50015 Many-body approaches to studies of electronic systems: Hartree-Fock theory and Density Functional Theory
15.3 Expectation value of the Hamiltonian with a given Slater determinant
We rewrite our Hamiltonian
Hˆ=−N
∑
i= 11
2 ∇
2
i−N
∑
i= 1Z
ri+N
∑
i<j1
ri j,as
Hˆ=Hˆ 0 +HˆI=N
∑
i= 1hˆi+N
∑
i<j= 11
ri j, (15.6)
where
hˆi=−^1
2 ∇
2
i−Z
ri. (15.7)The first term of Eq. (15.6),H 1 , is the sum of theNidenticalone-bodyHamiltonianshˆi. Each
individual Hamiltonianhˆicontains the kinetic energy operator of an electron and its potential
energy due to the attraction of the nucleus. The second term,H 2 , is the sum of theN(N− 1 )/ 2
two-body interactions between each pair of electrons. Let us denote the ground state energy
byE 0. According to the variational principle we have
E 0 ≤E[Φ] =∫
Φ∗HˆΦdτ (15.8)whereΦis a trial function which we assume to be normalized
∫
Φ∗Φdτ= 1 , (15.9)
where we have used the shorthanddτ=dr 1 dr 2 ...drN. In the Hartree-Fock method the trial
function is the Slater determinant of Eq. (15.1) which can berewritten as
Ψ(r 1 ,r 2 ,...,rN,α,β,...,ν) =√^1
N!∑P(−)PPψα(r 1 )ψβ(r 2 )...ψν(rN) =√
N!AΦH, (15.10)
where we have introduced the anti-symmetrization operatorA defined by the summation
over all possible permutations of two eletrons. It is definedas
A=1
N!∑P
(−)PP, (15.11)
with the the Hartree-function given by the simple product ofall possible single-particle func-
tion (two for helium, four for beryllium and ten for neon)
ΦH(r 1 ,r 2 ,...,rN,α,β,...,ν) =ψα(r 1 )ψβ(r 2 )...ψν(rN). (15.12)BothHˆ 0 andHˆIare invariant under electron permutations, and hence commute withA[H 0 ,A] = [HI,A] = 0. (15.13)Furthermore,A satisfies
A^2 =A, (15.14)
since every permutation of the Slater determinant reproduces it. The expectation value ofHˆ 0
∫
Φ∗Hˆ 0 Φdτ=N!
∫
ΦH∗AHˆ 0 AΦHdτ