Adiabaticity
From GOSIA
(rendered the equation for xi piecewise in Latex. See talk page.) |
(Replaced the adiabaticity formula with a PNG as a temporary solution to incomplete Latex rendering.) |
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Adiabaticity is defined as | Adiabaticity is defined as | ||
| + | [[Image:Adiabaticity definition.png |frameless|600px|x]] | ||
| - | <math>\xi_{kn}</math> = ((<math>Z_1 Z_2 A_1</math><math>^{1/2}</math>)/6.34977) (1/(<math>E_p - s E_k</math>)<math>^{1/2}</math> - 1/(<math>E_p - s E_n</math>)<math>^{1/2}</math>) | + | This PNG file has been added because Latex rendering is incomplete at present<ref>Alternatively, we could use the following to render the superscripts and subscripts: <math>\xi_{kn}</math> = ((<math>Z_1 Z_2 A_1</math><math>^{1/2}</math>)/6.34977) (1/(<math>E_p - s E_k</math>)<math>^{1/2}</math> - 1/(<math>E_p - s E_n</math>)<math>^{1/2}</math>)</ref> |
where | where | ||
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There are [[adiabaticity_limit | limits]] to the adiabaticities (more accurately, to the [[adiabaticity product | adiabaticity products]]) of single-step excitations for which Gosia will yield accurate results. | There are [[adiabaticity_limit | limits]] to the adiabaticities (more accurately, to the [[adiabaticity product | adiabaticity products]]) of single-step excitations for which Gosia will yield accurate results. | ||
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| + | ==Notes== | ||
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| + | <references/> | ||
