Revision as of 13:37, 8 August 2013
(1) The energy operator in three dimensions is: 
so the average energy in state 
is:
Using the identity, 
we obtain
![{\displaystyle \left\langle E\right\rangle =-{\frac {\hbar ^{2}}{2m}}\iiint \left[\nabla \cdot \left(\Psi ^{\ast }\nabla \Psi \right)-\nabla \Psi ^{\ast }\cdot \nabla \Psi \right]\,d^{3}{\textbf {r}}+\iiint \Psi ^{\ast }V\Psi \,d^{3}{\textbf {r}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/fc2cf18af6b86dffd9daeecb390289c86c5c781c)
If we apply Gauss' Theorem to the first term,
as well as the condition, 
we obtain
(2) We first find the time derivative of energy density:
![{\displaystyle ={\frac {\hbar ^{2}}{2m}}\left[\nabla \cdot \left(\nabla \Psi ^{\ast }{\frac {\partial \psi }{\partial t}}+{\frac {\partial \Psi ^{\ast }}{\partial t}}\nabla \Psi \right)-\left({\frac {\partial \Psi }{\partial t}}\nabla ^{2}\Psi ^{\ast }+{\frac {\partial \Psi ^{\ast }}{\partial t}}\nabla ^{2}\Psi \right)\right]+{\frac {\partial \Psi ^{\ast }}{\partial t}}V\Psi +\Psi ^{\ast }V{\frac {\partial \Psi }{\partial t}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/af1ce3b58979d3e246c95046a461bfd1e831cf2b)
,
Using the Schrödinger equation,
and its complex conjugate,
and defining the energy flux density as 
We obtain
or, rearranging,
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