Chiral anomalies and zeta-function regularization
- 15 March 1985
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review D
- Vol. 31 (6), 1374-1385
- https://doi.org/10.1103/physrevd.31.1374
Abstract
The zeta-function method for regularizing determinants is used to calculate the chiral anomalies of several field-theory models. In SU(N) gauge theories without couplings, the results of perturbation theory are obtained in an unambiguous manner for the full gauge theory as well as for the corresponding external-field problem. If axial-vector couplings are present, different anomalies occur for the two cases. The result for the full gauge theory is again uniquely determined; for its nongauge analog, however, ambiguities can arise. The connection between the basic path integral and the operator used to construct the heat kernel is investigated and the significance of its Hermiticity and gauge covariance are analyzed. The implications of the Wess-Zumino conditions are considered.
Keywords
This publication has 23 references indexed in Scilit:
- Evaluation of the chiral anomaly in gauge theories withcouplingsPhysical Review D, 1984
- Comment on derivation of anomalous Ward-Takahashi identities in the functional integration formulation of field theoryPhysical Review D, 1983
- Anomaly extraction from the path integralThe European Physical Journal C, 1983
- Path integral for gauge theories with fermionsPhysical Review D, 1980
- Path-Integral Measure for Gauge-Invariant Fermion TheoriesPhysical Review Letters, 1979
- Regularization and Ward-Identity AnomaliesPhysical Review B, 1969
- Anomalous Ward Identities in Spinor Field TheoriesPhysical Review B, 1969
- A PCAC puzzle: π0→γγ in the σ-modelIl Nuovo Cimento A (1971-1996), 1969
- Axial-Vector Vertex in Spinor ElectrodynamicsPhysical Review B, 1969
- On Gauge Invariance and Vacuum PolarizationPhysical Review B, 1951