Atomic units

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The atomic units, abbreviated a.u. is a set of units used in atomic calculations.^[1][2] In the a.u. system any four of the five quantities charge e, mass m_e, action ℏ, length a₀, and energy E_h may be taken as base quantities, and other quantities are derived.^[3]

Example units

The expressions for a few example atomic units in terms of formulas in SI units are discussed next.

Length

In SI units the a.u. unit of length, the Bohr radius a₀ or bohr, is:^[4]

${\displaystyle a_{0}=\alpha /4{\rm {\pi }}R_{\infty }=4{\rm {\pi }}\epsilon _{0}\hbar ^{2}/m_{\rm {e}}e^{2}=\mathrm {0.52917720859(36)\ \times \ 10^{-10}\ m} \ ,}$

where R_∞ is the Rydberg constant.

Energy

The unit of energy, the hartree, is the energy of two a.u. charges separated by one bohr in a medium of permittivity given by 1 a.u. of permittivity, 4πε₀:

Failed to parse (syntax error): {\displaystyle E_h = \frac{1}{4\pi \varepsilon_0} \frac{e^2}{a_0} \ =\ \mathrm{ 4.359\ 744\ 17(75)\ \times \ 10^{−18}\ J}\ . }

Time

Somewhat unusually, time is a derived quantity, ℏ/E_h, with the interpretation as the period of an electron circling in the first Bohr orbit divided by 2π.^[5]

ℏ/E_h = 2.418 884 326 505(16) × 10⁻¹⁷ s

Velocity

Using the unit of time, and the expression for the hartree, the a.u. unit of velocity is:

${\displaystyle v_{B}=a_{0}/(\hbar /E_{h})={\frac {e^{2}}{4\pi \varepsilon _{0}\hbar }}=\alpha c_{0}\ ,}$

where the (dimensionless) fine structure constant α is given by (in SI units):

${\displaystyle \alpha ={\frac {e^{2}}{4\pi \varepsilon _{0}\hbar c_{0}}}\ ,}$

and has the value:^[6]

α =7.297 352 5376(50) × 10^-3 = 1/137.035 999 679(94).

Here, e is the elementary charge, ε₀ is the electric constant, ℏ is the reduced Planck's constant h/(2π), and c₀ is the SI units defined speed of light in classical vacuum.

The a.u. unit of velocity changes size with refinement in measurement of the fine structure constant. However, the defined value of c₀ = v_B/α is unaffected by such refinements.

Units

Evidently in atomic units, if we choose e, ℏ, m_e, and a₀ as the four basic units, then these entities all become 1 in algebraic expressions, and because a₀ = (4πε₀)(ℏ/e)²/m_e, it follows that 4πε₀ = 1 as well, defining the a.u. unit of permittivity. The hartree, E_h = (4πε₀)⁻¹ e²/a₀ also is automatically 1.

Here, c₀ = SI units defined value for the speed of light in classical vacuum, α = fine structure constant and μ_B is the Bohr magneton.^[8]

Notes