In quantum field theory, the quantum effective action is a modified expression for the classical action taking into account quantum corrections while ensuring that the principle of least action applies, meaning that extremizing the effective action yields the equations of motion for the vacuum expectation values of the quantum fields. The effective action also acts as a generating functional for one-particle irreducible correlation functions. The potential component of the effective action is called the effective potential, with the expectation value of the true vacuum being the minimum of this potential rather than the classical potential, making it important for studying spontaneous symmetry breaking.
It was first defined perturbatively by Jeffrey Goldstone and Steven Weinberg in 1962,[1] while the non-perturbative definition was introduced by Bryce DeWitt in 1963[2] and independently by Giovanni Jona-Lasinio in 1964.[3]
The article describes the effective action for a single scalar field, however, similar results exist for multiple scalar or fermionic fields.
These generating functionals also have applications in statistical mechanics and information theory, with slightly different factors of
i
A quantum field theory with action
S[\phi]
Z[J]=\intlD\phi
| iS[\phi]+i\intd4x\phi(x)J(x) | |
| e |
.
Since it corresponds to vacuum-to-vacuum transitions in the presence of a classical external current
J(x)
\langle\hat\phi(x1)...\hat\phi(xn)\rangle=(-i)n
| 1 | |
| Z[J] |
| \deltanZ[J] | |
| \deltaJ(x1)...\deltaJ(xn) |
|J=0,
where the scalar field operators are denoted by
\hat\phi(x)
W[J]=-ilnZ[J]
\langle\hat\phi(x1) … \hat\phi(xn)\ranglecon=(-i)n-1
| \deltanW[J] | |
| \deltaJ(x1)...\deltaJ(xn) |
|J=0,
which is calculated perturbatively as the sum of all connected diagrams.[4] Here connected is interpreted in the sense of the cluster decomposition, meaning that the correlation functions approach zero at large spacelike separations. General correlation functions can always be written as a sum of products of connected correlation functions.
The quantum effective action is defined using the Legendre transformation of
W[J]
where
J\phi
\phi(x)
\phi(x)=\langle\hat\phi(x)\rangleJ=
| \deltaW[J] | |
| \deltaJ(x) |
.
As an expectation value, the classical field can be thought of as the weighted average over quantum fluctuations in the presence of a current
J(x)
\phi(x)
J\phi(x)=-
| \delta\Gamma[\phi] | |
| \delta\phi(x) |
.
In the absence of an source
J\phi(x)=0
The effective action is also the generating functional for one-particle irreducible (1PI) correlation functions. 1PI diagrams are connected graphs that cannot be disconnected into two pieces by cutting a single internal line. Therefore, we have
\langle\hat\phi(x1)...\hat\phi(xn)\rangle1PI=i
| \deltan\Gamma[\phi] | |
| \delta\phi(x1)...\delta\phi(xn) |
|J=0,
with
\Gamma[\phi]
W[J]
\Gamma[\phi]
\Delta(x,y)
\Delta(x,y)=
| \delta2W[J] | |
| \deltaJ(x)\deltaJ(y) |
=
| \delta\phi(x) | |
| \deltaJ(y) |
=(
| \deltaJ(y) | |
| \delta\phi(x) |
)-1=-(
| \delta2\Gamma[\phi] | |
| \delta\phi(x)\delta\phi(y) |
)-1=-\Pi-1(x,y).
A direct way to calculate the effective action
\Gamma[\phi0]
S[\phi+\phi0]
\phi0
\phi
Alternatively, the one-loop approximation to the action can be found by considering the expansion of the partition function around the classical vacuum expectation value field configuration
\phi(x)=\phicl(x)+\delta\phi(x)
\Gamma[\phicl]=S[\phicl]+
| i | |
| 2 |
Tr[ln
| \delta2S[\phi] | |
| \delta\phi(x)\delta\phi(y) |
| | | |
| \phi=\phicl |
]+ … .
Symmetries of the classical action
S[\phi]
\Gamma[\phi]
F[x,\phi]
\phi(x) → \phi(x)+\epsilonF[x,\phi],
then this directly imposes the constraint
0=\intd4x\langle
| F[x,\phi]\rangle | |
| J\phi |
| \delta\Gamma[\phi] | |
| \delta\phi(x) |
.
This identity is an example of a Slavnov–Taylor identity. It is identical to the requirement that the effective action is invariant under the symmetry transformation
\phi(x) → \phi(x)+\epsilon\langle
| F[x,\phi]\rangle | |
| J\phi |
.
This symmetry is identical to the original symmetry for the important class of linear symmetries
F[x,\phi]=a(x)+\intd4y b(x,y)\phi(y).
For non-linear functionals the two symmetries generally differ because the average of a non-linear functional is not equivalent to the functional of an average.
For a spacetime with volume
lV4
V(\phi)=-\Gamma[\phi]/lV4
H
V(\phi)
\phi(x)
\langle\Omega|H|\Omega\rangle
|\Omega\rangle
\langle\Omega|\hat\phi|\Omega\rangle=\phi(x)
V''(\phi)\geq0
Calculating the effective potential perturbatively can sometimes yield a non-convex result, such as a potential that has two local minima. However, the true effective potential is still convex, becoming approximately linear in the region where the apparent effective potential fails to be convex. The contradiction occurs in calculations around unstable vacua since perturbation theory necessarily assumes that the vacuum is stable. For example, consider an apparent effective potential
V0(\phi)
\phi1
\phi2
|\Omega1\rangle
|\Omega2\rangle
\phi
V0(\phi)
λ\in[0,1]
|\Omega\rangle\propto\sqrtλ|\Omega1\rangle+\sqrt{1-λ}|\Omega2\rangle.
However, the energy density of this state is
λV0(\phi1)+(1-λ)V0(\phi2)<V0(\phi)
V0(\phi)
\phi
V(\phi)