4.7.2 Dual-Basis MP2

The dual-basis approximation can also be used for the reference energy of a correlated second-order Møller-Plesset (MP2) calculation. ¹¹⁷⁰ Steele R. P. et al.
J. Chem. Phys.
(2006), 125, pp. 074108. Link ^{, 1169} Steele R. P., DiStasio, Jr. R. A., Head-Gordon M.
J. Chem. Theory Comput.
(2009), 5, pp. 1560. Link When activated, the dual-basis HF energy is first calculated as described above; subsequently, the MO coefficients and orbital energies are used to calculate the correlation energy in the large basis. This technique is particularly effective for RI-MP2 calculations (see Section 6.6), in which the cost of the underlying SCF calculation often dominates.

Furthermore, efficient analytic gradients of the DB-RI-MP2 energy have been developed ²⁹⁸ DiStasio, Jr. R. A., Steele R. P., Head-Gordon M.
Mol. Phys.
(2007), 105, pp. 2731. Link and added to Q-Chem. These gradients allow for the optimization of molecular structures with RI-MP2 near the basis set limit. Typical computational savings are on the order of 50% (aug-cc-pVDZ) to 71% (aug-cc-pVTZ). Resulting dual-basis errors are only 0.001 Å in molecular structures and are, again, significantly less than use of a smaller basis set alone.