Remarks on a class of renormalizable interpolating gauges | Zendy

David Dudal | Zendy; J. A. Gracey | Zendy; V. E. R. Lemes | Zendy; R. F. Sobreiro | Zendy; S. P. Sorella | Zendy; Ronaldo Thibes | Zendy; Henri Verschelde | Zendy

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Remarks on a class of renormalizable interpolating gauges

Author(s) -

David Dudal,

J. A. Gracey,

V. E. R. Lemes,

R. F. Sobreiro,

S. P. Sorella,

Ronaldo Thibes,

Henri Verschelde

Publication year - 2005

Publication title -

journal of high energy physics

Language(s) - English

Resource type - Journals

eISSN - 1126-6708

pISSN - 1029-8479

DOI - 10.1088/1126-6708/2005/07/059

Subject(s) - covariant transformation , renormalization , multiplicative function , gauge (firearms) , algebraic number , abelian group , mathematics , class (philosophy) , gauge theory , physics , mathematical physics , renormalization group , gauge covariant derivative , quantum electrodynamics , pure mathematics , mathematical analysis , supersymmetric gauge theory , gauge anomaly , computer science , artificial intelligence , archaeology , history

A class of covariant gauges allowing one to interpolate between the Landau,the maximal Abelian, the linear covariant and the Curci-Ferrari gauges isdiscussed. Multiplicative renormalizability is proven to all orders by means ofalgebraic renormalization. All one-loop anomalous dimensions of the fields andgauge parameters are explicitly evaluated in the MSbar scheme.Comment: 24 pages. no figure

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