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The regularized BRST Jacobian of pure Yang-Mills theory
The Jacobian for infinitesimal BRST transformations of path integrals for pure Yang-Mills theory, viewed as a matrix $\unity +\Delta J$ in the space of Yang-Mills fields and (anti)ghosts, contains off-diagonal terms. Naively, the trace of $\Delta J$ vanishes, being proportional to the trace of the s...
| Autores principales: | , , , , , |
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| Lenguaje: | eng |
| Publicado: |
1992
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| Materias: | |
| Acceso en línea: | https://dx.doi.org/10.1016/0370-2693(92)91231-W http://cds.cern.ch/record/563972 |
| _version_ | 1780899129606537216 |
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| author | De Jonghe, F. Siebelink, R. Troost, W. Vandoren, S. van Nieuwenhuizen, P. Van Proeyen, Antoine |
| author_facet | De Jonghe, F. Siebelink, R. Troost, W. Vandoren, S. van Nieuwenhuizen, P. Van Proeyen, Antoine |
| author_sort | De Jonghe, F. |
| collection | CERN |
| description | The Jacobian for infinitesimal BRST transformations of path integrals for pure Yang-Mills theory, viewed as a matrix $\unity +\Delta J$ in the space of Yang-Mills fields and (anti)ghosts, contains off-diagonal terms. Naively, the trace of $\Delta J$ vanishes, being proportional to the trace of the structure constants. However, the consistent regulator $\cR$, constructed from a general method, also contains off-diagonal terms. An explicit computation demonstrates that the regularized Jacobian $Tr\ \Delta J\exp -\cR /M^2$ for $M^2\rightarrow \infty $ is the variation of a local counterterm, which we give. This is a direct proof at the level of path integrals that there is no BRST anomaly. |
| id | cern-563972 |
| institution | Organización Europea para la Investigación Nuclear |
| language | eng |
| publishDate | 1992 |
| record_format | invenio |
| spelling | cern-5639722023-03-14T18:53:00Zdoi:10.1016/0370-2693(92)91231-Whttp://cds.cern.ch/record/563972engDe Jonghe, F.Siebelink, R.Troost, W.Vandoren, S.van Nieuwenhuizen, P.Van Proeyen, AntoineThe regularized BRST Jacobian of pure Yang-Mills theoryParticle Physics - TheoryThe Jacobian for infinitesimal BRST transformations of path integrals for pure Yang-Mills theory, viewed as a matrix $\unity +\Delta J$ in the space of Yang-Mills fields and (anti)ghosts, contains off-diagonal terms. Naively, the trace of $\Delta J$ vanishes, being proportional to the trace of the structure constants. However, the consistent regulator $\cR$, constructed from a general method, also contains off-diagonal terms. An explicit computation demonstrates that the regularized Jacobian $Tr\ \Delta J\exp -\cR /M^2$ for $M^2\rightarrow \infty $ is the variation of a local counterterm, which we give. This is a direct proof at the level of path integrals that there is no BRST anomaly.The Jacobian for infinitesimal BRST transformations of path integrals for pure Yang-Mills theory, viewed as a matrix $\unity +\Delta J$ in the space of Yang-Mills fields and (anti)ghosts, contains off-diagonal terms. Naively, the trace of $\Delta J$ vanishes, being proportional to the trace of the structure constants. However, the consistent regulator $\cR$, constructed from a general method, also contains off-diagonal terms. An explicit computation demonstrates that the regularized Jacobian $Tr\ \Delta J\exp -\cR /M~2$ for $M~2\rightarrow \infty $ is the variation of a local counterterm, which we give. This is a direct proof at the level of path integrals that there is no BRST anomaly.The Jacobian for infinitesimal BRST transformations of path integrals for pure Yang-Mills theory, viewed as a matrix $\unity +\Delta J$ in the space of Yang-Mills fields and (anti)ghosts, contains off-diagonal terms. Naively, the trace of $\Delta J$ vanishes, being proportional to the trace of the structure constants. However, the consistent regulator $\cR$, constructed from a general method, also contains off-diagonal terms. An explicit computation demonstrates that the regularized Jacobian $Tr\ \Delta J\exp -\cR /M~2$ for $M~2\rightarrow \infty $ is the variation of a local counterterm, which we give. This is a direct proof at the level of path integrals that there is no BRST anomaly.The jacobian for infinitesimal BRST transformations of path integrals for pure Yang-Mills theory, viewed as a matrix 1 +ΔJ in the space of Yang-Mills fields and (anti) ghosts, contains off-diagonal terms. Naively, the trace of ΔJ vanishes, being proportional to the trace of the structure constants. However, the consistent regulator R , constructed from a general method, also contains off-diagonal terms. An explicit computation demonstrates that the regularized jacobian tr ΔJ exp ( − R M 2 ) for M 2 →∞ is the variation of a local counter-term, which we give. This is a direct proof, at the level of path integrals, that there is no BRST anomaly.hep-th/9206097CERN-TH-6541-92KUL-TF-92-24CERN-TH-6541-92KUL-TF-92-24oai:cds.cern.ch:5639721992 |
| spellingShingle | Particle Physics - Theory De Jonghe, F. Siebelink, R. Troost, W. Vandoren, S. van Nieuwenhuizen, P. Van Proeyen, Antoine The regularized BRST Jacobian of pure Yang-Mills theory |
| title | The regularized BRST Jacobian of pure Yang-Mills theory |
| title_full | The regularized BRST Jacobian of pure Yang-Mills theory |
| title_fullStr | The regularized BRST Jacobian of pure Yang-Mills theory |
| title_full_unstemmed | The regularized BRST Jacobian of pure Yang-Mills theory |
| title_short | The regularized BRST Jacobian of pure Yang-Mills theory |
| title_sort | regularized brst jacobian of pure yang-mills theory |
| topic | Particle Physics - Theory |
| url | https://dx.doi.org/10.1016/0370-2693(92)91231-W http://cds.cern.ch/record/563972 |
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