Skin depth

Skin depth is due to the circulating eddy currents cancelling the current flow in the center of a conductor and reinforcing it in the skin.

Skin depth, also known as classical skin depth,^[1] is a measure of the distance an alternating current can penetrate beneath the surface of a conductor.

When an electromagnetic wave interacts with a conductive material, mobile charges within the material are made to oscillate back and forth with the same frequency as the impinging fields. The movement of these charges, usually electrons, constitutes an alternating electric current, the magnitude of which is greatest at the conductor's surface. The decline in current density versus depth is known as the skin effect and the skin depth is a measure of the distance over which the current falls to 1/e of its original value. A gradual change in phase accompanies the change in magnitude, so that, at a given time and at appropriate depths, the current can be flowing in the opposite direction to that at the surface.

The skin depth is a property of the material that varies with the frequency of the applied wave. It can be calculated from the relative permittivity and conductivity of the material and frequency of the wave. (See the article Mathematical descriptions of opacity for relationships with other optical and electrical parameters.) First, find the material's complex permittivity, ${\displaystyle \varepsilon _{c}}$

${\displaystyle \varepsilon _{c}={{\varepsilon }\left(1+i{{\sigma } \over {\omega \varepsilon }}\right)}\qquad \qquad (1)}$

where:

${\displaystyle \varepsilon }$ = permittivity of the material of propagation

${\displaystyle \omega }$ = angular frequency of the wave

${\displaystyle \sigma }$ = electrical conductivity of the material of propagation

${\displaystyle i}$ = the Imaginary_unit

Thus, the propagation constant, ${\displaystyle k}$, will also be a complex number,

${\displaystyle k_{c}={\omega }{\sqrt {\mu \varepsilon _{c}}}}$

and can be separated into real and imaginary parts.

${\displaystyle k_{c}=\alpha +i\beta }$

Substituting for ${\displaystyle \epsilon _{c}}$ gives

${\displaystyle k_{c}=\omega {\sqrt {\mu \varepsilon \left({1+{\frac {i\sigma }{\omega \varepsilon }}}\right)}}\qquad \qquad (2)}$

The constants can also be expressed as^[2]

${\displaystyle \alpha ={\omega }{\sqrt {{{\mu \varepsilon } \over 2}\left({\sqrt {1+\left({{\sigma } \over {\omega \epsilon }}\right)^{2}}}+1\right)}}\qquad \qquad (3)}$

${\displaystyle \beta ={\omega }{\sqrt {{{\mu \varepsilon } \over 2}\left({\sqrt {1+\left({{\sigma } \over {\omega \epsilon }}\right)^{2}}}-1\right)}}\qquad \qquad (4)}$

where ${\displaystyle \mu }$ is the permeability of the material.

For a uniform wave propagating in the +z-direction,

${\displaystyle E_{x}=E_{0}e^{i(k_{c}z-\omega t)}=E_{0}e^{-\beta z}e^{i(\alpha z-\omega t)}\qquad \qquad (5)}$

then ${\displaystyle \alpha }$ gives a wave solution, and ${\displaystyle \beta }$ gives an exponential decay as z increases and is for this reason an attenuation term where ${\displaystyle \beta }$ is an attenuation constant with the unit Np/m (Neper). If ${\displaystyle z={\frac {1}{\beta }}}$ then a unit wave amplitude decreases to a magnitude of ${\displaystyle e^{-1}}$.

It can be seen that the imaginary part of the complex permittivity increases with frequency, implying that the attenuation constant also increases with frequency. Therefore, a high frequency wave will only flow through a very small region of the conductor, much smaller than in the case of a lower frequency wave, and will therefore encounter more electrical impedance.

For a good conductor, ${\displaystyle \epsilon \omega \ll \sigma }$, so the permittivity is essentially imaginary and the wave number becomes

${\displaystyle k_{c}\approx {\sqrt {i}}\,{\sqrt {\mu \omega \sigma }}=(1+i){\sqrt {\frac {\mu \omega \sigma }{2}}}\qquad \qquad (6)}$

and therefore

${\displaystyle \alpha \approx \beta \approx {\sqrt {\frac {\mu \omega \sigma }{2}}}}$.

The skin depth is defined as the distance ${\displaystyle \delta }$ through which the amplitude of a traveling plane wave decreases by a factor ${\displaystyle e^{-1}}$ and is therefore

${\displaystyle \delta ={\frac {1}{\beta }}\qquad \qquad (7)}$

and for a good conductor it is defined as

${\displaystyle \delta ={\sqrt {\frac {2}{\mu \omega \sigma }}}\qquad \qquad (8)}$.

The term "skin depth" traditionally assumes ω to be real. This is not necessarily the case; the imaginary part of ω characterizes the waves attenuation in time. This would make the above definitions for α and β complex.

The same equations also apply to a lossy dielectric. Defining

${\displaystyle \varepsilon _{c}={\left({\varepsilon '}+i{\varepsilon ''}\right)}}$,

replace ${\displaystyle \varepsilon }$ with ${\displaystyle \varepsilon '}$, and ${\displaystyle {\sigma \over {\omega \varepsilon }}}$ with ${\displaystyle \varepsilon '' \over {\varepsilon '}}$

Examples

Skin depths for some metals

The electrical resistivity of a material is equal to 1/σ and its relative permeability is defined as ${\displaystyle \mu /\mu _{0}}$, where ${\displaystyle \mu _{0}}$ is the magnetic permeability of free space. It follows that Equation (8) can be rewritten as

${\displaystyle \delta ={\frac {1}{\sqrt {\pi \mu _{o}}}}\,{\sqrt {\frac {\rho }{\mu _{r}f}}}\approx 503\,{\sqrt {\frac {\rho }{\mu _{r}f}}}\qquad \qquad (9)}$

where

${\displaystyle \delta =}$ the skin depth in m

${\displaystyle \mu _{0}=}$4π×10^-7 H/m

${\displaystyle \mu _{r}=}$ the relative permeability of the medium

${\displaystyle \rho =}$ the resistivity of the medium in Ωm

${\displaystyle f=}$ the frequency of the wave in Hz

If the resistivity of aluminum is taken as 2.8×10^-8 Ωm and its relative permeability is 1, then the skin depth at a frequency of 50 Hz is given by

${\displaystyle \delta =503\,{\sqrt {\frac {2.82\cdot 10^{-8}}{1\cdot 50}}}=11.9}$ mm

Iron has a higher resistivity, 1.0×10^-7 Ωm, and this will increase the skin depth. However, its relative permeability is typically 90^{[dubious – discuss]}, which will have the opposite effect. At 50 Hz the skin depth in iron is given by

${\displaystyle \delta =503\,{\sqrt {\frac {1.0\cdot 10^{-7}}{90\cdot 50}}}=2.4}$ mm

Hence, the higher magnetic permeability of iron more than compensates for the lower resistivity of aluminium and the skin depth in iron is therefore one fifth that of aluminium. This will be true whatever the frequency, assuming the material properties are not themselves frequency-dependent.

Skin depth values for some common good conductors at a frequency of 10GHz (microwave region) are indicated below.

Conductor	Skin Depth (μm)
Aluminum	0.8
Copper	0.65
Gold	0.79
Silver	0.64

As one can see, in microwave frequencies most of the current in a good conductor flows in an extremely thin region near the surface of the latter. A 10GHz microwave frequency is approximately four times higher than the frequency of most modern devices such as Bluetooth, wireless, microwave ovens, and satellite television which all operate in or around the 2.4GHz band, and therefore have about two times as much penetration as those figures for 10GHz.

The extremely short skin depth at microwave frequencies shows that only surface coating of guiding conductor is important. A piece of glass with an evaporated silver surface 3 µm thick is an excellent conductor at these frequencies

See also

• Skin effect

References

1. See Anomalous skin effect.
2. Griffiths, David (1999) [1981]. "9. Electromagnetic Waves". In Alison Reeves (ed.) (ed.). Introduction to Electrodynamics (3rd edition ed.). Upper Saddle River, New Jersey: Prentice Hall. p. 394. ISBN 0-13-805326-x. OCLC 40251748. {{cite book}}: |access-date= requires |url= (help); |edition= has extra text (help); |editor= has generic name (help); Check |isbn= value: invalid character (help); Check date values in: |accessdate= (help)

• Ramo, Whinnery, Van Duzer (1994). Fields and Waves in Communications Electronics. John Wiley and Sons.