Gauge covariant derivative

The gauge covariant derivative (pronEng|ˌgeɪdʒ koʊˌvɛəriənt dɪˈrɪvətɪv) is like a generalization of the covariant derivative used in general relativity. If a theory has gauge transformations, it means that some physical properties of certain equations are preserved under those transformations. Likewise, the gauge covariant derivative is the ordinary derivative modified in such a way as to make it behave like a true vector operator, so that equations written using the covariant derivative preserve their physical properties under gauge transformations.

Fluid dynamics

In fluid dynamics, the gauge covariant derivative of a fluid may be defined as: $abla_t mathbf{v}:= partial_t mathbf{v} + (mathbf{v} cdot
abla) mathbf{v}$ where $mathbf{v}$ is a velocity vector field of a fluid.

Gauge theory

In gauge theory, which studies a particular class of fields which are of importance in quantum field theory, the gauge covariant derivative is defined as: $D_mu := partial_mu - i e A_mu$ where $A_mu$ is the electromagnetic vector potential.

What happens to the covariant derivative under a gauge transformation

If a gauge transformation is given by: $psi mapsto e^{iLambda} psi$ and for the gauge potential : $A_mu mapsto A_mu + {1 over e} (partial_mu Lambda)$ then $D_mu$ transforms as: $D_mu mapsto partial_mu - i e A_mu - i (partial_mu Lambda)$ ,and $D_mu psi$ transforms as: $D_mu psi mapsto e^{i Lambda} D_mu psi$ and $ar psi := psi^dagger gamma^0$ transforms as: $ar psi mapsto ar psi e^{-i Lambda}$ so that: $ar psi D_mu psi mapsto ar psi D_mu psi$ and $ar psi D_mu psi$ in the QED Lagrangian is therefore gauge invariant, and the gauge covariant derivative is thus named aptly.

On the other hand, the non-covariant derivative $partial_mu$ would not preserve the Lagrangian's gauge symmetry, since: $ar psi partial_mu psi mapsto ar psi partial_mu psi + i ar psi (partial_mu Lambda) psi$ .

Quantum chromodynamics

In quantum chromodynamics, the gauge covariant derivative is [http://www.fuw.edu.pl/~dobaczew/maub-42w/node9.html] : $D_mu := partial_mu - i g , A_mu^alpha , lambda_alpha$ where $g$ is the coupling constant, $A$ is the gluon gauge field, for eight different gluons $alpha=1 dots 8$ , $psi$ is a four-component Dirac spinor, and where $lambda_alpha$ is one of the eight Gell-Mann matrices, $alpha=1 dots 8$ .

General relativity

In general relativity, the gauge covariant derivative is defined as: $abla_j v^i := partial_j v^i + Gamma^i {}_{j k} v^k$ where $Gamma^i {}_{j k}$ is the Christoffel symbol.

ee also

*Kinetic momentum

References

*Tsutomu Kambe, " [http://fluid.ippt.gov.pl/ictam04/text/sessions/docs/FM23/11166/FM23_11166.pdf Gauge Principle For Ideal Fluids And Variational Principle] ". (PDF file.)

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