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Raising Operator

Raising Operator

Jan 27, 20241 min read

Physics

$\overset{a}{^}_{+} = - i \frac{p ^}{p _{0}} + \frac{x ^}{x _{0}} = \frac{1}{2 m ℏ ω} (- ℏ \frac{d}{d x} + mω x)$

Applying this operator on $Ψ$ increases its energy by $ℏ ω$
$\overset{p}{^}$ is the momentum operator
$p_{0}$ is the characteristic momentum
$\overset{x}{^}$ is the position operator
$x_{0}$ is the characteristic length

$\hat{H} (\overset{a}{^}_{+} Ψ_{n}) = E_{n} + ℏ ω$

Each application of $\overset{a}{^}_{+}$ increases the energy by $ℏ ω$

$\overset{a}{^}_{+} ψ_{n} = n + 1 ψ_{n + 1}$

Graph View

$\displaystyle \hat{a}_{+}=-i \frac{\hat{p}}{p_{0}}+ \frac{\hat{x}}{x_{0}}=\frac{1}{\sqrt{ 2m\hbar \omega }}\left( -\hbar \frac{ \mathrm{d} }{ \mathrm{d}x }+m\omega x \right)$
$\displaystyle \hat{H}(\hat{a}_{+}\Psi_{n})=E_{n}+\hbar \omega$
$\displaystyle \hat{a}_{+}\psi_{n}=\sqrt{ n+1 }\psi_{n+1}$

Backlinks

Hamiltonian Operator
Ladder Operators
Momentum Operator
Position Operator
QHO

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