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    A Geometrical Interpretation Of Renormalisation Group Flow


    Dolan, Brian P. (1994) A Geometrical Interpretation Of Renormalisation Group Flow. International Journal of Modern Physics A, 09 (08). pp. 1261-1286. ISSN 0217-751X

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    Abstract

    The renormalization group (RG) equation in D-dimensional Euclidean space, RD, is analyzed from a geometrical point of view. A general form of the RG equation is derived which is applicable to composite operators as well as tensor operators (on RD) which may depend on the Euclidean metric. It is argued that physical N-point amplitudes should be interpreted as rank N covariant tensors on the space of couplings, , and that the RG equation can be viewed as an equation for Lie transport on with respect to the vector field generated by the β functions of the theory. In one sense it is nothing more than the definition of a Lie derivative. The source of the anomalous dimensions can be interpreted as being due to the change of the basis vectors on under Lie transport. The RG equation acts as a bridge between Euclidean space and coupling constant space in that the effect on amplitudes of a diffeomorphism of RD (that of dilations) is completely equivalent to a diffeomorphism of generated by the β functions of the theory. A form of the RG equation for operators is also given. These ideas are developed in detail for the example of massive λφ4 theory in four dimensions.
    Item Type: Article
    Keywords: Energy-Momentum Tensor; Scalar Field-Theory; C-Theorem;
    Academic Unit: Faculty of Science and Engineering > Theoretical Physics
    Item ID: 12509
    Identification Number: 10.1142/S0217751X94000571
    Depositing User: Dr. Brian Dolan
    Date Deposited: 03 Mar 2020 17:08
    Journal or Publication Title: International Journal of Modern Physics A
    Publisher: World Scientific
    Refereed: Yes
    Related URLs:
    URI: https://mu.eprints-hosting.org/id/eprint/12509
    Use Licence: This item is available under a Creative Commons Attribution Non Commercial Share Alike Licence (CC BY-NC-SA). Details of this licence are available here

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