Question

Test the energy-time uncertainty principle for the free particle wave packet in Problem 2.43and the observable x , by calculating ${\mathit{\sigma }}_{\mathbf{H}}{\mathit{\sigma }}_{\mathbf{x}}$ , and $\mathit{d}<x>\mathbf{/}\mathit{d}\mathit{t}$exactly.

Short answer

The result obtained are

$$\begin{gathered} {\sigma }_x^2=\frac{1}{4a}\left[1+{\left(\frac{2ħat}{m}\right)}^2\right] \\ {\sigma }_H^2=\frac{{ħ}^{4}a}{2m^2}\left(a+2l^2\right) \\ \frac{d\left(x\right)}{dt}\frac{ħl}{m} \end{gathered}$$

Step-by-step solution

The wave function and find |ψ|2

From problem2.43, the wave function is given by:

$\mathit{\psi }\left(x,t\right)\mathbf{=}{\left(\frac{2a}{\pi }\right)}^{\mathbf{1}\mathbf{/}\mathbf{4}}\frac{{\displaystyle \frac{\mathbf{-}\mathbf{a}{\mathbf{x}}^{\mathbf{2}}\mathbf{+}\mathbf{i}\mathbf{(}\mathbf{l}\mathbf{x}\mathbf{-}\mathbf{ħ}{\mathbf{l}}^{\mathbf{2}}\mathbf{t}\mathbf{/}\mathbf{2}\mathbf{m}}{\sqrt{\mathbf{1}\mathbf{+}\mathbf{2}\mathbf{i}\mathbf{ħ}\mathbf{a}\mathbf{t}\mathbf{/}\mathbf{m}}}}}{\sqrt{\mathbf{1}\mathbf{+}\mathbf{2}\mathbf{i}\mathbf{ħ}\mathbf{a}\mathbf{t}\mathbf{/}\mathbf{m}}}$ …… (1)

Now find ${\left|\psi \right|}^2$,

$$\begin{gathered} {\left|\psi \right|}^2=\sqrt{\frac{2a}{\mathrm{\pi }}}\frac{1}{\sqrt{1+{\displaystyle \frac{4{ħ}^2{a}^2{t}^2}{m^2}}}}{e}^{-l^2/2a}exp\left\{a\left[\frac{{\left(ix+I/2a\right)}^2}{\left(1+2iħat/m\right)}+\frac{{\left(ix+I/2a\right)}^2}{\left(1+2iħat/m\right)}\right]\right\} \\ \mathrm{Let}\mathrm{\theta }=2\mathrm{ħat}/\mathrm{m},\mathrm{so}\mathrm{result}\mathrm{is}: \\ {\left|\mathrm{\psi }\right|}^2=\sqrt{\frac{2\mathrm{a}}{\mathrm{\pi }}}\frac{1}{\sqrt{1+{\mathrm{\theta }}^2}}{\mathrm{e}}^{-\mathrm{I}/2\mathrm{a}}\exp \left\{\mathrm{a}\left[\frac{{\left(\mathrm{ix}+\mathrm{I}/2\mathrm{a}\right)}^2}{\left(1+2\mathrm{iħat}/\mathrm{m}\right)}+\frac{{\left(\mathrm{ix}+\mathrm{I}/2\mathrm{a}\right)}^2}{\left(1-\mathrm{i\theta }\right)}\right]\right\} \\ \mathrm{Expand}\mathrm{the}\mathrm{term}\mathrm{in}\mathrm{square}\mathrm{brackets}\mathrm{as}: \\ {\left|\mathrm{\psi }\right|}^2=\sqrt{\frac{2\mathrm{a}}{\mathrm{\pi }}}\frac{1}{\sqrt{1+{\mathrm{\theta }}^2}}{\mathrm{e}}^{-\mathrm{I}/2\mathrm{a}}\exp \left\{\frac{-2\mathrm{a}}{1+{\mathrm{\theta }}^2}{\left(\mathrm{x}-\frac{\mathrm{\theta l}}{2\mathrm{a}}\right)}^2+\frac{{\mathrm{l}}^2}{2\mathrm{a}}\right\} \\ {\left|\mathrm{\psi }\right|}^2=\sqrt{\frac{2\mathrm{a}}{\mathrm{\pi }}}\frac{1}{\sqrt{1+{\mathrm{\theta }}^2}}\exp \left\{\frac{-2\mathrm{a}}{1+{\mathrm{\theta }}^2}{\left(\mathrm{x}-\frac{\mathrm{\theta l}}{2\mathrm{a}}\right)}^2\right\} \end{gathered}$$

Find the expectation value of x .

Considering the following function:

$$\begin{gathered} w={\left(\frac{a}{1+{\left(2ħat/m\right)}^2}\right)}^{1/2} \\ ={\left(\frac{a}{1+{\theta }^2}\right)}^{1/2} \\ \mathrm{The}\mathrm{wave}\mathrm{function}\mathrm{will}\mathrm{be}: \\ {\left|\mathrm{\psi }\left(\mathrm{x},\mathrm{t}\right)\right|}^2=\sqrt{\frac{2}{\mathrm{\pi }}}{{\mathrm{we}}^{-2{\mathrm{w}}^2\left(\mathrm{x}-\mathrm{\theta }/2\mathrm{a}\right)}}^2 \\ \mathrm{Find}\mathrm{the}\mathrm{expectation}\mathrm{value}\mathrm{of}\mathrm{x},\mathrm{as}: \\ \left(\mathrm{x}\right)={\int }_{-\infty }^{\infty }\mathrm{x}{\left|\mathrm{\psi }\left(\mathrm{x},\mathrm{t}\right)\right|}^2\mathrm{dx} \\ \mathrm{Substituting}\mathrm{the}\mathrm{value}\mathrm{of}\mathrm{wavefunction}: \\ \left(\mathrm{x}\right)={\int }_{-\infty }^{\infty }\sqrt{\frac{2}{\mathrm{\pi }}}\mathrm{wx}{{\mathrm{e}}^{-2{\mathrm{w}}^2\left(\mathrm{x}-\mathrm{\theta }/2\mathrm{a}\right)}}^2\mathrm{dx} \\ \mathrm{Let}\mathrm{y}=\mathrm{x}-\mathrm{\theta I}/2\mathrm{a}=\mathrm{x}-\mathrm{vt},\mathrm{and}\mathrm{thus}\mathrm{x}=\mathrm{y}+\mathrm{vt}\mathrm{where}\mathrm{v}=\mathrm{ħI}/\mathrm{m},\mathrm{substitute}\mathrm{these}\mathrm{and} \\ \mathrm{get}: \\ \left(\mathrm{x}\right)={\int }_{-\infty }^{\infty }\left(\mathrm{y}+\mathrm{vt}\right)\sqrt{\frac{2}{\mathrm{\pi }}}\mathrm{w}{{\mathrm{e}}^{-2{\mathrm{w}}^2\left(\mathrm{x}-\mathrm{\theta }/2\mathrm{a}\right)}}^2\mathrm{dy} \\ \mathrm{In}\mathrm{two}\mathrm{intergrals}\mathrm{obtained}\mathrm{the}\mathrm{first}\mathrm{one}\mathrm{is}\mathrm{zero},\mathrm{since}\mathrm{the}\mathrm{funtion}\mathrm{id}\mathrm{odd},\mathrm{and}\mathrm{the} \\ \mathrm{integration}\mathrm{of}\mathrm{an}\mathrm{odd}\mathrm{function}\mathrm{from}-\infty \mathrm{to}\infty \mathrm{is}\mathrm{zero},\mathrm{and}\mathrm{the}\mathrm{second}\mathrm{integral}\mathrm{is}1\mathrm{by} \\ \mathrm{normalization},\mathrm{so}: \\ \left(\mathrm{x}\right)=\mathrm{vt} \\ =\frac{\mathrm{ħl}}{\mathrm{m}}\mathrm{t}......\left(2\right) \\ \mathrm{On}\mathrm{differentiating}\mathrm{above}\mathrm{equation}: \\ \frac{\mathrm{d}\left(\mathrm{x}\right)}{\mathrm{dt}}\frac{\mathrm{ħl}}{\mathrm{m}} \end{gathered}$$

Find the expectation value of x2.

Find the expectation value of $x^2$as:

$\left(x^2\right)={\int }_{-\infty }^{\infty }{\left(y+vt\right)}^2\sqrt{\frac{2}{\mathrm{\pi }}}w{e}^{-2w^2{y}^2}dy$

Since ${\left(y+vt\right)}^2=y^2+2yvt+v^2{t}^2$, to find the values of the first integral, use the integral calculator, where the second integral is zero since it is an odd function, and the third integral is 1 by the normalization, so the value of the integral will be:

$$\begin{gathered} \left(x^2\right)=\frac{1}{4w^2}+0+{\left(vt\right)}^2 \\ \mathrm{Substitute}\mathrm{back}\mathrm{with}\mathrm{and}\mathrm{get}: \\ \left({\mathrm{x}}^2\right)=\frac{1}{4{\mathrm{w}}^2}+{\left(\frac{\mathrm{ħlt}}{\mathrm{m}}\right)}^2 \\ \mathrm{Substitute}\mathrm{back}\mathrm{with}\mathrm{w},\mathrm{and}\mathrm{get}: \\ \left({\mathrm{x}}^2\right)=\frac{1+{\left(2\mathrm{aħlt}/\mathrm{m}\right)}^2+\mathrm{a}{\left(2\mathrm{aħlt}/\mathrm{m}\right)}^2}{4\mathrm{a}}.......\left(3\right) \\ \mathrm{The}{\mathrm{\sigma }}_{\mathrm{x}}^2\mathrm{can}\mathrm{be}\mathrm{calculated}\mathrm{as}: \\ {\mathrm{\sigma }}_{\mathrm{x}}^2=\left({\mathrm{x}}^2\right)-{\left(\mathrm{x}\right)}^2 \\ =\frac{1}{4{\mathrm{w}}^2}+\left(\frac{\mathrm{ħlt}}{\mathrm{m}}\right)-\left(\frac{\mathrm{ħlt}}{\mathrm{m}}\right) \\ =\frac{1}{4{\mathrm{w}}^2} \\ {\mathrm{\sigma }}_{\mathrm{x}}^2=\frac{1}{4\mathrm{a}}\left[1+{\left(\frac{2\mathrm{ħat}}{\mathrm{m}}\right)}^2\right] \\ \mathrm{Write}\left(1\right)\mathrm{in}\mathrm{terms}\mathrm{of}\mathrm{\theta }\mathrm{as}: \\ \mathrm{\psi }\left(\mathrm{x},\mathrm{t}\right)={\left(\frac{2\mathrm{a}}{\mathrm{\pi }}\right)}^{1/4}\frac{1}{\sqrt{1+\mathrm{i\theta }}}{\mathrm{e}}^{-\frac{{\mathrm{I}}^2}{4\mathrm{a}}}{\mathrm{e}}^{\mathrm{a}\left(\mathrm{ix}+\frac{\mathrm{I}}{2\mathrm{a}}\right)/\left(1+\mathrm{i\theta }\right)} \\ \mathrm{Thus}: \\ \mathrm{\Phi }\left(\mathrm{p},\mathrm{t}\right)=\frac{1}{\sqrt{2\mathrm{\pi ħ}}}{\left(\frac{2\mathrm{a}}{\mathrm{\pi }}\right)}^{1/4}\frac{1}{\sqrt{1+\mathrm{i\theta }}}{\mathrm{e}}^{-\frac{{\mathrm{I}}^2}{4\mathrm{a}}}{\int }_{-\infty }^{\infty }{\mathrm{e}}^{\mathrm{a}\left(\mathrm{ix}+\frac{\mathrm{I}}{2\mathrm{a}}\right)/\left(1+\mathrm{i\theta }\right)}\mathrm{dx} \\ \mathrm{let}\mathrm{y}=\mathrm{x}-\frac{\mathrm{il}}{2\mathrm{a}},\mathrm{so}: \\ \mathrm{\Phi }\left(\mathrm{p},\mathrm{t}\right)=\frac{1}{\sqrt{2\mathrm{\pi ħ}}}{\left(\frac{2\mathrm{a}}{\mathrm{\pi }}\right)}^{1/4}\frac{1}{\sqrt{1+\mathrm{i\theta }}}{\mathrm{e}}^{-{\mathrm{I}}^2/4\mathrm{a}}{\mathrm{e}}^{\mathrm{pI}/2\mathrm{aħ}}{\int }_{-\infty }^{\infty }{\mathrm{e}}^{-\mathrm{ipy}/\mathrm{ħ}}{\mathrm{e}}^{-{\mathrm{ey}}^2\mathrm{I}\left(1+\mathrm{i\theta }\right)}\mathrm{dy} \end{gathered}$$

Find the expectation value of p4.

By the use of the integral from part (a) of problem 2.22:

$$\begin{gathered} \Phi \left(p,t\right)=\frac{1}{\sqrt{2\mathrm{\pi ħ}}}{\left(\frac{2a}{\mathrm{\pi }}\right)}^{1/4}\frac{1}{\sqrt{1+i\theta }}{e}^{-I^2/4a}{e}^{pI/2a\mathrm{ħ}}\sqrt{\frac{\mathrm{\pi }\left(1+\mathrm{i\theta }\right)}{a}}{e}^{-\frac{p^2\left(1+i\theta \right)}{4a{\mathrm{ħ}}^2}} \\ =\frac{1}{\sqrt{ħ}}{\left(\frac{1}{2\mathrm{a\pi }}\right)}^{1/4}{e}^{-\frac{t^2}{4\mathrm{a}}}{e}^{-\frac{pI}{2\mathrm{aħ}}}{e}^{-\frac{p^2\left(1+i\theta \right)}{4a{\mathrm{ħ}}^2}} \\ \mathrm{Thus}: \end{gathered}$$

Find the expectation value of (p2)

Now find the expectation value of $\left(p^2\right)$

$$\begin{gathered} \left(p^2\right)=-{ħ}^2{\int }_{-\infty }^{\infty }{\Psi }^{*}\frac{d^2\Psi }{d{x}^2}dx \\ \mathrm{From}\left(\mathrm{l}\right),\mathrm{write}\mathrm{this}:\frac{\mathrm{d\Psi }}{\mathrm{dx}}=\frac{2\mathrm{ia}\left(\mathrm{x}+{\displaystyle \frac{\mathrm{I}}{2\mathrm{a}}}\right)}{\left(1+\mathrm{i\theta }\right)}\mathrm{\Psi };\mathrm{thus}: \\ \frac{{\mathrm{d}}^2\mathrm{\Psi }}{{\mathrm{dx}}^2}=\left[\frac{2\mathrm{ia}\left(\mathrm{ix}+\mathrm{I}/2\mathrm{a}\right)}{1+\mathrm{i\theta }}\right]\frac{\mathrm{d\Psi }}{\mathrm{dx}}+\frac{2{\mathrm{i}}^2\mathrm{a}}{1+\mathrm{i\theta }}\mathrm{\Psi } \\ =\left[\frac{-4{\mathrm{a}}^2\left(\mathrm{ix}+\mathrm{I}/2\mathrm{a}\right)}{1+\mathrm{i\theta }}-\frac{2\mathrm{a}}{1+\mathrm{i\theta }}\right]\mathrm{\Psi } \end{gathered}$$

So the expectation value is:

$$\begin{gathered} \left(p^2\right)=\frac{4a^2{ħ}^2}{{\left(1+i\theta \right)}^2}{\int }_{-\infty }^{\infty }\left[{\left(ix+\frac{I}{2a}\right)}^2+\frac{\left(1+i\theta \right)}{2a}\right]{\left|\Psi \right|}^{2}dx \\ =\frac{4a^2{ħ}^2}{{\left(1+i\theta \right)}^2}{\int }_{-\infty }^{\infty }\left[-{\left(y+vt\frac{iI}{2a}\right)}^2+\frac{\left(1+i\theta \right)}{2a}\right]{\left|\Psi \right|}^{2}dyn \\ =\frac{4a^2{ħ}^2}{{\left(1+i\theta \right)}^2}\left\{-{\int }_{-\infty }^{\infty }{y}^2{\left|\Psi \right|}^{2}dy-2\left(vt-\frac{iI}{2a}\right){\int }_{-\infty }^{\infty }y{\left|\Psi \right|}^{2}dyn+\left[-{\left(vt-\frac{iI}{2a}\right)}^2+\frac{\left(1+i\theta \right)}{2a}\right]{\int }_{-\infty }^{\infty }{\left|\Psi \right|}^{2}dy\right\} \\ =\frac{4a^2{ħ}^2}{{\left(1+i\theta \right)}^2}\left[-\frac{1}{4w^2}+0{\left(vt-\frac{iI}{2a}\right)}^2+\frac{\left(1+i\theta \right)}{2a}\right] \\ \mathrm{Further}\mathrm{solving}\mathrm{above}\mathrm{equation}, \\ =\frac{4{\mathrm{a}}^2{\mathrm{ħ}}^2}{{\left(1+\mathrm{i\theta }\right)}^2}\left\{-\frac{1+{\mathrm{\theta }}^2}{4\mathrm{a}}-{\left[\left(\frac{-\mathrm{il}}{2\mathrm{a}}\right)\left(1+\mathrm{i\theta }\right)\right]}^2+\frac{\left(1+\mathrm{i\theta }\right)}{2\mathrm{a}}\right\} \\ =\frac{\mathrm{aħ}}{1+\mathrm{i\theta }}\left[-\left(-1-\mathrm{i\theta }\right)+\frac{{\mathrm{l}}^2}{\mathrm{a}}\left(-1+\mathrm{i\theta }\right)+2\right] \\ =\frac{{\mathrm{aħ}}^2}{1+\mathrm{i\theta }}\left[\left(1+\mathrm{i\theta }\right)\left(1+\frac{{\mathrm{l}}^2}{\mathrm{a}}\right)\right] \\ ={\mathrm{ħ}}^2\left(\mathrm{a}+{\mathrm{l}}^2\right) \end{gathered}$$

Find the value of σH2 and test the energy-time uncertainty principle.

The expectation value is $\left(H\right)$:

$\left(H\right)=\frac{\left(p^2\right)}{2m}$

The above equation will be:

$\left(H\right)=\frac{{ħ}^2\left(a+l^2\right)}{2m}$ (6)

Now the value of ${\sigma }_H^2$could be found as:

$$\begin{gathered} {\sigma }_H^2=\left(H^2\right)-{\left(H\right)}^2 \\ =\frac{{ħ}^4}{4m^2}\left(3a^2+6a{l}^2+l^4-a^2-2a{l}^2-l^4\right) \\ =\frac{{ħ}^4}{4m^2}\left(2a^2+4a{l}^2\right) \\ =\frac{{ħ}^{4}a}{2m^2}\left(a+2l^2\right) \\ {\sigma }_H^2=\frac{{ħ}^{4}a}{2m^2}\left(a+2l^2\right) \\ \mathrm{Finally}\mathrm{test}\mathrm{the}\mathrm{energy}-\mathrm{time}\mathrm{uncertainty}\mathrm{principle}\mathrm{as}: \\ {\mathrm{\sigma }}_{\mathrm{H}}^2{\mathrm{\sigma }}_{\mathrm{x}}^2=\frac{{\mathrm{ħ}}^4\mathrm{a}}{2{\mathrm{m}}^2}\left(\mathrm{a}+2{\mathrm{l}}^2\right)\frac{1}{4\mathrm{a}}\left[1+{\left(\frac{2\mathrm{ħat}}{\mathrm{m}}\right)}^2\right] \\ =\frac{{\mathrm{ħ}}^4\mathrm{a}}{2{\mathrm{m}}^2}\left(1+\frac{\mathrm{a}}{{\mathrm{al}}^2}\right)\left[1+{\left(\frac{2\mathrm{ħat}}{\mathrm{m}}\right)}^2\right]\ge \frac{{\mathrm{ħ}}^4{\mathrm{l}}^2}{4{\mathrm{m}}^2} \\ =\frac{{\mathrm{ħ}}^4}{4}{\left(\frac{\mathrm{ħl}}{\mathrm{m}}\right)}^2 \\ =\frac{{\mathrm{ħ}}^2}{4}{\left(\frac{\mathrm{d}\left(\mathrm{x}\right)}{\mathrm{dt}}\right)}^2 \end{gathered}$$

So, the uncertainty principle holds.