Post on 11-Nov-2014
description
Colby College
Variation Method- Helium If you guess a solution to the Schrödinger Equation, how do you find out how good a guess you have made? H
^ Ψi = Ei Ψi
can’t be solved exactly:
– h-2
2m ( )∇21 + ∇2
2 Ψi + 1
4πεo
–
Ze2
r1 –
Ze2
r2 +
e2
r12 Ψi = EiΨi
but you have : φ1 guess φ2 better guess φ3 better yet Eφ ≥ Ei
The Variation Theorem guarantees that the trial energy is always greater than the exact energy.
H
^ Ψi = Ei Ψi
∫ Ψ*i H
^ Ψi dτ = ∫ Ψ*
i Ei Ψi dτ
solve for Ei: Ei = ∫ Ψ*
i H ^ Ψi dτ
∫ Ψ*i Ψi dτ
is exact
Eφ = ∫ φ*H
^ φ dτ
∫ φ*φ dτ
Eφ ≥ Ei by the variation theorem
φgs = φ1s(r1) φ1s(r2) = 1π
Zeff
ao
3 e–Zeff r1/ao e–Zeff r2/ao Zeff : variation parameter
Eφ = ∫ φ*
gs H ^ φgs dτ
∫ φ*gs φgs dτ
= e2
4πεo ao
Z2
eff – 278 Zeff see Karplus and Porter 4.1.5
minimize by changing Zeff: dEφ
dZeff = 0 =
e2
4πεo ao (2 Zeff – 27/8)
Zeff = 27/16 = 1.6875
Egs = – 13.6 eV(Z2eff /n21 + Z2
eff /n22) = -77.5 eV (exp. -79.0 eV)
φ1s(r1) and φ1s(r2) are normalized eigenfunctions of one-electron Hamiltonians with charge Zeff :
– h-2
2m∇21 –
Zeff e2
4πεor1 φ1s(r1) = E1 φ1s(r1)
– h-2
2m∇22 –
Zeff e2
4πεor2 φ1s(r2) = E2 φ1s(r2)
normalization: ∫ φ*1s(r1) φ1s(r1) dτ1 = 1 ∫ φ*
1s(r2) φ1s(r2) dτ2 = 1
and eigenvalues: Ε1 = –½
e2
4πεo ao Z2
eff = -13.6 eV Z2eff Ε2 = –½
e2
4πεo ao Z2
eff = -13.6 eV Z2eff
E
Ei – exact
Eφ1
Eφ2
Eφ3
Colby College
The exact Hamiltonian uses the full nuclear charge Z = 2. We can split the Coulomb portion of the exact Hamiltonian using Z = Zeff + (Z – Zeff)
– h-2
2m∇21 –
Ze2
4πεor1 φ1s(r1) =
– h-2
2m∇21 –
Zeff e2
4πεor1 φ1s(r1) –
(Z – Zeff) e2
4πεor1 φ1s(r1)
– h-2
2m∇22 –
Ze2
4πεor2 φ1s(r2) =
– h-2
2m∇22 –
Zeff e2
4πεor2 φ1s(r2) –
(Z – Zeff) e2
4πεor2 φ1s(r2)
Both electrons are in the same 1s-orbital so these two previous equations give the same energies. The electrons are identical, except for spin. To calculate the expectation value of the exact Hamiltonian,
∫ φ*1s(r1) φ*
1s(r2) H ^ φ1s(r1) φ1s(r2) dτ, we find H
^ φ1s(r1) φ1s(r2) using the last two equations:
H
^ φgs = φ1s(r2)
– h-2
2m∇21 –
Ze2
4πεor1 φ1s(r1) + φ1s(r1)
– h-2
2m∇22 –
Ze2
4πεor2 φ1s(r2) +
e2
4πεor12 φ1s(r1)φ1s(r2)
= –
e2
4πεo ao Z2
eff φ1s(r1) φ1s(r2) – 2 (Z – Zeff) e
2
4πεor1 φ1s(r1) φ1s(r2) +
e2
4πεor12 φ1s(r1)φ1s(r2)
The variational energy for our guessed wave function is then:
Eφ = ∫ φ*1s(r1) φ*
1s(r2) H ^ φ1s(r1) φ1s(r2) dτ = –
e2
4πεo ao Z2
eff – 2⟨ (Z – Zeff) e
2
4πεor1 ⟩ + ⟨
e2
4πεor12 ⟩
The first expectation value is the difference in the Coulomb attraction of an electron with a nucleus of charge Z and a nucleus of charge Zeff:
–⟨ (Z – Zeff) e
2
4πεor1 ⟩ = – (Z – Zeff) ∫ φ*
1s(r1) φ*1s(r2)
e2
4πεo r1 φ1s(r1) φ1s(r2) dτ1dτ2
= – (Z – Zeff) ∫ φ*1s(r2) φ1s(r2) dτ2 ∫ φ*
1s(r1) e2
4πεo r1 φ1s(r1) dτ1
normalization ⟨V⟩
The first integral is the normalization for electron-2. The second integral is the expectation value of the potential energy for a one-electron atom with nuclear charge Zeff, ⟨V⟩, see Problem 25.5.
–⟨ (Z – Zeff) e
2
4πεor1 ⟩ = – (Z – Zeff)
Zeff e
2
4πεo ao
We evaluated the expectation value of the electron-electron repulsion for our perturbation treatment of the helium atom. We only need to substitute Zeff for Z:
⟨ e2
4πεor12 ⟩ = ∫ φ*
1s(r1) φ*1s(r2)
e2
4πεor12 φ1s(r1) φ1s(r2) dτ1dτ2 =
5Zeff
8
e2
4πεo ao
Setting Z = 2 gives the final result:
Eφ =
e2
4πεo ao( – Z2
eff – 2 ZZeff + 2 Z2eff +
5Zeff
8 )
Eφ = e2
4πεo ao
Z2
eff – 278 Zeff = 27.211 eV
Z2
eff – 278 Zeff