Différences entre les versions de « VBTutorial3 »
| Ligne 41 : | Ligne 41 : | ||
== Exercice 2 : computation of X—X + X. -> X. + X—X radical exchange VBSCD diagram for X=H,Li == | == Exercice 2 : computation of X—X + X. -> X. + X—X radical exchange VBSCD diagram for X=H,Li == | ||
| − | + | 1/ Paper exercice :<br> | |
[[File:vb-diagram.png]] | [[File:vb-diagram.png]] | ||
| − | + | ||
| + | a/ Considering the following radical exchange process: <br> | ||
<math> | <math> | ||
| − | X\ | + | X^{\bullet} + A-Y \rightarrow X-A + ^{\bullet}Y |
| − | </math> | + | </math> <br> |
Write the HL wave functions for R and R* and derive the value of G using semiempirical VB theory. | Write the HL wave functions for R and R* and derive the value of G using semiempirical VB theory. | ||
| + | b/ Considering the following reaction:<br> | ||
| + | <math> | ||
| + | X^{\bullet} + H-X \rightarrow X-H +^{\bullet}X | ||
| + | </math> <br> | ||
| + | Use semiempirical VB theory to derive the following expression for the avoided cross term B: <br> | ||
| + | <math> | ||
| + | B=0.25\Delta E^{'}_{ST} (H-X) | ||
| + | </math> <br> | ||
| + | Where ∆E´ST is the singlet-triplet transition energy of the X-H bond at the geometry of the transition state. | ||
| − | + | c/ | |
| − | |||
| − | |||
## Exercice 6.6 questions a),b) and c) | ## Exercice 6.6 questions a),b) and c) | ||
## Exercice 6.6 question d) | ## Exercice 6.6 question d) | ||
## Exercice 6.6 question e) | ## Exercice 6.6 question e) | ||
| − | + | ||
| + | |||
| + | 2/ Computer exercise : | ||
''idea : Compute VBSCD diagrams for X—X + X. -> X. + X—X X=H, Li at VBSCF then VBCI level. To be written...'' | ''idea : Compute VBSCD diagrams for X—X + X. -> X. + X—X X=H, Li at VBSCF then VBCI level. To be written...'' | ||
Version du 10 juin 2012 à 13:23
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Remarks
Exercices
Exercice 1 (paper exercice) : Conical intersection in H3• radical
(for further reading, see S. Shaik and P.C. Hiberty, "The Chemist's Guide to VB theory", Wiley, Hoboken, New Jersey, 2008, pp. 157-161, exercises 6.11-6.14 pp. 174-176, and answers to the exercises pp. 188-192.
Consider three hydrogen atoms Ha, Hb, Hc, with respective atomic orbitals a, b and c, and the two VB structures 
] and 
] .
The Ha-Hb and Hb-Hc distances are equal. 
- By using the thumb rules recalled below, where squared overlap terms are neglected, derive the expression of the energies of R and P, and of the reduced Hamiltonian matrix element between R and P for the 3-orbital/3-electrons reacting system [Ha--Hb--Hc]•.
- From the sign of this latter integral when θ > 60°, derive the expressions of the ground state Ψ≠ and of the first excited state Ψ* of the H3• system. One may drop the normalization constants for simplicity. What bonding scheme does the excited state represent ?
- Show that the reduced Hamiltonian matrix element is largest in the collinear transition state geometry, and drops to zero in the equilateral triangular structure.
- Show that R and P VB structures are degenerate in the equilateral triangular structure, and that Ψ≠ and Ψ* are also degenerate in this geometry.
- We now extend the above conclusions to the allyl radical. What are the bonding schemes corresponding to the ground state and first excited state ? What geometrical distortion would make these two states degenerate ? What would be the end product of a photochemical excitation of allyl radical to its first excited state ?
Appendix : Thumb rules for the calculations of effective Hamiltonian matrix elements between determinants.
- Energy of a determinant D :
] (if orbitals i and j have parallel spins) - Matrix element between determinants differing by spin inversion of two spin-orbitals :
]
.png){kind=small}
Exercice 2 : computation of X—X + X. -> X. + X—X radical exchange VBSCD diagram for X=H,Li
1/ Paper exercice :
a/ Considering the following radical exchange process:
<math>
X^{\bullet} + A-Y \rightarrow X-A + ^{\bullet}Y
</math>
Write the HL wave functions for R and R* and derive the value of G using semiempirical VB theory.
b/ Considering the following reaction:
<math>
X^{\bullet} + H-X \rightarrow X-H +^{\bullet}X
</math>
Use semiempirical VB theory to derive the following expression for the avoided cross term B:
<math>
B=0.25\Delta E^{'}_{ST} (H-X)
</math>
Where ∆E´ST is the singlet-triplet transition energy of the X-H bond at the geometry of the transition state.
c/
- Exercice 6.6 questions a),b) and c)
- Exercice 6.6 question d)
- Exercice 6.6 question e)
2/ Computer exercise :
idea : Compute VBSCD diagrams for X—X + X. -> X. + X—X X=H, Li at VBSCF then VBCI level. To be written...
Exercice 3 : Computation of state correlation Diagrams for a 3 centers / 4 electrons system
Sason's remark :
" F(-) + H-F example is not good by itself, unless you also do F• + H-F - showing that in one case you have an intermediate FHF(-) and in the other case you have a high barrier.
If we just want to do one case of 4-electron/3-center reaction, we should use Cl(-) + CH3Cl.
The audience will appreciate a more chemical example, which is Cl(-) + CH3Cl. "
Benoît's proposition :
- Paper exercice :
- Exercice 6.12 question a) (from Sason & Philippe's book)
- Exercice 6.12 question b)
- Computer exercise :
idea : Compute VBSCD diagrams for Cl(-) + CH3Cl -> ClCH3 + Cl(-), at D-BOVB levels, first in gas phase then using VB(PCM)... Which basis set should we use : 6-31+G*. As this is an anion we should add a set of diffuse functions, but then there may be trouble with BOVB... Check first that everything is fine at BOVB level (no instability)...