Weyl transformation

See also Wigner–Weyl transform, for another definition of the Weyl transform.

In theoretical physics, the Weyl transformation, named after Hermann Weyl, is a local rescaling of the metric tensor:

g_{ab}\rightarrow e^{-2\omega(x)}g_{ab}

which produces another metric in the same conformal class. A theory or an expression invariant under this transformation is called conformally invariant, or is said to possess Weyl symmetry. The Weyl symmetry is an important symmetry in conformal field theory. It is, for example, a symmetry of the Polyakov action.

The ordinary Levi-Civita connection and associated spin connections are not invariant under Weyl transformations. An appropriately invariant notion is the Weyl connection, which is one way of specifying the structure of a conformal connection.

A quantity φ has conformal weight k if, under the Weyl transformation, it transforms via

\varphi \to \varphi e^{k \omega}.

Thus conformally weighted quantities belong to certain density bundles; see also conformal dimension. Let A_μ be the connection one-form associated to the Levi-Civita connection of g. Introduce a connection that depends also on an initial one-form $\partial_\mu\omega$ via

B_\mu = A_\mu + \partial_\mu \omega.

Then $D_\mu \varphi \equiv \partial_\mu \varphi + k B_\mu \varphi$ is covariant and has conformal weight $k - 1$ .

Formulas

For the transformation

g_{ab} = f(\phi(x)) \bar{g}_{ab}

We can derive the following formulas

\begin{align} g^{ab} &= \frac{1}{f(\phi(x))} \bar{g}^{ab} \\ \sqrt{-g} &= \sqrt{-\bar{g}} f^{D/2} \\ \Gamma^c_{ab} &= \bar{\Gamma}^c_{ab} + \frac{f'}{2f} \left(\delta^c_b \partial_a \phi + \delta^c_a \partial_b \phi - \bar{g}_{ab} \partial^c \phi \right) \equiv \bar{\Gamma}^c_{ab} + \gamma^c_{ab} \\ R_{ab} &= \bar{R}_{ab} + \frac{f'' f- f^{\prime 2}}{2f^2} \left((2-D) \partial_a \phi \partial_b \phi - \bar{g}_{ab} \partial^c \phi \partial_c \phi \right) + \frac{f'}{2f} \left((2-D) \nabla_a \partial_b \phi - \bar{g}_{ab} \bar{\Box} \phi\right) + \frac{1}{4} \frac{f^{\prime 2}}{f^2} (D-2) \left(\partial_a \phi \partial_b \phi - \bar{g}_{ab} \partial_c \partial^c \phi \right) \\ R &= \frac{1}{f} \bar{R} + \frac{1-D}{f} \left( \frac{f''f - f^{\prime 2}}{f^2} \partial^c \phi \partial_c \phi + \frac{f'}{f} \bar{\Box} \phi \right) + \frac{1}{4f} \frac{f^{\prime 2}}{f^2} (D-2) (1-D) \partial_c \phi \partial^c \phi \end{align}

Note that the Weyl tensor is invariant under a Weyl rescaling.

Literature

Hermann Weyl, Raum, Zeit, Materie (Space, Time, Matter), Lectures on General Relativity, in German. Berlin, Springer 1921, with later reprints in 1993. ISBN 3-540-56978-2

This article is issued from Wikipedia - version of the 4/4/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.