gaussian fixed point.

## Full text

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## Figures

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## References

38 references — full list in the complete paper: https://tomesphere.com/paper/1702.07773/full.md

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Source: https://tomesphere.com/paper/1702.07773