Intheoretical physics,explicit symmetry breaking is the breaking of asymmetry of atheory by terms in its definingequations of motion (most typically, to theLagrangian or theHamiltonian) that do not respect the symmetry. Usually this term is used in situations where these symmetry-breaking terms are small, so that the symmetry is approximately respected by the theory. An example is the spectral line splitting in theZeeman effect, due to a magnetic interaction perturbation in the Hamiltonian of the atoms involved.

Explicit symmetry breaking differs fromspontaneous symmetry breaking. In the latter, the defining equations respect the symmetry but theground state (vacuum) of the theory breaks it.^[1]

Explicit symmetry breaking is also associated with electromagnetic radiation. A system of accelerated charges results in electromagnetic radiation when the geometric symmetry of the electric field in free space is explicitly broken by the associated electrodynamic structure under time varying excitation of the given system. This is quite evident in an antenna where the electric lines of field curl around or have rotational geometry around the radiating terminals in contrast to linear geometric orientation within a pair of transmission lines which does not radiate even under time varying excitation.^[2]

A common setting for explicit symmetry breaking isperturbation theory in quantum mechanics. The symmetry is evident in a base Hamiltonian${\displaystyle H_0}$. This${\displaystyle H_0}$ is often anintegrable Hamiltonian, admitting symmetries which in some sensemake the Hamiltonian integrable. The base Hamiltonian might be chosen to provide a starting point close to the system being modelled.

Mathematically, the symmetries can be described by asmooth symmetry group${\displaystyle G}$. Under the action of this group,${\displaystyle H_0}$ is invariant. The explicit symmetry breaking then comes from a second term in the Hamiltonian,${\displaystyle H_{\text{int}}}$, which isnot invariant under the action of${\displaystyle G}$. This is sometimes interpreted as an interaction of the system with itself or possibly with an externally applied field. It is often chosen to contain a factor of a small interaction parameter.

The Hamiltonian can then be written

${\displaystyle H=H_0+H_{\text{int}}}$

where${\displaystyle H_{\text{int}}}$ is the term which explicitly breaks the symmetry. The resulting equations of motion will also not have${\displaystyle G}$-symmetry.

A typical question in perturbation theory might then be to determine the spectrum of the system to first order in the perturbative interaction parameter.

• Symmetry breaking

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