Partition function (quantum field theory)

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In quantum field theory, partition functions are the generating functionals for all correlation functions, making them key objects of study in the path integral formalism. They are closely related to the partition function in statistical mechanics, where the latter are imaginary time versions of the former. Partition functions can rarely be solved for exactly, although free theories do admit such solutions. Instead, a perturbative approach to solving for partition functions gives rise to the familiar method of calculating correlation functions using Feynman diagrams.

In a ${\displaystyle d}$-dimensional field theory with a real scalar field ${\displaystyle \phi }$ and action ${\displaystyle S[\phi ]}$, the partition function is defined in the path integral formalism to be^[1]

${\displaystyle Z[J]=\int {\mathcal {D}}\phi \ e^{iS[\phi ]+i\int d^{d}xJ(x)\phi (x)}}$

where ${\displaystyle J(x)}$ is a fictitious source current. The function acts as a generating functional for arbitrary n-point correlation functions

${\displaystyle G_{n}(x_{1},\dots ,x_{n})=(-1)^{n}{\frac {1}{Z[0]}}{\frac {\delta ^{n}Z[J]}{\delta J(x_{1})\cdots \delta J(x_{n})}}{\bigg |}_{J=0}.}$

The derivatives used here are functional derivatives rather than regular derivatives since they are acting on functionals rather than regular functions. From this it follows that an equivalent expression for the partition function reminiscent to a power series in source currents is given by^[2]

${\displaystyle Z[J]=\sum _{n\geq 0}{\frac {1}{n!}}\int \prod _{i=1}^{n}d^{d}x_{i}G(x_{1},\dots ,x_{n})J(x_{1})\cdots J(x_{n}).}$

In curved spacetimes there is an added subtlety associated with the fact that the initial vacuum state need not be the same as the final vacuum state.^[3]

Knowing the partition function completely solves the theory since it allows for the direct calculation of all of its correlation functions. However, there are very few cases where the partition function can be calculated exactly. While free theories do admit exact solutions interacting theories generally do not. Instead the partition function can be evaluated at weak coupling which amounts to regular perturbation theory using Feynman diagrams.^[4]

By performing a Wick transformation, the partition function can be expressed in Euclidean spacetime as^[5]

${\displaystyle Z[J]=\int {\mathcal {D}}\phi \ e^{-(S_{E}[\phi ]+\int d^{d}x_{E}J\phi )},}$

where ${\displaystyle S_{E}}$ is the Euclidean action and ${\displaystyle x_{E}}$ is the Euclidean coordinate. This form is closely connection to the partition function in statistical mechanics, especially since the Euclidean Lagrangian is generally bounded from below and thus can be interpreted as an energy. It also allows for the interpretation the exponential factor as a statistical weight for the field configurations, with larger fluctuations with gradients or field values leading to greater suppression. This connection with statistical mechanics also lends additional intuition for how correlation functions should behave in a quantum field theory.

Most of the same principles of the scalar case hold for more general theories with additional fields. Each field requires introducing its own current as was done in the scalar case, with antiparticle fields requiring their own separate currents. Acting on the partition function with a derivative of a current brings down its associated field from the exponential, allowing for the construction of arbitrary correlation functions. Usually all currents are set to zero after the differentiation has been performed since they are merely fictitious currents that are not present in the theory.

For partition functions with Grassmann valued fermion fields, the sources are also Grassmann valued.^[6] For example, a theory with a single Dirac fermion ${\displaystyle \phi (x)}$ requires the introduction of two Grassmann currents ${\displaystyle \eta }$ and ${\displaystyle {\bar {\eta }}}$ so that the partition function is

${\displaystyle Z[{\bar {\eta }},\eta ]=\int {\mathcal {D}}{\bar {\psi }}{\mathcal {D}}\psi \ e^{iS+\int d^{d}x{\bar {\eta }}\psi +{\bar {\psi }}\eta }.}$

Functional derivatives with respect to ${\displaystyle {\bar {\eta }}}$ give fermion fields while derivatives with respect to ${\displaystyle \eta }$ give antifermion fields in the correlation functions.

• Jean Zinn-Justin (2009), Scholarpedia, 4(2): 8674.
• Kleinert, Hagen, Path Integrals in Quantum Mechanics, Statistics, Polymer Physics, and Financial Markets, 4th edition, World Scientific (Singapore, 2004); paperback ISBN 981-238-107-4 (also available online: PDF-files).

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