User:Alexandriahong/Second-order Jahn-Teller distortion in main-group element compounds

Second-order Jahn-Teller distortion is a singular, general, and powerful approach rigorously based in first-principle vibronic coupling interactions. It enables prediction and explication of molecular geometries that are not necessarily satisfactorily or even correctly explained by semi-empirical theories such as Walsh diagrams, atomic state hybridization, valence shell electron pair repulsion (VSEPR), softness-hardness-based models, aromaticity and antiaromaticity, hyperconjugation, etc.

The application to main-group element compounds utilizes principles of group theory and symmetry. A molecule will distort in order to maximize symmetry-allowed interactions between the highest occupied molecular orbitals and lowest unoccupied molecular orbitals, and thereby stabilize the HOMOs and destabilize the LUMOs (resulting in the overall stabilization of the molecule). Direct products are used to determine the allowedness of a given interaction: the interaction is allowed if the product of the symmetry of the excited state, the symmetry of the vibration, and the symmetry of ground state contains the totally symmetry irreducible representation of the molecule’s point group. The extent of second-order Jahn-Teller distortion is inversely proportional to the energy difference between orbitals. For heavier main-group compounds, molecular orbital interactions are larger due to the decreasing bond strength resulting in a smaller energy difference between the interacting orbitals.

Geometries of heavier group 13 and 14 analogues of multiply bound species
Group 14 analogues of alkenes and alkynes have previously been prepared. Moving down the group, the compounds become increasing geometric distortion, becoming increasingly trans-bent from the original linear geometry and displaying increasingly limited shortening of the multiple bond. These patterns are also observed in group 13 multiply-bonded compounds. These geometry trends are rationalized below.

Hybridization
This trend can be rationalized with hybridization – moving down a group, the gap between the ns and np orbitals widens and there is an increasing mismatch between valence orbital sizes. The mismatch leads to lower hybridization – that is, increased nonbonding character on each of the heavier group 13 or 14 atoms involved in multiple bonding, which manifests as increased deviation from the typically expected linear and planar geometries. This rationalization is not especially cohesive with the typical approach to multiple bonds in organic chemistry – that is, a single σ-bond and one or two π-bonds.

==== Double donor-acceptor bonding ==== This rationalization is simple and preserves the double-bond nature of the group 13 or 14 atom interaction. The multiple bond is not exactly a typical σ+π interaction; rather the two halves of the alkyne analogue are treated as singlet bent monomers and the multiple bond is treated as an aggregation between them, with the spxpy-hybridized filled orbital on one group 13 or 14 atom donating to the vacant pz of the other.

==== Valence bond resonating lone pair ==== This rationalization is consistent with valence bond theory and suggests a weakened E-E multiple bond. The electron pair is described as resonating between the two group 13 or 14 atoms, and the resonance is favored by occupation of the empty (but not mandatorily vacant) orbital.

Second-order Jahn-Teller distortion approach
Second-order Jahn-Teller distortion provides a rigorous and first-principles approach to the distortion problem. The interactions between the HOMOs and LUMOs  to afford a new set of molecular orbitals is an example of second-order Jahn-Teller distortion.

Cis- and trans-pyramidalization of alkene analogues
The trans-pyramidalization distortion is taken as an example. The frontier molecular orbitals of the undistorted alkene possessing D2h symmetry have symmetries ag (HOMO-1), b2u (HOMO), b1g (LUMO), and b3u (LUMO+1). The symmetry of the trans-pyramidalization vibration is b1g. A triple product of ground state, vibrational mode, and excited state that can be taken is b2u (HOMO) x b1g (trans-pyramidalizing vibrational mode) x b3u (LUMO+1) = a1g. Since a1g is the totally symmetric representation, the b2u and b3u molecular orbitals participate in an allowed interaction through the trans-pyramidalizing vibrational mode. The molecule will distort in a trans-pyramidal fashion (into C2h symmetry) in order to enable this interaction, which produces a more stabilized HOMO and more destabilized LUMO.

This treatment can be repeated for all other combinations of HOMO-1, HOMO and LUMO, LUMO+1. Notably, it is found that the HOMO and LUMO are symmetry-disallowed to mix.

Cis- and trans-bending of alkyne analogues
This distortion can be treated in the same fashion, using the triple product to determine whether or not the distortion from the undistorted linear D∞h symmetry will produce a symmetry-allowed interaction (and therefore, whether or not the distortion will occur).

Pyramidalization and inversion of trivalent group 15 compounds and group 14 radicals
The pyramidalization and energies of inversion of group 15 :MR3 (M = N, P, As, Sb, Bi) and group 14 •MR3 molecules can also be predicted and rationalized using a second-order Jahn-Teller distortion treatment. The “parent” planar molecule possessing D3h symmetry has frontier orbitals of a2” (HOMO) and a1’ (LUMO) symmetries. The pyramidalizing vibration mode has symmetry a2”. The triple product yields the totally symmetric representation a1’, indicating that the molecule will indeed pyramidalize into C3v symmetry.

The energies of inversion can also be predicted and compared. Due to lower energy overlap between the 3s/3p and 1s orbitals in PH3 (versus between 2s/2p and 1s in NH3), the HOMO-LUMO energy gap in PH3 will be smaller than that of NH3. This allows for a stronger interaction between the HOMO and LUMO in second-order Jahn-Teller fashion. The distortion stabilizes the HOMO and destabilizes the LUMO, resulting in a larger barrier to inversion in PH3.

== Tetrahedral geometry of tetravalent second- and third-row main-group-element hydrides == Tetravalent main-group-element hydrides of form APH4 (AP = B-, C, N+, O2+, Al-, Si, P+, and S2+, where AP is a tetravalent atom or ion) are known to be distort from the square planar to tetrahedral geometry. For all APH4 systems in D4h symmetry, the ground state is a1g. The exact electronic configuration, however, is dependent on the electronegativity of the main group element. The distortion to tetrahedral geometry has b2u symmetry. For these APH4 systems, the a2u→b1g* and eu→eg* one-electron charge-transfer transitions are most active in the b2u mode.