Why not use Slater-type orbitals, which describe atoms more accurately?

Slater functions give better cusp and tail behavior but their multicenter integrals are very expensive; Gaussians sacrifice some accuracy per function for analytic, fast integrals, and several Gaussians are combined to mimic a Slater orbital.

What does adding diffuse functions accomplish?

Diffuse functions extend the basis far from the nuclei and are important for anions, excited states, and weakly bound or long-range interactions.

Basis Sets and Gaussian Orbitals

Basis sets are the finite collections of functions used to expand molecular orbitals; the use of Gaussian-type functions made these expansions efficient enough for routine molecular computation.

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Definition

A predefined set of mathematical functions centered on atoms that, in linear combination, approximate the one-electron orbitals of a molecular calculation.

Scope

Covers the representation of orbitals as linear combinations of basis functions, the choice of Gaussian-type over Slater-type orbitals, contracted and split-valence sets, polarization and diffuse functions, correlation-consistent families and their systematic convergence, and the basis-set superposition error.

Core questions

Why are Gaussian functions preferred over the physically more accurate Slater functions?
What do split-valence, polarization, and diffuse functions each add?
How do correlation-consistent basis sets enable extrapolation to the complete-basis-set limit?
What is basis-set superposition error and how is it corrected?

Key theories

Gaussian product theorem: The product of two Gaussians centered on different atoms is itself a Gaussian, which makes the four-center electron-repulsion integrals analytically tractable and underlies the dominance of Gaussian basis sets.
Correlation-consistent basis sets: Hierarchical basis-set families designed so that energies converge smoothly toward the complete-basis-set limit, enabling systematic extrapolation of correlated results.

Clinical relevance

Basis-set choice is the single most consequential practical decision in a quantum-chemistry calculation, controlling the trade-off between accuracy and cost and determining whether computed properties are trustworthy.

History

Boys proposed Gaussian basis functions in 1950 to make molecular integrals tractable; subsequent decades produced Pople's split-valence sets and Dunning's correlation-consistent families, which together standardized the basis-set landscape of modern quantum chemistry.

Key figures

S. Francis Boys
Thom Dunning
John Pople
Frank Jensen

Seminal works

boys1950
dunning1989

Frequently asked questions

Why not use Slater-type orbitals, which describe atoms more accurately?: Slater functions give better cusp and tail behavior but their multicenter integrals are very expensive; Gaussians sacrifice some accuracy per function for analytic, fast integrals, and several Gaussians are combined to mimic a Slater orbital.
What does adding diffuse functions accomplish?: Diffuse functions extend the basis far from the nuclei and are important for anions, excited states, and weakly bound or long-range interactions.