Hartree-Fock approach to Phase Transitions
Hartree-Fock in second quantized form
The interaction energy operator for a two body system with pairwise interactions is given by
In the above operator, it is important to note the order of the operators. Including the kinetic energy term we can write the Hamiltonian for particles of mass m with pairwise interactions in second quantized formalism as
The first-order correction to the energy induced by the interaction is
Define 
Then, we find that
![{\displaystyle E^{(1)}={\frac {1}{2}}\int d^{3}rd^{3}r^{\prime }v({\vec {r}}-{\vec {r}}^{\prime })[n^{2}-\sum _{\sigma }G_{\sigma }({\vec {r}}-{\vec {r}}^{\prime })^{2}]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/66d033e204abfb5f7bbfd220c4f241b53da68304)
Second Quantization
This is just a practice.
Let's write an integral -
(You can find intermediate steps in "Lectures on Quantum Mechanics" by Gordon Baym).
The first term in 
is called the Hartree energy or direct energy. The second term is called the Fock term and it corresponds to the energy due to exchange interactions.