Weyl equation

Lua error in package.lua at line 80: module 'strict' not found. In physics, particularly quantum field theory, the Weyl Equation is a relativistic wave equation for describing massless spin-1/2 particles. It is named after the German physicist Hermann Weyl.

Equation

The general equation can be written: ^[1]^[2]^[3]

\sigma^\mu\partial_\mu \psi=0

explicitly in SI units:

I_2 \frac{1}{c}\frac{\partial \psi}{\partial t} + \sigma_x\frac{\partial \psi}{\partial x} + \sigma_y\frac{\partial \psi}{\partial y} + \sigma_z\frac{\partial \psi}{\partial z}=0

where

\sigma^\mu = (\sigma^0,\sigma^1,\sigma^2,\sigma^3)= (I_2,\sigma_x,\sigma_y,\sigma_z)

is a vector whose components are the 2 × 2 identity matrix for μ = 0 and the Pauli matrices for μ = 1,2,3, and ψ is the wavefunction - one of the Weyl spinors.

Weyl spinors

The elements ψ_L and ψ_R are respectively the left and right handed Weyl spinors, each with two components. Both have the form

\psi = \begin{pmatrix} \psi_1 \\ \psi_2 \\ \end{pmatrix} = \chi e^{-i(\mathbf{k}\cdot\mathbf{r}-\omega t)}= \chi e^{-i(\mathbf{p}\cdot\mathbf{r}-Et)/\hbar}

where

\chi = \begin{pmatrix} \chi_1 \\ \chi_2 \\ \end{pmatrix}

is a constant two-component spinor.

Since the particles are massless, i.e. m = 0, the magnitude of momentum p relates directly to the wave-vector k by the De Broglie relations as:

|\mathbf{p}| = \hbar |\mathbf{k}| = \hbar \omega /c \, \rightarrow \, |\mathbf{k}| = \omega /c

The equation can be written in terms of left and right handed spinors as:

\begin{align} & \sigma^\mu \partial_\mu \psi_R = 0 \\ & \bar{\sigma}^\mu \partial_\mu \psi_L = 0 \end{align}

where $\bar{\sigma}^\mu = (I_2,-\sigma_x,-\sigma_y,-\sigma_z)$ .

Helicity

The left and right components correspond to the helicity λ of the particles, the projection of angular momentum operator J onto the linear momentum p:

\mathbf{p}\cdot\mathbf{J}\left|\mathbf{p},\lambda\right\rangle=\lambda |\mathbf{p}|\left|\mathbf{p},\lambda\right\rangle

Here $\lambda=\pm 1/2$ .

Derivation

The equations are obtained from the Lagrangian densities

\mathcal L = i \psi_R^\dagger \sigma^\mu \partial_\mu \psi_R

\mathcal L = i \psi_L^\dagger \bar\sigma^\mu \partial_\mu \psi_L

By treating the spinor and its conjugate (denoted by $\dagger$ ) as independent variables, the relevant Weyl equation is obtained.

References

↑ Quantum Mechanics, E. Abers, Pearson Ed., Addison Wesley, Prentice Hall Inc, 2004, ISBN 978-0-13-146100-0
↑ The Cambridge Handbook of Physics Formulas, G. Woan, Cambridge University Press, 2010, ISBN 978-0-521-57507-2.
↑ An Introduction to Quantum Field Theory, M.E. Peskin, D.V. Schroeder, Addison-Wesley, 1995, ISBN 0-201-50397-2

External links

[1] Quantum Mechanics, E. Abers, Pearson Ed., Addison Wesley, Prentice Hall Inc, 2004, ISBN 978-0-13-146100-0

[2] The Cambridge Handbook of Physics Formulas, G. Woan, Cambridge University Press, 2010, ISBN 978-0-521-57507-2.

[3] An Introduction to Quantum Field Theory, M.E. Peskin, D.V. Schroeder, Addison-Wesley, 1995, ISBN 0-201-50397-2

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[2]

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Weyl equation

Contents

Equation

Weyl spinors

Helicity

Derivation

See also

References

Further reading

External links

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