G3B3 theory - using B3LYP geometries

G3B3 (or G3//B3LYP) is a variant of G3 theory in which structures and zero point vibrational energies are calculated at the Becke3LYP/6-31G(d) level of theory. This is particularly advantageous for larger systems and for open shell systems showing large spin contamination. The G3//B3LYP energy at 0 degree Kelvin E₀(G3B3) is defined as:

E₀(G3B3) = E[QCISD(T,FC)/6-31G(d)//B3LYP/6-31G(d)]
        + DE(+)
        + DE(2df,p)
        + DE(G3large)
        + DE(HLC)
        + ZPE
        + DE(SO)

The definition of the components being:

DE(+) = E[MP4(FC)/6-31+G(d)//B3LYP/6-31G(d)] - E[MP4(FC)/6-31G(d)//B3LYP/6-31G(d)]

DE(2df,p) = E[MP4(FC)/6-31G(2df,p)//B3LYP(6-31G(d)] - E[MP4(FC)/6-31G(d)//B3LYP/6-31G(d)]

DE(G3large) = E[MP2(FULL)/G3large//B3LYP/6-31G(d)] - E[MP2(FC)/6-31G(2df,p)//B3LYP/6-31G(d)]
                         - E[MP2(FC)/6-31+G(d)//B3LYP/6-31G(d)] + E[MP2(FC)/6-31G(d)//B3LYP/6-31G(d)]

DE(HLC) = -An(beta) - B(n(alpha) - n(beta))
                     A = 6.760 mHartrees; B = 3.233 mHartrees (for molecules)
                     A = 6.786 mHartrees; B = 1.269 mHartrees (for atoms)
                     n(alpha) = No. of alpha valence electrons
                     n(beta) = No. of beta valence electrons

ZPE = 0.960 * ZPE[B3LYP/6-31G(d)]

The necessary energies can be calculated most efficiently in the following sequence:

Optimization and frequency calculation at the B3LYP/6-31G(d) level of theory
QCISD(T,FC)/6-31G(d)//B3LYP/6-31G(d) single point
MP4(FC)/6-31+G(d)//B3LYP/6-31G(d) single point
MP4(FC)/6-31G(2df,p)//B3LYP/6-31G(d) single point
MP2(Full)/G3large//B3LYP/6-31G(d) single point

Comments:

The G3large basis set used in G3B3 is identical to the one used in G3 theory. In contrast to
G2 theory using a 6-311+G(3df) basis set for all first and second row elements, a slightly smaller
6-311+G(2df) basis has now been chosen for the first row elements, while a larger 6-311+G(3d2f)
basis has been chosen for the second row elements. In both cases core polarization functions
(e.g. p- and d-type for carbon) have also been added. Hydrogen is still treated with a 311+G(2p)
basis. A local copy of the G3large basis set can be found here.
Open shell systems are treated using unrestricted Kohn-Sham orbitals (UB3LYP)
The higher level correction (HLC) is included to compensate for remaining deficiencies
of the method. As in G3 theory, separate values for parameters A and B have been
optimized for atoms and molecules to give the smallest average absolute deviation
from experiment.
Spin orbit correction terms E(SO) (mainly of experimental origin) are added only for atoms.
The mean absolute deviation for the extended G2 neutral set (148 reaction energies)
is 0.93 kcal/mol.

Literature:

L. A. Curtiss, K. Raghavachari, P. C. Redfern, V. Rassolov, J. A. Pople,
"Gaussian-3 (G3) theory for molecules containing first and second-row atoms"
J. Chem. Phys. 1998, 109, 7764 - 7776.
L. A. Curtiss, K. Raghavachari,
"G2 Theory"
The Encyclopedia of Computational Chemistry, P. v. R. Schleyer (editor-in-chief),
John Wiley & Sons Ltd, Athens, USA, 1998, 2, 1104 - 1114.
A. G. Baboul, L. A. Curtiss, P. C. Redfern, K. Raghavachari,
"Gaussian-3 theory using density functional geometries and zero-point energies"
J. Chem. Phys. 1999, 110, 7650 - 7657.