We want to obtain an expression for a one-body operator which conserves the number of particles.
Here we study the one-body operator for the kinetic energy plus an eventual external one-body potential.
The action of this operator on a particular \( n \)-body state with its pertinent expectation value has already
been studied in coordinate space.
In coordinate space the operator reads
$$
\begin{equation}
\hat{H}_0 = \sum_i \hat{h}_0(x_i) \tag{31}
\end{equation}
$$
and the anti-symmetric \( n \)-particle Slater determinant is defined as
$$
\Phi(x_1, x_2,\dots ,x_n,\alpha_1,\alpha_2,\dots, \alpha_n)= \frac{1}{\sqrt{n!}} \sum_p (-1)^p\hat{P}\psi_{\alpha_1}(x_1)\psi_{\alpha_2}(x_2) \dots \psi_{\alpha_n}(x_n).
$$