- #1
Anamitra
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Let us consider the B-E and F-D statics:
[tex]{<}{n}_{i}}{>}{=}{\frac{1}{{exp}{(}{{\epsilon}_{i}{-}{\mu}{)}{/}{kT}}{\mp}{1}}[/tex]
Now we observe the formula from a boosted frame.The left side is a scalar and should not change in response to the Lorentz transformations.What about the right hand side?The quantity
[tex]{(}{\epsilon}_{i}{-}{\mu}{)}{/}{kT}[/tex] does not look like a Lorentz invariant.
[tex]{<}{n}_{i}}{>}{=}{\frac{1}{{exp}{(}{{\epsilon}_{i}{-}{\mu}{)}{/}{kT}}{\mp}{1}}[/tex]
Now we observe the formula from a boosted frame.The left side is a scalar and should not change in response to the Lorentz transformations.What about the right hand side?The quantity
[tex]{(}{\epsilon}_{i}{-}{\mu}{)}{/}{kT}[/tex] does not look like a Lorentz invariant.
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