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# Localized molecular orbitals

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### Localized molecular orbitals

Localized molecular orbitals are molecular orbitals which are concentrated in a limited spatial region of a molecule, for example a specific bond or a lone pair on a specific atom. They can be used to relate molecular orbital calculations to simple bonding theories, and also to speed up post-Hartree–Fock electronic structure calculations by taking advantage of the local nature of electron correlation.

Standard ab initio quantum chemistry methods lead to delocalized orbitals that, in general, extend over an entire molecule and have the symmetry of the molecule. Localized orbitals may then be found as linear combinations of the delocalized orbitals, given by an appropriate unitary transformation.

In the water molecule for example, ab initio calculations show bonding character primarily in two molecular orbitals, each with electron density equally distributed among the two O-H bonds. The localized orbital corresponding to one O-H bond is the sum of these two delocalized orbitals, and the localized orbital for the other O-H bond is their difference; as per Valence bond theory.

For multiple bonds and lone pairs, different localization procedures give different orbitals. The Boys and Edmiston-Ruedenberg localization methods mix these orbitals to give equivalent bent bonds in ethylene and rabbit ear lone pairs in water, while the Pipek-Mezey method preserves their respective σ and π symmetry.

## Contents

• Equivalence of localized and delocalized orbital descriptions 1
• Computation methods 2
• Boys 2.1
• Edmiston-Ruedenberg 2.2
• Pipek-Mezey 2.3
• References 3

## Equivalence of localized and delocalized orbital descriptions

For molecules with a closed electron shell, in which each molecular orbital is doubly occupied, the localized and delocalized orbital descriptions are in fact equivalent and represent the same physical state. It might seem, again using the example of water, that placing two electrons in the first bond and two other electrons in the second bond is not the same as having four electrons free to move over both bonds. However, in quantum mechanics all electrons are identical and cannot be distinguished as same or other. The total wavefunction must have a form which satisfies the Pauli exclusion principle such as a Slater determinant (or linear combination of Slater determinants), and it can be shown [1] that if two electrons are exchanged, such a function is unchanged by any unitary transformation of the doubly occupied orbitals.

## Computation methods

Localized molecular orbitals (LMO)[2] are obtained by unitary transformation upon a set of canonical molecular orbitals (CMO). The transformation usually involves the optimization (either minimization or maximization) of the expectation value of a specific operator. The generic form of the localization potential is:

\langle \hat{L} \rangle = \sum_{i=1}^{n} \langle \phi_i \phi_i | \hat{L} | \phi_i \phi_i \rangle ,

where \hat{L} is the localization operator and \phi_i is a molecular spatial orbital. Many methodologies have been developed during the past decades, differing in the form of \hat{L}.

### Boys

The Boys (also known as Foster-Boys) localization method minimizes the spatial extent of the orbitals by minimizing \langle \hat{L} \rangle , where \hat{L} = |\vec{r}_1 - \vec{r}_2|^2 . This turns out to be equivalent[3][4] to the easier task of maximizing \sum_{i>j}^{n}[ \langle \phi_i | \vec{r} | \phi_i \rangle - \langle \phi_j | \vec{r} | \phi_j \rangle ] ^2 .

### Edmiston-Ruedenberg

Edmiston-Ruedenberg localization maximizes the electronic self-repulsion energy by maximizing \langle \hat{L} \rangle , where \hat{L} = |\vec{r}_1 - \vec{r}_2|^{-1} .

### Pipek-Mezey

Pipek-Mezey localization[5] takes a slightly different approach, maximizing the sum of orbital-dependent partial charges on the nuclei:

   \langle \hat{L} \rangle_\textrm{PM} = \sum_{A}^{\textrm{atoms}} \sum_{i}^{\textrm{orbitals}} |q_i^A|^2 .


Pipek and Mezey originally used Mulliken charges, but also Löwdin charges have been used. A Pipek-Mezey scheme based on intrinsic atomic orbital charges has also been recently proposed.[5]

Schemes based on the partitioning of the overlap matrix into Bader regions[6][7] or "fuzzy atom" regions[8] have been proposed, but these have been shown to be equivalent to Pipek-Mezey with Bader or "fuzzy atom" charges.[9]

Rather surprisingly, analysis of the Pipek-Mezey method with a wide variety of choices for the partial charges has shown that the localized orbitals are in insensitive to the actual charges used in the localization process.[9] As Mulliken and Löwdin charges are mathematically ill defined, the alternative charge analysis methods provide competitive alternatives for the localization process.

## References

1. ^ Levine I.N., “Quantum Chemistry” (4th ed., Prentice-Hall 1991) sec.15.8
2. ^ Jensen, Frank (2007). Introduction to Computational Chemistry. Chichester, England: John Wiley and Sons. pp. 304–308.
3. ^ Kleier, Daniel; J. Chem. Phys. 61, 3905 (1974) (1974). "Localized molecular orbitals for polyatomic molecules. I. A comparison of the Edmiston-Ruedenberg and Boys localization methods" 61 (10). Journal of Chemical Physics. pp. 3905–3919.
4. ^ Introduction to Computational Chemistry by Frank Jensen 1999, page 228 equation 9.27
5. ^ a b Pipek, János; Mezey, Paul G. (1989). "A fast intrinsic localization procedure applicable for ab initio and semiempirical linear combination of atomic orbital wave functions". The Journal of Chemical Physics 90 (9): 4916.
6. ^ J. Cioslowski, J. Math. Chem. 8, 169 (1991)
7. ^ Cioslowski, J. (1991). "Partitioning of the orbital overlap matrix and the localization criteria". Journal of Mathematical Chemistry 8 (1): 169–178.
8. ^ Alcoba, Diego R.; Lain, Luis; Torre, Alicia; Bochicchio, Roberto C. (15 April 2006). "An orbital localization criterion based on the theory of “fuzzy” atoms". Journal of Computational Chemistry 27 (5): 596–608.
9. ^ a b Lehtola, Susi; Jónsson, Hannes (10 December 2013). "Unitary Optimization of Localized Molecular Orbitals". Journal of Chemical Theory and Computation 9 (12): 5365–5372.
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