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Superfields are functions of superspace. They have the form

${\displaystyle F(x,\theta ,{\bar {\theta }})=f(x)+\theta \phi (x)+{\bar {\theta }}{\bar {\chi }}(x)+\theta \theta m(x)+{\bar {\theta }}{\bar {\theta }}n(x)+\theta \sigma ^{\mu }{\bar {\theta }}A_{\mu }(x)+{\bar {\theta }}{\bar {\theta }}\theta \lambda (x)+\theta \theta {\bar {\theta }}\psi (x)+\theta \theta {\bar {\theta }}{\bar {\theta }}d(x)}$.

A superpotential, denoted by ${\displaystyle W(\Phi )}$, is a polynomial in chiral superfields. Chiral superfields satisfy ${\displaystyle {\bar {D}}_{\dot {\alpha }}\Phi =0}$, where ${\displaystyle {\bar {D}}_{\dot {\alpha }}=-{\frac {\partial }{\partial {\bar {\theta }}^{\dot {\alpha }}}}-i\theta ^{\alpha }\sigma _{\alpha {\dot {\alpha }}}^{\mu }{\frac {\partial }{\partial x^{\mu }}}}$ is the covariant derivative on superspace that commutes with the supersymmetry transformations. ${\displaystyle {\bar {D}}_{\dot {\alpha }}}$ satisfies the product rule so ${\displaystyle W(\Phi )}$ is a chiral superfield.

From superpotentials supersymmetry invariant interaction Lagrangians can be constructed:

${\displaystyle {\mathcal {L}}_{1}=\int d^{2}\theta W(\Phi )+\int d^{2}{\bar {\theta }}{\bar {W}}(\Phi )}$

The integrals over the Grassmann numbers produce a term that transforms into spacetime derivatives under supersymmetry transformations. The spacetime derivatives do not change the action and therefore leave the equations of motion invariant.

${\displaystyle [a,a^{\dagger }]=1}$

The basis vectors of the representation space are labeled by the eigenvalues of the number operator ${\displaystyle N}$, which is defined as ${\displaystyle N=a^{\dagger }a}$:

${\displaystyle \{|0\rangle ,|1\rangle ,...\}}$

The elements of the one-parameter group generated by this algebra are given by ${\displaystyle U(t)=e^{-{\frac {iHt}{\hbar }}}}$ where ${\displaystyle H=\hbar \omega (N+1/2)}$ and ${\displaystyle t\in \mathbb {R} }$. ${\displaystyle H}$ is called the generator of time translation.

${\displaystyle [S_{i},S_{j}]=i\hbar \epsilon _{ijk}S_{k}}$

${\displaystyle [L_{i},L_{i}]=i\hbar \epsilon _{ijk}L_{k}}$

The basis vectors of the representation space can be labeled by the eigenvalues of of the total angular momentum operator ${\displaystyle L^{2}={L_{1}}^{2}+{L_{2}}^{2}+{L_{3}}^{2}}$ and ${\displaystyle L_{3}}$:

${\displaystyle \{|l,m\rangle |l=0,1,...\land m=-l,...,l\}=\{|0,0\rangle ,|1,1\rangle ,|1,0\rangle ,|1,-1\rangle ,|2,2\rangle ,...\}}$

The three-parameter group generated by this algebra consists of the elements ${\displaystyle U(\mathbf {\theta } )=e^{-{\frac {i}{\hbar }}\theta _{i}J_{i}}}$. The ${\displaystyle J_{i}}$ are called the generators of rotation.

The algebra consists of a single element, the momentum operator ${\displaystyle P}$. The basis vectors of the representation space are labeled by the eigenvalues of ${\displaystyle P}$:

${\displaystyle \{|p\rangle |p\in \mathbb {R} \}}$

The elements of the one-parameter group are ${\displaystyle T(x)=e^{\frac {iPx}{\hbar }}}$ for ${\displaystyle x\in \mathbb {R} }$. ${\displaystyle P}$ is called the generator of translations.

The algebra of two non-interacting free particles consists of two commuting single particle momentum operators ${\displaystyle P\otimes 1}$ and ${\displaystyle 1\otimes P}$. The representation space in a tensor product of two single particle representation spaces. The basis vectors of the representation space are:

${\displaystyle \{|p_{1}\rangle \otimes |p_{2}\rangle |p_{1},p_{2}\in \mathbb {R} \}}$

${\displaystyle [M_{\mu \nu },M_{\rho \sigma }]=i(\eta _{\mu \rho }M_{\nu \sigma }-\eta _{\mu \sigma }M_{\nu \rho }-\eta _{\nu \rho }M_{\mu \sigma }+\eta _{\nu \sigma }M_{\mu \rho })}$

${\displaystyle [P_{\mu },P_{\nu }]=0}$

${\displaystyle [M_{\mu \nu },P_{\rho }]=M_{\mu \rho }P_{\nu }-M_{\nu \rho }P_{\mu }}$

${\displaystyle [M_{\mu \nu },M_{\rho \sigma }]=i(\eta _{\mu \rho }M_{\nu \sigma }-\eta _{\mu \sigma }M_{\nu \rho }-\eta _{\nu \rho }M_{\mu \sigma }+\eta _{\nu \sigma }M_{\mu \rho })}$

${\displaystyle [P_{\mu },P_{\nu }]=0}$

${\displaystyle [P_{\mu },{Q_{\alpha }}^{A}]=0}$

${\displaystyle [P_{\mu },{\bar {Q}}_{{\dot {\alpha }}A}]=0}$

${\displaystyle \{{Q_{\alpha }}^{A},{Q_{\beta }}^{B}\}=0}$

${\displaystyle \{{\bar {Q}}_{{\dot {\alpha }}A},{\bar {Q}}_{{\dot {\beta }}B}\}=0}$

${\displaystyle [M_{\mu \nu },P_{\rho }]=M_{\mu \rho }P_{\nu }-M_{\nu \rho }P_{\mu }}$

${\displaystyle [M_{\mu \nu },M_{\rho \sigma }]=i(\eta _{\mu \rho }M_{\nu \sigma }-\eta _{\mu \sigma }M_{\nu \rho }-\eta _{\nu \rho }M_{\mu \sigma }+\eta _{\nu \sigma }M_{\mu \rho })}$

${\displaystyle \{{Q_{\alpha }}^{A},{\bar {Q}}_{{\dot {\beta }}B}\}=2\sigma _{\alpha {\dot {\beta }}}^{\mu }P_{\mu }{\delta ^{A}}_{B}}$