Topological Yang–Mills theory

Template:Short description In gauge theory, topological Yang–Mills theory, also known as the theta term or ${\displaystyle \theta }$-term is a gauge-invariant term which can be added to the action for four-dimensional field theories, first introduced by Edward Witten.^[1] It does not change the classical equations of motion, and its effects are only seen at the quantum level, having important consequences for CPT symmetry.^[2]

The most common setting is on four-dimensional, flat spacetime (Minkowski space).

As a gauge theory, the theory has a gauge symmetry under the action of a gauge group, a Lie group ${\displaystyle G}$, with associated Lie algebra ${\displaystyle 𝔤}$ through the usual correspondence.

The field content is the gauge field ${\displaystyle A_{\mu }}$, also known in geometry as the connection. It is a ${\displaystyle 1}$-form valued in a Lie algebra ${\displaystyle 𝔤}$.

In this setting the theta term action is^[3] $${\displaystyle S_{\theta }=\frac{\theta }{16{\pi }^2}\int d^{4}x\text{tr}(F_{\mu \nu }*F^{\mu \nu })=\frac{\theta }{16{\pi }^2}\int ⟨F\wedge F⟩}$$ where

• ${\displaystyle F_{\mu \nu }}$ is the field strength tensor, also known in geometry as the curvature tensor. It is defined as ${\displaystyle F_{\mu \nu }={\partial }_{\mu }{A}_{\nu }-{\partial }_{\nu }{A}_{\mu }+[A_{\mu },A_{\nu }]}$, up to some choice of convention: the commutator sometimes appears with a scalar prefactor of ${\displaystyle \pm i}$ or ${\displaystyle g}$, a coupling constant.
• ${\displaystyle *F^{\mu \nu }}$ is the dual field strength, defined ${\displaystyle *F^{\mu \nu }=\frac{1}{2}{ϵ}^{\mu \nu \rho \sigma }{F}_{\rho \sigma }}$.
  • ${\displaystyle {ϵ}^{\mu \nu \rho \sigma }}$ is the totally antisymmetric symbol, or alternating tensor. In a more general geometric setting it is the volume form, and the dual field strength ${\displaystyle *F}$ is the Hodge dual of the field strength ${\displaystyle F}$.
• ${\displaystyle \theta }$ is the theta-angle, a real parameter.
• ${\displaystyle \text{tr}}$ is an invariant, symmetric bilinear form on ${\displaystyle 𝔤}$. It is denoted ${\displaystyle \text{tr}}$ as it is often the trace when ${\displaystyle 𝔤}$ is under some representation. Concretely, this is often the adjoint representation and in this setting ${\displaystyle \text{tr}}$ is the Killing form.

The action can be written as^[3] $${\displaystyle S_{\theta }=\frac{\theta }{8{\pi }^2}\int d^{4}x{\partial }_{\mu }{ϵ}^{\mu \nu \rho \sigma }\text{tr}(A_{\nu }{\partial }_{\rho }{A}_{\sigma }+\frac{2}{3}{A}_{\nu }{A}_{\rho }{A}_{\sigma })=\frac{\theta }{8{\pi }^2}\int d^{4}x{\partial }_{\mu }{ϵ}^{\mu \nu \rho \sigma }\text{CS}(A{)}_{\nu \rho \sigma },}$$ where ${\displaystyle \text{CS}(A)}$ is the Chern–Simons 3-form.

Classically, this means the theta term does not contribute to the classical equations of motion.

Template:See also Template:See also

Template:See also

• Yang–Mills theory

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• nLab