130_notes.dvi

(Frankie) #1

By settingd〈dyH〉= 0, we can get the distance between atoms and the energy.


Distance Energy
Calculated 1.3 ̊A -1.76 eV
Actual 1.06 ̊A -2.8 eV

Its clear we would need to introduce some wfn. parameters to get good precision.


27.2 The H 2 Molecule


The H 2 molecule consists of four particles bound together: e 1 ,e 2 , protonA, and protonB. The
Hamiltonian can be written in terms of the H+ 2 Hamiltonian, the repulsion between electrons, plus
a correction term for double counting the repulsion between protons.


H=H 1 +H 2 +

e^2
r 12


e^2
RAB

H 1 =

p^21
2 m


e^2
rA 1


e^2
rB 1

+

e^2
RAB

We wish to compute variational upper bound onRABand the energy.


We will again use symmetric electron wavefunctions,


ψ(r 1 ,r 2 ) =

1

2[1 +S(RAB)]

[ψA(~r 1 ) +ψB(~r 1 )] [ψA(~r 2 ) +ψB(~r 2 )]χs
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