The nonperturbative functional renormalization group equation depends on the choice of a regulator function, whose main properties are a "coarse-graining scale"k and an overall dimensionless amplitude a. In this paper we shall discuss the limit a→0 with k fixed. This limit is closely related to the pseudoregulator that reproduces the beta functions of the MS¯ scheme that we studied in a previous paper. It is not suitable for precision calculations but it appears to be useful to eliminate the spurious breaking of symmetries by the regulator, both for nonlinear models and within the background field method.
Limit of vanishing regulator in the functional renormalization group / Baldazzi, A.; Percacci, R.; Zambelli, L.. - In: PHYSICAL REVIEW D. - ISSN 2470-0010. - 104:7(2021), pp. 1-21. [10.1103/PhysRevD.104.076026]
Limit of vanishing regulator in the functional renormalization group
Baldazzi, A.;Percacci, R.;
2021-01-01
Abstract
The nonperturbative functional renormalization group equation depends on the choice of a regulator function, whose main properties are a "coarse-graining scale"k and an overall dimensionless amplitude a. In this paper we shall discuss the limit a→0 with k fixed. This limit is closely related to the pseudoregulator that reproduces the beta functions of the MS¯ scheme that we studied in a previous paper. It is not suitable for precision calculations but it appears to be useful to eliminate the spurious breaking of symmetries by the regulator, both for nonlinear models and within the background field method.| File | Dimensione | Formato | |
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