Différences entre les versions de « VBTutorial1 »
Ligne 49 : | Ligne 49 : | ||
[[Answer_Exercise1|>> Answer]] | [[Answer_Exercise1|>> Answer]] | ||
− | == Exercice 2 | + | == Exercice 2 : Simple diatomics molecules == |
=== Subject === | === Subject === | ||
− | + | First contact with XMVB on simple diatomics. Examination of the effect of correlation on weights, and bond energies. Calculation of a pure covalent state and (charge-shift) resonance energy. | |
=== To do === | === To do === | ||
+ | * Compute of H2 at the VBSCF level. | ||
+ | * Compute HF at the VBSCF, VBCI, and D-BOVB levels. Compute bond energy. Compute a single covalent structure, and deduce the charge-shift resonance energy. | ||
+ | * Same question for F2 | ||
=== Access to files : === | === Access to files : === |
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To the Tutors
Sason remarks and prospective 2 hours talk +
Philippe's remark on the initially proposed tutorial. are included in bold.
Qualitative
- Exercices from The Book ... >PCH< (30')
Computational
- FH (2 structures), F2 : VBSCF, different correlation wave functions (BOVB, VBCI,...), computation of weights and "charge-shift" character, also compare to CASSCF wave functions in the same basis set (probably to provide in order to avoid to spend time there).
- R-X bond dissociation to R. .X and R(+) (-)X for stable ionic dissociation ... via solvent effects? (is that possible with xiamen ?)
Exercices
Exercise 1 (paper exercise) : The lone pairs of H2O
This exercise aims at comparing two descriptions of the lone pairs of H2O : (i) the MO description in terms of non-equivalent canonical MOs and (ii) the « rabbit-ear » VB description in terms of two equivalent hybrid orbitals.
- Focusing on the lone pairs only, write the four-electron single-determinants MO and VB.
- Expand VB into elementary determinants containing only n and p orbitals, eliminate determinants having two identical spinorbitals, and show the equivalence between VB and MO.
- We now remove one electron from H2O. Write the two possible VB structures 1 and 2 in the VB framework.
- The two ionized states are the symmetry-adapted combinations and . From the sign of the hamiltonian matrix element , give the energy ordering of the two ionized states.
- By expanding the two ionized states into elementary determinants (dropping the normalization constants), show that they are equivalent, respectively, to the MO configurations and .
Appendix
Hamiltonian matrix element between determinants differing by one spin-orbital :
Exercice 2 : Simple diatomics molecules
Subject
First contact with XMVB on simple diatomics. Examination of the effect of correlation on weights, and bond energies. Calculation of a pure covalent state and (charge-shift) resonance energy.
To do
- Compute of H2 at the VBSCF level.
- Compute HF at the VBSCF, VBCI, and D-BOVB levels. Compute bond energy. Compute a single covalent structure, and deduce the charge-shift resonance energy.
- Same question for F2