Chiral anomaly

In physics, a chiral anomaly is the anomalous nonconservation of a chiral current. In some theories of fermions with chiral symmetry, the quantization may lead to the breaking of this (global) chiral symmetry. In that case, the charge associated with the chiral symmetry is not conserved.

The non-conservation happens in a tunneling process from one vacuum to another. Such a process is called an instanton. In the case of a symmetry related to the conservation of a fermionic particle number, one may understand the creation of such particles as follows. The definition of a particle is different in the two vacuum states between which the tunneling occurs; therefore a state of no particles in one vacuum corresponds to a state with some particles in the other vacuum.

In particular, there is a Dirac sea of fermions and, when such a tunneling happens, it causes the energy levels of the sea fermions to gradually shift upwards for the particles and downwards for the anti-particles, or vice versa. This means particles which once belonged to the Dirac sea become real (positive energy) particles and particle creation happens.

From the formula for ${\mathcal {Z}}$ one also sees explicitly that in the classical limit, $\hbar \to 0,$ anomalies don't come into play, since in this limit only the extrema of ${\mathcal {A}}$ are relevant.

The anomaly is in fact proportional to the instanton number of a gauge field to which the fermions are coupled (note that the gauge symmetry is always non-anomalous and is exactly respected, as is required by the consistency of the theory).

Calculation

The chiral anomaly can be calculated exactly by one-loop Feynman diagrams, e.g. the famous "triangle diagram", contributing to the pion decays, $\pi ^{0}\to \gamma \gamma$ and $\pi ^{0}\to e^{+}e^{-}\gamma$ .

The amplitude for this process can be calculated directly from the change in the measure of the fermionic fields under the chiral transformation.

Wess and Zumino developed a set of conditions on how the partition function ought to behave under gauge transformations called the Wess-Zumino consistency conditions.

Fujikawa derived this anomaly using the correspondence between functional determinants and the partition function using the Atiyah-Singer index theorem. See Fujikawa's method.

An example: baryonic charge non-conservation

The Standard Model of electroweak interactions has all the necessary ingredients for successful baryogenesis. Beyond the violation of charge conjugation $C$ and CP violation $CP$ (charge+parity), baryonic charge violation appears through the Adler-Bell-Jackiw anomaly of the $U(1)$ group.

Baryons are not conserved by the usual electroweak interactions due to quantum chiral anomaly. The classic electroweak Lagrangian conserves baryonic charge. Quarks always enter in bilinear combinations $q{\bar {q}}$ , so that a quark can disappear only in collision with an antiquark. In other words, the classical baryonic current $J_{\mu }^{B}$ is conserved:

$\partial ^{\mu }J_{\mu }^{B}=\sum _{j}\partial ^{\mu }({\bar {q}}_{j}\gamma _{\mu }q_{j})=0.$ However, quantum corrections destroy this conservation law and instead of zero in the right hand side of this equation, one gets

$\partial ^{\mu }J_{\mu }^{B}={\frac {g^{2}C}{16\pi ^{2}}}G^{\mu \nu a}{\tilde {G}}_{\mu \nu }^{a},$ ${\tilde {G}}_{\mu \nu }^{a}={\frac {1}{2}}\epsilon _{\mu \nu \alpha \beta }G^{\alpha \beta a},$ and the gauge field strength $G_{\mu \nu }^{a}$ is given by the expression

$G_{\mu \nu }^{a}=\partial _{\mu }A_{\nu }^{a}-\partial _{\nu }A_{\mu }^{a}+gf_{bc}^{a}A_{\mu }^{b}A_{\nu }^{c}.$ An important fact is that the anomalous current non-conservation is proportional to the total derivative of a vector operator, $G^{\mu \nu a}{\tilde {G}}_{\mu \nu }^{a}=\partial ^{\mu }K_{\mu }$ (this is non-vanishing due to instanton configurations of the gauge field, which are pure gauge at the infinity), where the anomalous current $K_{\mu }$ is:

$K_{\mu }=2\epsilon _{\mu \nu \alpha \beta }\left(A^{\nu a}\partial ^{\alpha }A^{\beta a}+{\frac {1}{3}}f^{abc}A^{\nu a}A^{\alpha b}A^{\beta c}\right),$ which is the Hodge dual of the Chern-Simons 3-form.

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