User:Constant314/Derivation of skin depth

The full derivation of the skin depth formula is implicit in equations given in the sources.^{[1]: 51  [2]: 126} This article shows the steps of the full derivation with complex permittivity and permeability shown explicitly.

Overview[edit]

Starting with the equations and analysis on the Propagation constant page

${\displaystyle \gamma =\alpha +j\beta ={\sqrt {j\omega \mu (\sigma +j\omega \epsilon )}}}$

${\displaystyle \delta ={\frac {1}{\alpha }}}$

with

${\displaystyle \epsilon =\epsilon '-j\epsilon ''=}$ complex permitivity,

${\displaystyle \mu =\mu '-j\mu ''=}$ complex permeability,

Carry out the math, gathering like terms (some cancel) and applying the formula for the square root of a complex number produces:

${\displaystyle \delta ={\frac {1}{\alpha }}={\sqrt {\frac {2\rho }{\omega \mu '}}}{\frac {\sqrt {{\sqrt {(1+{\color {red}\xi ^{2}+\chi ^{2}+\xi ^{2}\chi ^{2}}){(\rho \omega \epsilon ')}^{2}+(1+2\xi \rho \omega \epsilon ')(1+{\color {red}\chi ^{2}})}}+(1-{\color {red}\xi \chi })\rho \omega \epsilon '-\chi }}{1+\rho \omega \epsilon '(\chi +\xi )}}\;.}$

where

${\displaystyle \xi ={\frac {\epsilon ''}{\epsilon '}}\quad }$ also known as dielectric loss tangent.

${\displaystyle \chi ={\frac {\mu ''}{\mu '}}\quad }$ also known as magnetic loss tangent.

If ${\displaystyle \xi <0.1}$ and ${\displaystyle \chi <0.1}$, then the cross terms shown in red may be taken to be zero. That yields a simpler expression:

${\displaystyle \delta ={\frac {1}{\alpha }}={\sqrt {\frac {2\rho }{\omega \mu '}}}{\frac {\sqrt {{\sqrt {{1+2\xi \rho \omega \epsilon '+(\rho \omega \epsilon ')}^{2}}}+\rho \omega \epsilon '-\chi }}{1+(\chi +\xi )\rho \omega \epsilon '}}\;.}$

If the dielectric loss is small ( ${\displaystyle \xi \approx 0}$ ), then

${\displaystyle \delta ={\frac {1}{\alpha }}={\sqrt {\frac {2\rho }{\omega \mu '}}}{\frac {\sqrt {{\sqrt {1+{(\rho \omega \epsilon ')}^{2}}}+\rho \omega \epsilon '-\chi }}{1+\chi \rho \omega \epsilon '}}.}$

If the magnetic loss is also small ( ${\displaystyle \chi \approx 0}$ ) then this reduces the the more familiar form

${\displaystyle \delta ={\frac {1}{\alpha }}={\sqrt {\frac {2\rho }{\omega \mu '}}}{\sqrt {{\sqrt {1+{(\rho \omega \epsilon ')}^{2}}}+\rho \omega \epsilon '}}\;.}$

Definitions[edit]

The propagation factor of a sinusoidal plane wave propagating in the x direction in a linear material may be given by two equivalent forms

${\displaystyle P=e^{-\gamma x}=e^{-jkx},}$

where

${\displaystyle \gamma =\alpha +j\beta ={\sqrt {j\omega \mu (\sigma +j\omega \epsilon )}}={\sqrt {(\omega \mu ''+j\omega \mu ')(\sigma +\omega \epsilon ''+j\omega \epsilon ')}}=}$ Propagation constant^[2]: 126,

${\displaystyle k=k'-jk''={\sqrt {-(\omega \mu ''+j\omega \mu ')(\sigma +\omega \epsilon ''+j\omega \epsilon ')}}=}$ wavenumber^[1]: 48,

${\displaystyle \beta =k'=}$ phase constant in the units of radians/meter,

${\displaystyle \alpha =k''=}$ attenuation constant in the units of nepers/meter,

${\displaystyle \omega =}$ frequency in the units of radians/meter,

${\displaystyle x=}$ distance traveled in the x direction,

${\displaystyle \sigma =}$ conductivity in S/meter,

${\displaystyle \rho =}$ resistivity in ohm-meter (Ω⋅m),

${\displaystyle v_{0}=}$ phase velocity of free space (about 3 x 10⁸ m/s),

${\displaystyle \lambda _{0}={\frac {2\pi }{\omega }}v_{0}=}$ wavelength in free space,

${\displaystyle \epsilon =\epsilon '-j\epsilon ''=}$ complex permitivity,

${\displaystyle \mu =\mu '-j\mu ''=}$ complex permeability,

${\displaystyle j={\sqrt {-1}}}$ .

The sign convention is chosen for consistency with propagation in lossy media. If the attenuation constant is positive, then the wave amplitude decreases as the wave propagates in the x direction.

Wavelength ^{[2]: 126  [1]: 52}, phase velocity ^{[2]: 124  [1]: 52}, and skin depth ^{[2]: 130  [1]: 53} have simple relationships to the components of the propagation constant or wavenumber:

${\displaystyle \lambda ={\frac {2\pi }{\beta }},\qquad v_{p}={\frac {\omega }{\beta }},\qquad \delta ={\frac {1}{\alpha }},}$

${\displaystyle \lambda ={\frac {2\pi }{k'}},\qquad v_{p}={\frac {\omega }{k'}},\qquad \delta ={\frac {1}{k''}}.}$

Skin depth is the distance over which the wave attenuates by the factor ${\displaystyle e^{-1}}$. This is simply the reciprocal of the attenuation constant. ^{[1]: 53  [2]: 130}

Algebraic rearrangement[edit]

By a straightforward, if lengthy, algebraic calculation, the expression for k can be simplified by defining some simple ratioes.

${\displaystyle k={\sqrt {-(\omega \mu ''+j\omega \mu ')(\sigma +\omega \epsilon ''+j\omega \epsilon ')}}=\omega {\sqrt {\mu '\epsilon '}}{\sqrt {(1-\kappa \chi -\xi \chi )-j(\chi +\kappa +\xi )}},}$

where

${\displaystyle \xi ={\frac {\epsilon ''}{\epsilon '}},\quad \chi ={\frac {\mu ''}{\mu '}},\quad \kappa ={\frac {1}{\tau }}={\frac {\sigma }{\omega \epsilon '}}={\frac {1}{\rho \omega \epsilon '}}.}$

Note ${\displaystyle (\chi +\kappa +\xi )\geq 0}$ in a source free region. ${\displaystyle \xi }$ is also called dielectric loss tangent. ${\displaystyle \chi }$ is also called magnetic loss tangent.

general expression[edit]

Using the formula for the square root of a complex number

${\displaystyle \beta =k'=\omega {\sqrt {\frac {\mu '\epsilon '}{2}}}{\sqrt {{\sqrt {(1+{\color {red}\xi ^{2}+\chi ^{2}+\xi ^{2}\chi ^{2}})+(2\xi \kappa +\kappa ^{2})(1+{\color {red}\chi ^{2}})}}+1-{\color {red}\xi \chi }-\kappa \chi }}\;,}$

${\displaystyle \alpha =k''=\omega {\sqrt {\frac {\mu '\epsilon '}{2}}}{\frac {(\kappa +\chi +\xi )}{\sqrt {{\sqrt {(1+{\color {red}\xi ^{2}+\chi ^{2}+\xi ^{2}\chi ^{2}})+(2\xi \kappa +\kappa ^{2})(1+{\color {red}\chi ^{2}})}}+1-{\color {red}\xi \chi }-\kappa \chi }}}\;.}$

${\displaystyle \delta ={\frac {1}{\alpha }}={\frac {1}{\omega }}{\sqrt {\frac {2}{\mu '\epsilon '}}}{\frac {{\sqrt {{\sqrt {(1+{\color {red}\xi ^{2}+\chi ^{2}+\xi ^{2}\chi ^{2}})+(2\xi \kappa +\kappa ^{2})(1+{\color {red}\chi ^{2}})}}+(1-{\color {red}\xi \chi }-\kappa \chi }})}{(\kappa +\chi +\xi )}}\;.}$

${\displaystyle \delta ={\frac {1}{\alpha }}={\frac {1}{\omega }}{\sqrt {\tau {\frac {2}{\mu '\epsilon '}}}}{\frac {{\sqrt {\tau {\sqrt {(1+{\color {red}\xi ^{2}+\chi ^{2}+\xi ^{2}\chi ^{2}})+(2\xi \kappa +\kappa ^{2})(1+{\color {red}\chi ^{2}})}}+\tau (1-{\color {red}\xi \chi }-\kappa \chi }})}{\tau (\kappa +\chi +\xi )}}\;.}$

${\displaystyle \delta ={\frac {1}{\alpha }}={\sqrt {\frac {2\rho }{\omega \mu '}}}{\frac {{\sqrt {{\sqrt {(1+{\color {red}\xi ^{2}+\chi ^{2}+\xi ^{2}\chi ^{2}})\tau ^{2}+(2\xi \tau +1)(1+{\color {red}\chi ^{2}})}}+(\tau -{\color {red}\xi \chi }\tau -\chi }})}{1+\tau (\chi +\xi )}}\;.}$

simplified general expression[edit]

If the dielectric loss tangent is small (${\displaystyle \xi <0.1}$) and magnetic loss tangent is small (${\displaystyle \chi <0.1}$), then the cross terms shown in red in the previous section can be replaced with zero. That yields simplified expressions as follows:

${\displaystyle k'=\omega {\sqrt {\frac {\mu '\epsilon '}{2}}}{\sqrt {{\sqrt {1+2\xi \kappa +\kappa ^{2}}}+1-\kappa \chi }}}$

${\displaystyle k''=\omega {\sqrt {\frac {\mu '\epsilon '}{2}}}{\frac {(\kappa +\chi +\xi )}{\sqrt {{\sqrt {1+2\xi \kappa +\kappa ^{2}}}+1-\kappa \chi }}}}$

${\displaystyle \delta ={\frac {1}{\omega }}{\sqrt {\frac {2}{\mu '\epsilon '}}}{\frac {\sqrt {{\sqrt {1+2\xi \kappa +\kappa ^{2}}}+1-\kappa \chi }}{(\kappa +\chi +\xi )}}}$

alternate simplified general expression[edit]

Multiplying the previous expressions by ${\displaystyle (\rho \omega \epsilon ')/(\rho \omega \epsilon ')}$ yields these alternate expressions.

${\displaystyle k'={\sqrt {\frac {\omega \mu '}{2\rho }}}\;{\sqrt {{\sqrt {{(\rho \omega \epsilon ')}^{2}+2\xi \rho \omega \epsilon '+1}}+\rho \omega \epsilon '-\chi }}}$

${\displaystyle k''={\sqrt {\frac {\omega \mu '}{2\rho }}}\;{\frac {1+\rho \omega \epsilon '(\chi +\xi )}{\sqrt {{\sqrt {{(\rho \omega \epsilon ')}^{2}+2\xi \rho \omega \epsilon '+1}}+\rho \omega \epsilon '-\chi }}}}$

${\displaystyle \delta ={\sqrt {\frac {2\rho }{\omega \mu '}}}\;{\frac {\sqrt {{\sqrt {{(\rho \omega \epsilon ')}^{2}+(2\xi \rho \omega \epsilon '+1)}}+\rho \omega \epsilon '-\chi }}{1+\rho \omega \epsilon '(\chi +\xi )}}}$

Insulator[edit]

Using the simplified general expressions for low dielectric and magnetic losses, the skin depth is given by

${\displaystyle \delta ={\frac {1}{k''}}={\frac {{\sqrt {2}}{\sqrt {{\sqrt {1+2\xi \kappa +\kappa ^{2}}}+1-\kappa \chi }}}{\omega {\sqrt {\mu '\epsilon '}}\;(\kappa +\chi +\xi )}}\quad }$ low loss tangents insulator form suitable for ${\displaystyle \kappa <1}$

good insulator[edit]

For a good insulators at typical frequencies of interest, ${\displaystyle \kappa ={\frac {\sigma }{\omega \epsilon '}}}$ is very small. For example, at 1 mHz for polyethylene ${\displaystyle \;\kappa \approx 0.0005\;}$ and gets smaller at higher frequencies.

The expression for skin depth can be simplified by setting the cross terms ${\displaystyle \;\chi \kappa ,\;\xi \kappa ,\;\kappa ^{2}\;}$ to zero.

${\displaystyle \delta ={\frac {2}{\omega {\sqrt {\mu '\epsilon '}}\;(\chi +\kappa +\xi )}}\quad }$ expression for skin depth with low material losses. If there are no losses (such as vacuum), then skin depth is infinite.

Conductor[edit]

If the dielectric and magnetic losses are small (${\displaystyle \xi <0.1}$ and ${\displaystyle \chi <0.1}$) then the product of those terms in the alternate general expression can be taken to be zero.

${\displaystyle \delta ={\frac {1}{k''}}={\sqrt {\frac {2\rho }{\omega \mu '}}}{\frac {\sqrt {{\sqrt {{(\rho \omega \epsilon ')}^{2}+2\xi \rho \omega \epsilon '+1}}+\rho \omega \epsilon '-\chi }}{1+(\chi +\xi )\rho \omega \epsilon '}}\quad }$ low loss tangents conductor form

If the magnetic loss and dielectric loss are sufficiently small, the formula simplifies to the formula from skin effect article.

${\displaystyle \delta ={\sqrt {\frac {2\rho }{\omega \mu '}}}{\sqrt {{\sqrt {1+{(\rho \omega \epsilon ')}^{2}}}+\rho \omega \epsilon '}}\quad }$

good conductor[edit]

${\displaystyle \rho \omega \epsilon '\;}$ is typically small for good conductors. For example, copper at 1 THz ${\displaystyle \;\rho \omega \epsilon '\approx 10^{-6}}$.

Since ${\displaystyle \rho \omega \epsilon '}$ is small, ${\displaystyle {(\rho \omega \epsilon ')}^{2}}$ and ${\displaystyle \;\xi \rho \omega \epsilon '}$ can be taken to be zero.

${\displaystyle \delta ={\sqrt {\frac {2\rho }{\omega \mu '}}}{\sqrt {1+\rho \omega \epsilon '-\chi }}\approx {\sqrt {\frac {2\rho }{\omega \mu '}}}}$