Path integral for gauge theories with fermions

Kazuo Fujikawa
Phys. Rev. D 21, 2848 – Published 15 May 1980; Erratum Phys. Rev. D 22, 1499 (1980)
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Abstract

The Atiyah-Singer index theorem indicates that a naive unitary transformation of basis vectors for fermions interacting with gauge fields is not allowed in general. On the basis of this observation, it was previously shown that the path-integral measure of a gauge-invariant fermion theory is transformed nontrivially under the chiral transformation, and thus leads to a simple derivation of "anomalous" chiral Ward-Takahashi identities. We here clarify some of the technical aspects associated with the discussion. It is shown that the Jacobian factor in the path-integral measure, which corresponds to the Adler-Bell-Jackiw anomaly, is independent of any smooth regularization procedure of large eigenvalues of D in Euclidean theory; this property holds in any even-dimensional space-time and also for the gravitational anomaly. The appearance of the anomaly and its connection with the index theorem are thus related to the fact that the primary importance is attached to the Lorentz-covariant "energy" operator D and that D and γ5 do not commute. The abnormal behavior of the path-integral measure at the zero-frequency sector in the presence of instantons and its connection with spontaneous symmetry breaking is also clarified. We comment on several other problems associated with the anomaly and on the Pauli-Villars regularization method.

  • Received 28 January 1980

DOI:https://doi.org/10.1103/PhysRevD.21.2848

©1980 American Physical Society

Erratum

Erratum: Path integral for gauge theories with fermions

Kazuo Fujikawa
Phys. Rev. D 22, 1499 (1980)

Authors & Affiliations

Kazuo Fujikawa

  • Institute for Nuclear Study, University of Tokyo, Tanashi, Tokyo 188, Japan

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Issue

Vol. 21, Iss. 10 — 15 May 1980

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