Static forces and virtual-particle exchange: Difference between revisions

<math display="block"> \begin{align}
J_1 &= a_1 \delta^3\left ( \vecmathbf x - \vecmathbf x_1 \right )</math> \\

<math display="block"> J_2 &= a_2 \delta^3\left ( \vecmathbf x - \vecmathbf x_2 \right )</math>

where the delta functions are in space, the disturbances are located at <math> \vecmathbf x_1 </math> and <math> \vecmathbf x_2 </math>, and the coefficients <math> a_1 </math> and <math> a_2 </math> are the strengths of the disturbances.

- T a_1 a_2\int \frac{d^3k}{(2 \pi )^3} \; \; D\left ( k \right )\mid_{k_0=0} \; \exp\left ( i \vecmathbf k \cdot \left ( \vecmathbf x_1 - \vecmathbf x_2 \right ) \right ).

<math display="block"> E = - \frac{W}{T} = a_1 a_2\int \frac{d^3k}{(2 \pi )^3} \; \; D\left ( k \right )\mid_{k_0=0} \; \exp\left ( i \vecmathbf k \cdot \left ( \vecmathbf x_1 - \vecmathbf x_2 \right ) \right ).</math>

Examples of static, motionless, interacting currents are the [[Static forces and virtual-particle exchange#The Yukawa potential: The force between two nucleons in an atomic nucleus|Yukawa potential]], the [[Static forces and virtual-particle exchange#The Coulomb potential in a vacuum|Coulomb potential in a vacuum]], and the [[Static forces and virtual-particle exchange#Coulomb potential in a simple plasma or electron gas|Coulomb potential in a simple plasma or electron gas]].

The expression for the interaction energy can be generalized to the situation in which the point particles are moving, but the motion is slow compared with the speed of light. Examples are the Darwin interaction [[Static forces and virtual-particle exchange#Darwin interaction in a vacuum|in a vacuum]] and [[Static forces and virtual-particle exchange#Darwin interaction in a plasma|in a plasma]].

Finally, the expression for the interaction energy can be generalized to situations in which the disturbances are not point particles, but are possibly line charges, tubes of charges, or current vortices. Examples include: [[Static forces and virtual-particle exchange#Two line charges embedded in a plasma or electron gas|two line charges embedded in a plasma or electron gas]], [[Static forces and virtual-particle exchange#Coulomb potential between two current loops embedded in a magnetic field|Coulomb potential between two current loops embedded in a magnetic field]], and the [[Static forces and virtual-particle exchange#Magnetic interaction between current loops in a simple plasma or electron gas|magnetic interaction between current loops in a simple plasma or electron gas]]. As seen from the Coulomb interaction between tubes of charge example, shown below, these more complicated geometries can lead to such exotic phenomena as [[Fractional quantum Hall effect|fractional quantum numbers]].

\int D\varphi \; \exp \left \{ i \int d^4x4\mathbf{x}\; \left [ \frac{1}{2} \left ( \left ( \partial \varphi \right )^2 - m^2\varphi^2 \right ) + J\varphi \right ] \right \}.</math>

<math display="block">D\left ( k \right )\mid_{k_0=0} \; = \; -\frac{1}{\vec k^2 + m^2}.</math>

<math display="block">r^2 = \left (\vecmathbf x_1 - \vecmathbf x_2 \right )^2</math>

& -\frac{1}{4} \int d^4x F_{\mu \nu}F^{\mu \nu}

&= -\frac{1}{4}\int d^4x \left( \partial_{\mu} A_{\nu} - \partial_{\nu} A_{\mu} \right)\left( \partial^{\mu} A^{\nu} - \partial^{\nu} A^{\mu} \right) \\

&= {} & \frac{1}{2}\int d^4x \; A_{\nu} \left( \partial^{2} A^{\nu} - \partial^{\nu} \partial_{\mu} A^{\mu} \right) \\

&= \frac{1}{2}\int d^4x \; A^{\mu} \left( \eta_{\mu \nu} \partial^{2} \right) A^{\nu},

<math display="block">D\left( k \right)\mid_{k_0=0}\; = \; \frac{1}{\vecmathbf k^2 + m^2}</math>

<math display="block">\omega^2 = \omega_p^2 + \gamma\left( \omega \right) \frac{T_e}{m} \vecmathbf k^2.</math>

<math display="block"> \vecmathbf k^2 + \vecmathbf k_D^2 = 0</math>

<math display="block">D\left ( k \right )\mid_{k_0=0} \; = \; \frac{1}{\vec k^2 + k_D^2}.</math>

<math display="block"> -k_0^2 +\vec k^2 + k_D^2 -\frac{m}{T_e} k_0^2 = 0,</math>

<math display="block">D\left ( k \right )\mid_{k_0=0}\; = \; \frac{1}{\vecmathbf k^2 + k_{Ds}^2}</math>

<math display="block">K_0 \left( k_{Ds} r_{12} \right) \rightarrowto -\ln \left(\frac{k_{Ds} r_{12}}{2}\right) + 0.5772.</math>

[[Image:100927c Angular momentum 11.jpg|thumb|250px|right|Figure 1. Interaction energy vs. ''r'' for angular momentum states of value one. The curves are identical to these for any values of <math>l\ell = l\ell'</math>. Lengths are in units are in <math>r_lr_\ell</math>, and the energy is in units of <math display="inline"> \frac{e^2}{L_B}</math>. Here <math>r = r_{12}</math>. Note that there are local minima for large values of <math> k_{B}</math>.]]

[[Image:101005 energy by theta.jpg|thumb|250px|right|Figure 3. Interaction energy vs. r for various values of theta. The lowest energy is for <math display="inline">\theta = \frac{\pi}{4}</math> or <math> \frac{l\ell}{l\ell'} = 1 </math>. The highest energy plotted is for <math display="inline">\theta = 0.90\frac{\pi}{4}</math>. Lengths are in units of <math>r_{l\ell l\ell'}</math>.]]

[[Image:101011 energy picture.jpg|thumb|250px|right|Figure 4. Ground state energies for even and odd values of angular momenta. Energy is plotted on the vertical axis and r is plotted on the horizontal. When the total angular momentum is even, the energy minimum occurs when <math> l\ell = l\ell' </math> or <math display="inline"> \frac{l\ell}{l\ell^*} = \frac{1}{2} </math>. When the total angular momentum is odd, there are no integer values of angular momenta that will lie in the energy minimum. Therefore, there are two states that lie on either side of the minimum. Because <math> l\ell \ne l\ell' </math>, the total energy is higher than the case when <math> l\ell = l\ell' </math> for a given value of <math> l\ell^* </math>.]]

<math display="block">r_{l\ell} = \sqrt{l\ell}\;r_B\; \; \; l\ell=0,1,2, \ldots</math>

where <math>l\ell</math> is the angular momentum [[quantum number]]. When <math> l\ell = 1</math> we recover the classical situation in which the electron orbits the magnetic field at the [[Larmor radius]]. If currents of two angular momentum <math> l\ell > 0 </math> and <math>l\ell' \ge l\ell </math> interact, and we assume the charge densities are delta functions at radius <math>r_{l\ell}</math>, then the interaction energy is

\left( \frac{2 e^2}{L_B}\right) \int_0^{\infty} \frac{k\;dk \;}{k^2 + k_B^2 r_{l\ell}^2}

\;\mathcal J_0 \left ( k \right) \;\mathcal J_0 \left ( \sqrt{\frac{l\ell'}{l\ell}} \;k \right) \;\mathcal J_0 \left ( k \frac{r_{12}}{r_{l\ell}} \right).</math>

The interaction energy for <math> l\ell = l\ell'</math> is given in Figure 1 for various values of <math>k_B r_{l}\ell</math>. The energy for two different values is given in Figure 2.

<math display="block">r_{12} = r_{l\ell l\ell'} = \sqrt{l\ell + l\ell'} \; r_B.</math>

This suggests that the pair of particles that are bound and separated by a distance <math>r_{l\ell l\ell'} </math> act as a single [[quasiparticle]] with angular momentum <math> l\ell + l\ell'</math>.

If we scale the lengths as <math> r_{l\ell l\ell'} </math>, then the interaction energy becomes

<math display="block"> E = \frac{2 e^2}{L_B} \int_0^{\infty} \frac{k\,dk}{k^2 + k_B^2 r_{l\ell l\ell'}^2}

\;\mathcal J_0 \left ( \cos \theta \, k \right) \;\mathcal J_0 ( \sin \theta \,k ) \;\mathcal J_0{\left( k \frac{r_{12}}{r_{l\ell l\ell'}} \right)}</math>

<math display="block">\tan \theta = \sqrt{\frac{l\ell}{l\ell'}}.</math>

The value of the <math> r_{12} </math> at which the energy is minimum, <math>r_{12} = r_{l\ell l\ell'} </math>, is independent of the ratio <math display="inline"> \tan \theta = \sqrt{{l\ell}/{l\ell'}}</math>. However the value of the energy at the minimum depends on the ratio. The lowest energy minimum occurs when

<math display="block"> \frac{l\ell}{l\ell'} = 1.</math>

<math display="block"> l\ell = l\ell' = 1</math>

<math display="block"> \frac{l\ell}{l\ell^*} = \frac{1}{2} </math>

<math display="block"> l\ell^* = l\ell + l\ell'. </math>

When the total angular momentum is odd, the minima cannot occur for <math> l\ell = l\ell' . </math> The lowest energy states for odd total angular momentum occur when

<math display="block"> \frac{l\ell}{l\ell^*} = \; \frac{l\ell^*\pm 1}{2l2\ell^*}</math>

<math display="block">\frac{l\ell}{l\ell^*} = \frac{1}{3}, \frac{2}{5}, \frac{3}{7}, \text{etc.,} </math>

<math display="block">\frac{l\ell}{l\ell^*} = \frac{2}{3}, \frac{3}{5}, \frac{4}{7}, \text{etc.,} </math>

\; M {\left ( l\ell + 1, 1, -\frac{k^2}{4} \right)} \;M {\left ( l\ell' + 1, 1, -\frac{k^2}{4} \right)} \;\mathcal J_0 {\left ( k \frac{r_{12}}{r_{B}} \right)}

\frac{2}{n!} \int_0^{\infty} dr \; r^{2n+1}\exp\left( e^{-r^2\right)} J_0(kr)

<math display="block">\frac{l\ell}{l\ell^*} = \frac{1}{3}, \frac{2}{5}, \frac{3}{7}, \text{etc.,} </math>

<math display="block">\frac{l\ell}{l\ell^*} = \frac{2}{3}, \frac{3}{5}, \frac{4}{7}, \text{etc.,} </math>

<math display="block">\vecmathbf J_1{\left( \vecmathbf x \right)} = a_1 \vecmathbf v_1 \delta^3 {\left( \vecmathbf x - \vecmathbf x_1 \right)}</math>

with a comparable expression for <math> \vecmathbf J_2 </math>.

<math display="block">\vecmathbf J_1{\left( \vecmathbf k \right)} = a_1 \vecmathbf v_1 \exp\left( i \vecmathbf k \cdot \vecmathbf x_1 \right).</math>

<math display="block">\vecmathbf J_1{\left( \vecmathbf k \right)} = a_1 \left[ 1 - \hat\mathbf k \hat\mathbf k \right ] \cdot \vecmathbf v_1 \exp\left( i \vecmathbf k \cdot \vecmathbf x_1 \right) + a_1 \left[ \hat\mathbf k \hat\mathbf k \right ] \cdot \vecmathbf v_1 \exp\left( i \vecmathbf k \cdot \vecmathbf x_1 \right).</math>

<math display="block">\vecmathbf k \cdot \vecmathbf J = -k_0 J^0 \rightarrowto 0,</math>

<math display="block"> E = a_1 a_2\int \frac{d^3\mathbf{k}}{(2 \pi )^3} \; \; D\left ( k \right )\mid_{k_0=0} \;

<math display="block">D\left ( k \right )\mid_{k_0=0}\; = \; -\frac{1}{\vec k^2 + m^2},</math>

- a_1 a_2 \int \frac{d^3k3\mathbf{k}}{(2 \pi )^3} \; \;

\frac{\vecmathbf v_1 \cdot \left[ 1 - \hat\mathbf k \hat\mathbf k \right ] \cdot \vecmathbf v_2}{\vec k^2 + m^2} \; \exp\left ( i \vecmathbf k \cdot \left (\mathbf x_1 - \mathbf x_2 \right ) \right ),</math>

whichwhere <math display="inline">k = |\mathbf k|</math>. The integral evaluates to (see {{slink|Common integrals in quantum field theory#Transverse potential with mass}})

\vecmathbf v_1 \cdot \left[ 1 + {\hat\mathbf r} {\hat\mathbf r}\right]\cdot \vecmathbf v_2

<math display="block"> E = - \frac{1}{2} \frac{a_1 a_2}{4 \pi r} \vecmathbf v_1 \cdot \left[ 1 + {\hat\mathbf r} {\hat\mathbf r}\right] \cdot \vecmathbf v_2 </math>

<math display="block">k_0^2 = \omega_p^2 +\vec k^2,</math>

<math display="block">D\left ( k \right )\mid_{k_0=0}\; = \; -\frac{1}{\vec k^2 + \omega_p^2}.</math>

\vecmathbf v_1 \cdot \left[ 1 + {\hat\mathbf r} {\hat\mathbf r}\right]\cdot \vecmathbf v_2

<math display="block">\vecmathbf J_1( \vecmathbf x) = a_1 v_1 \frac{1}{2 \pi r L_B} \; \delta^ 2 {\left( r - r_{B1} \right)}

\left( \hat\mathbf b \times \hat\mathbf r \right)</math>

and <math>\hat\mathbf b</math> is the unit vector in the direction of the magnetic field. Here <math>L_B</math> indicates the dimension of the material in the direction of the magnetic field. The transverse current, perpendicular to the [[wave vector]], drives the [[transverse wave]].

<math display="block"> -k_0^2 +\vec k^2 + \omega_p^2 \frac{k_0^2 - \omega_p^2}{k_0^2- \omega_H^2} =0,</math>

<math display="block"> D\left( k \right) \mid_{k_0=k_B=0}\;= \;-\left( \frac{1}{\vec k^2 + k_X^2}\right)</math>

- \left( \frac{a^2}{2 \pi L_B}\right) v^2\, \int_0^{\infty} \frac{k\;dk}{\vec k^2 + k_X^2}

<math display="block"> E = - E_0 \; I_1 {\left( \mu \right)} K_1 {\left( \mu \right)}</math>

I_1 {\left( mr \right)} K_1 {\left( mr \right)}

<math display="block">D\left ( k \right )\mid_{k_0=0}\; = \; - \frac{4}{3} \frac{1}{\vec k^2 + m^2}</math>