Difference between revisions of "Atomic Units"
imported>Idimitro m (→Atomic Units) |
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the three fundamental constants that appear in the hydrogen Hamiltonian, <math>\hbar=m=e=1</math>. One thus arrives at atomic units, such as | the three fundamental constants that appear in the hydrogen Hamiltonian, <math>\hbar=m=e=1</math>. One thus arrives at atomic units, such as | ||
− | * length: Bohr radius = <math>a_0=\frac{\hbar^2}{me^2}=\frac{1}{\alpha}\frac{\hbar}{mc}=0.53 | + | <!--<math>\def\AA\unicode{x212B}</math>--> |
+ | |||
+ | * length: Bohr radius = <math>a_0=\frac{\hbar^2}{me^2}=\frac{1}{\alpha}\frac{\hbar}{mc}=0.53 A </math> | ||
* energy: 1 hartree = <math>\frac{e^4 m}{\hbar^2}=(\frac{e^2}{c\hbar})^2mc^2=\alpha^2 mc^2=27.2\ \textrm{eV}</math> | * energy: 1 hartree = <math>\frac{e^4 m}{\hbar^2}=(\frac{e^2}{c\hbar})^2mc^2=\alpha^2 mc^2=27.2\ \textrm{eV}</math> | ||
* velocity: <math>m v^2=\frac{e^{4}m}{\hbar^2}\Rightarrow v=\frac{e^2}{\hbar}=\alpha\cdot | * velocity: <math>m v^2=\frac{e^{4}m}{\hbar^2}\Rightarrow v=\frac{e^2}{\hbar}=\alpha\cdot | ||
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The ''fine structure constant'' <math>\alpha</math> obtained its name from the appearance of <math>\alpha^2</math> in the ratio of fine structure splitting to the Rydberg; it is the only fundamental constant in atomic physics. As such, it should ultimately be predicted by a complete theory of physics. Whereas precision measurements of other constants are made in atomic physics for purely metrological purposes <!-- (see Appendix \ref{app:metrology) ) -->, <math>\alpha</math>, as a dimensionless constant, is not defined by metrology. Rather, <math>\alpha</math> characterizes the strength of the electromagnetic interaction, as the following example will illustrate. | The ''fine structure constant'' <math>\alpha</math> obtained its name from the appearance of <math>\alpha^2</math> in the ratio of fine structure splitting to the Rydberg; it is the only fundamental constant in atomic physics. As such, it should ultimately be predicted by a complete theory of physics. Whereas precision measurements of other constants are made in atomic physics for purely metrological purposes <!-- (see Appendix \ref{app:metrology) ) -->, <math>\alpha</math>, as a dimensionless constant, is not defined by metrology. Rather, <math>\alpha</math> characterizes the strength of the electromagnetic interaction, as the following example will illustrate. | ||
If energy uncertainties become become as large as <math>\Delta E=mc^2</math>, the concept of a particle breaks down. This upper bound on the energy uncertainty gives us, via the Heisenberg Uncertainty Principle, a lower bound on the length scale within which an electron can be localized (before e.g. spontaneous pair production may occur) | If energy uncertainties become become as large as <math>\Delta E=mc^2</math>, the concept of a particle breaks down. This upper bound on the energy uncertainty gives us, via the Heisenberg Uncertainty Principle, a lower bound on the length scale within which an electron can be localized (before e.g. spontaneous pair production may occur) | ||
− | <math>\Delta\simeq mc^2\Rightarrow \Delta p=mc</math> | + | <math>\Delta\simeq mc^2\Rightarrow \Delta p=mc</math>, so (uncertainty principle <math>\Rightarrow </math>) |
<math>\Delta x=\frac{\hbar}{mc}=\lambda_c</math> | <math>\Delta x=\frac{\hbar}{mc}=\lambda_c</math> | ||
Even at this short distance of <math>\lambda_c</math>, the Coulumb | Even at this short distance of <math>\lambda_c</math>, the Coulumb |
Latest revision as of 00:12, 20 February 2024
Atomic Units
The natural units for describing atomic systems are obtained by setting to unity the three fundamental constants that appear in the hydrogen Hamiltonian, . One thus arrives at atomic units, such as
- length: Bohr radius =
- energy: 1 hartree =
- velocity:
- electric field:
- Note: This is the characteristic value for the orbit of hydrogen.
As we see above, we can express atomic units in terms of instead of by introducing a single dimensionless constant
The fine structure constant obtained its name from the appearance of in the ratio of fine structure splitting to the Rydberg; it is the only fundamental constant in atomic physics. As such, it should ultimately be predicted by a complete theory of physics. Whereas precision measurements of other constants are made in atomic physics for purely metrological purposes , , as a dimensionless constant, is not defined by metrology. Rather, characterizes the strength of the electromagnetic interaction, as the following example will illustrate. If energy uncertainties become become as large as , the concept of a particle breaks down. This upper bound on the energy uncertainty gives us, via the Heisenberg Uncertainty Principle, a lower bound on the length scale within which an electron can be localized (before e.g. spontaneous pair production may occur) , so (uncertainty principle ) Even at this short distance of , the Coulumb interaction---while stronger than that in hydrogen at distance --- is only:
i.e. in relativistic units the strength of this "stronger" Coulomb interaction is . The fact that implies that the Coulomb interaction is weak.