Phy5645/HO Virial Theorem: Difference between revisions

Latest revision as of 13:33, 18 January 2014

The average potential energy is given by

$\langle {\hat {V}}\rangle ={\tfrac {1}{2}}k\langle {\hat {x}}^{2}\rangle .$

Recall from a previous problem that

${\hat {x}}={\sqrt {\frac {\hbar }{2m\omega }}}({\hat {a}}+{\hat {a}}^{\dagger }),$

or

${\tfrac {1}{2}}k{\hat {x}}^{2}={\frac {\hbar k}{4m\omega }}({\hat {a}}+{\hat {a}}^{\dagger })^{2}.$

We can now write the average potential for the $n^{\text{th}}$ state of the harmonic oscillator as

$\langle V\rangle ={\frac {\hbar k}{4m\omega }}\langle n|({\hat {a}}+{\hat {a}}^{\dagger })^{2}|n\rangle$

$={\frac {\hbar k}{4m\omega }}\langle n|({\hat {a}}^{2}+{\hat {a}}^{\dagger 2}+{\hat {a}}{\hat {a}}^{\dagger }+{\hat {a}}^{\dagger }{\hat {a}})|n\rangle$

$={\frac {\hbar k}{4m\omega }}[\langle n|{\hat {a}}^{2}|n\rangle +\langle n|{\hat {a}}^{\dagger }|n\rangle +\langle n|({\hat {a}}{\hat {a}}^{\dagger }+{\hat {a}}^{\dagger }{\hat {a}})|n\rangle ]$

The first two terms are zero because

$\langle n|n-2\rangle =\langle n|n+2\rangle =0$

and the operator in the third term can be written as

${\hat {a}}{\hat {a}}^{\dagger }+{\hat {a}}^{\dagger }{\hat {a}}=2{\hat {n}}+1.$

Therefore,

$\langle {\hat {V}}\rangle ={\frac {\hbar k}{4m\omega }}(2n+1)\langle n|n\rangle ={\frac {\hbar k}{2m\omega }}\left(n+{\tfrac {1}{2}}\right),$

or, noting that $k=m\omega ^{2},\!$

$\langle {\hat {V}}\rangle ={\tfrac {1}{2}}\left(n+{\tfrac {1}{2}}\right)\hbar \omega .$

Similarly, using the fact that

${\hat {p}}=-i{\sqrt {\frac {m\hbar \omega }{2}}}({\hat {a}}-{\hat {a}}^{\dagger }),$

we may show that

$\langle {\hat {T}}\rangle ={\frac {\langle {\hat {p}}^{2}\rangle }{2m}}={\tfrac {1}{2}}\left(n+{\tfrac {1}{2}}\right)\hbar \omega =\langle {\hat {V}}\rangle .$

Back to Harmonic Oscillator Spectrum and Eigenstates

@@ Line 23: / Line 23: @@
 <math> \langle n|n-2 \rangle = \langle n|n+2 \rangle = 0 </math>
-and the operator in the third term can be written like:
+and the operator in the third term can be written as
-<math> \hat{a}\hat{a}^\dagger + \hat{a}^\dagger\hat{a} = 1 + 2\hat{N} \text{  where  } \hat{N} = \hat{a}^\dagger\hat{a} </math>
+<math> \hat{a}\hat{a}^\dagger + \hat{a}^\dagger\hat{a} = 2\hat{n}+1.</math>
-since
+Therefore,
-<math> \hat{a}\hat{a}^\dagger |n \rangle = \hat{a} (n+1)^{\frac{1}{2}}|n + 1 \rangle = (n+1)|n \rangle </math>
+<math> \langle \hat{V} \rangle = \frac{\hbar k}{4m\omega}(2n + 1)\langle n|n \rangle = \frac{\hbar k}{2m\omega}\left (n + \tfrac{1}{2}\right ),</math>
-and <math> \hat{N}|n \rangle = n|n \rangle </math>
+or, noting that <math>k=m\omega^2,\!</math>
-So, now we have that:
+<math> \langle \hat{V} \rangle = \tfrac{1}{2}\left (n + \tfrac{1}{2}\right )\hbar\omega.</math>
-<math> \langle V \rangle = \frac{k}{4\beta^2} \langle n|(1 + 2\hat{N}|n \rangle = \frac{k}{4\beta^2}(2n + 1)\langle n|n \rangle = \frac{k}{2\beta^2}(n + \frac{1}{2}) </math>
+Similarly, using the fact that
-And, replacing <math> \beta^2 = \frac{m\omega_0}{\hbar} </math>, we find that
+<math>\hat{p}=-i\sqrt{\frac{m\hbar\omega}{2}}(\hat{a}-\hat{a}^{\dagger}),</math>
-<math> \langle V \rangle = \frac{\hbar\omega_0}{2}(n + \frac{1}{2}) </math>
+we may show that
-And can check that
+<math> \langle \hat{T} \rangle = \frac{\langle\hat{p}^2\rangle}{2m}=\tfrac{1}{2}\left (n + \tfrac{1}{2}\right )\hbar\omega=\langle\hat{V}\rangle.</math>
-<math> \langle T \rangle = \frac{1}{2m} \langle \hat{p} \rangle = \frac{1}{2} \langle E \rangle = \frac{\hbar\omega_0}{2}(n + \frac{1}{2}) </math>
+Back to [[Harmonic Oscillator Spectrum and Eigenstates#Problems|Harmonic Oscillator Spectrum and Eigenstates]]
-Which shows rather nicely that the Virial Theorem holds for the Quantum Harmonic Oscillator.
-(See Liboff, Richard ''Introductory Quantum Mechanics'', 4th Edition, Problem 7.10 for reference.)
-Back to [[Harmonic Oscillator Spectrum and Eigenstates]]

Phy5645/HO Virial Theorem: Difference between revisions

Latest revision as of 13:33, 18 January 2014

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