Difference between revisions of "Outreach"
From Wolverhampton Light and Matter
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g_{{n_1},\cdots,{n_N},\Gamma}^{(N)}(\lbrace \tilde\omega_\mu \rbrace) \equiv \frac{\langle :\Pi_{\mu=1}^{N}{\xi_\mu^\dagger}^{n_\mu} (\tilde\omega_\mu) \xi_\mu^{n_\mu}(\tilde\omega_\mu): \rangle }{\Pi_{\mu=1}^{N} \langle {\xi_\mu^\dagger}^{n_\mu}(\tilde\omega_\mu) \xi_\mu^{n_\mu}(\tilde\omega_\mu) \rangle}\,, | g_{{n_1},\cdots,{n_N},\Gamma}^{(N)}(\lbrace \tilde\omega_\mu \rbrace) \equiv \frac{\langle :\Pi_{\mu=1}^{N}{\xi_\mu^\dagger}^{n_\mu} (\tilde\omega_\mu) \xi_\mu^{n_\mu}(\tilde\omega_\mu): \rangle }{\Pi_{\mu=1}^{N} \langle {\xi_\mu^\dagger}^{n_\mu}(\tilde\omega_\mu) \xi_\mu^{n_\mu}(\tilde\omega_\mu) \rangle}\,, | ||
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Revision as of 23:18, 29 March 2017
Look at this cool equation: $g_\Gamma^{(2)}(\omega_1,\omega_2)=1$.
The generalized correlation function is:
\begin{equation} \label{eq:1} g_{{n_1},\cdots,{n_N},\Gamma}^{(N)}(\lbrace \tilde\omega_\mu \rbrace) \equiv \frac{\langle :\Pi_{\mu=1}^{N}{\xi_\mu^\dagger}^{n_\mu} (\tilde\omega_\mu) \xi_\mu^{n_\mu}(\tilde\omega_\mu): \rangle }{\Pi_{\mu=1}^{N} \langle {\xi_\mu^\dagger}^{n_\mu}(\tilde\omega_\mu) \xi_\mu^{n_\mu}(\tilde\omega_\mu) \rangle}\,, \end{equation}