2022
DOI: 10.1140/epjc/s10052-022-10551-2
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Operator mixing in massless QCD-like theories and Poincarè–Dulac theorem

Abstract: Recently, a differential-geometric approach to operator mixing in massless QCD-like theories – that involves canonical forms, obtained by means of gauge transformations, based on the Poincarè–Dulac theorem for the system of linear differential equations that defines the renormalized mixing matrix in the coordinate representation $$Z(x,\mu )$$ Z ( x , μ ) … Show more

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Cited by 5 publications
(2 citation statements)
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“…( 1), investigating the RG running and mixing of the operator basis in the SF scheme in f = 3 massless QCD, between the low energy scale 0 ∼ O(4) GeV and the high energy scale pt ∼ O(10 3 ) GeV. At the latter scale we performed the matching with the NLO perturbative running by following the strategy explained in [1,2].…”
Section: Discussionmentioning
confidence: 99%
See 1 more Smart Citation
“…( 1), investigating the RG running and mixing of the operator basis in the SF scheme in f = 3 massless QCD, between the low energy scale 0 ∼ O(4) GeV and the high energy scale pt ∼ O(10 3 ) GeV. At the latter scale we performed the matching with the NLO perturbative running by following the strategy explained in [1,2].…”
Section: Discussionmentioning
confidence: 99%
“…The usual derivation to obtain such operators can be found in [4], but it is not well-defined for f = 3. The problem has been solved as suggested in [1,2]: the Poincaré-Dulac theorem guarantees the existence of a basis transformation…”
Section: Perturbative Running For F = 3 Qcdmentioning
confidence: 99%