Examples of wavefunction in the following topics:
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- The potential function (V) is time-independent, while the wavefunction itself is time- dependent.
- The wavefunction must vanish everywhere beyond the edges of the box, as the potential outside of the box is infinite.
- Furthermore, the amplitude of the wavefunction also may not "jump" abruptly from one point to the next.
- These two conditions are only satisfied by wavefunctions with the form:
- Negative values are neglected, since they give wavefunctions identical to the positive solutions except for a physically unimportant sign change.
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- In addition to mathematical expressions for total angular momentum and angular momentum projection of wavefunctions, an expression for the radial dependence of the wavefunctions must be found.
- The wavefunction itself is expressed in spherical polar coordinates:
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- The Pauli exclusion principle states that no two fermions can have identical wavefunctions.
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- In addition to mathematical expressions for total angular momentum and angular momentum projection of wavefunctions, an expression for the radial dependence of the wave functions must be found.
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- The quantity that is varying ("waving") is a number denoted by ψ (psi), whose value varies from point to point according to the wavefunction for that particular orbital.