B
H
H
In SI units, permeability is measured in henries per meter (H/m), or equivalently in newtons per ampere squared (N/A2). The permeability constant μ0, also known as the magnetic constant or the permeability of free space, is the proportionality between magnetic induction and magnetizing force when forming a magnetic field in a classical vacuum.
A closely related property of materials is magnetic susceptibility, which is a dimensionless proportionality factor that indicates the degree of magnetization of a material in response to an applied magnetic field.
In the macroscopic formulation of electromagnetism, there appear two different kinds of magnetic field:
The concept of permeability arises since in many materials (and in vacuum), there is a simple relationship between H and B at any location or time, in that the two fields are precisely proportional to each other:[2]
B=\muH
However, inside strong magnetic materials (such as iron, or permanent magnets), there is typically no simple relationship between H and B. The concept of permeability is then nonsensical or at least only applicable to special cases such as unsaturated magnetic cores. Not only do these materials have nonlinear magnetic behaviour, but often there is significant magnetic hysteresis, so there is not even a single-valued functional relationship between B and H. However, considering starting at a given value of B and H and slightly changing the fields, it is still possible to define an incremental permeability as:[2]
\DeltaB=\mu\DeltaH
In the microscopic formulation of electromagnetism, where there is no concept of an H field, the vacuum permeability μ0 appears directly (in the SI Maxwell's equations) as a factor that relates total electric currents and time-varying electric fields to the B field they generate. In order to represent the magnetic response of a linear material with permeability μ, this instead appears as a magnetization M that arises in response to the B field:
M=
| -1 | |
| \left(\mu | |
| 0 |
-\mu-1\right)B
\mur
\mur=
| \mu | |
| \mu0 |
,
\mu0 ≈
\chim=\mur-1.
The number χm is a dimensionless quantity, sometimes called volumetric or bulk susceptibility, to distinguish it from χp (magnetic mass or specific susceptibility) and χM (molar or molar mass susceptibility).
See main article: Diamagnetism. Diamagnetism is the property of an object which causes it to create a magnetic field in opposition of an externally applied magnetic field, thus causing a repulsive effect. Specifically, an external magnetic field alters the orbital velocity of electrons around their atom's nuclei, thus changing the magnetic dipole moment in the direction opposing the external field. Diamagnets are materials with a magnetic permeability less than μ0 (a relative permeability less than 1).
Consequently, diamagnetism is a form of magnetism that a substance exhibits only in the presence of an externally applied magnetic field. It is generally a quite weak effect in most materials, although superconductors exhibit a strong effect.
See main article: Paramagnetism. Paramagnetism is a form of magnetism which occurs only in the presence of an externally applied magnetic field. Paramagnetic materials are attracted to magnetic fields, hence have a relative magnetic permeability greater than one (or, equivalently, a positive magnetic susceptibility).
The magnetic moment induced by the applied field is linear in the field strength, and it is rather weak. It typically requires a sensitive analytical balance to detect the effect. Unlike ferromagnets, paramagnets do not retain any magnetization in the absence of an externally applied magnetic field, because thermal motion causes the spins to become randomly oriented without it. Thus the total magnetization will drop to zero when the applied field is removed. Even in the presence of the field, there is only a small induced magnetization because only a small fraction of the spins will be oriented by the field. This fraction is proportional to the field strength and this explains the linear dependency. The attraction experienced by ferromagnets is non-linear and much stronger so that it is easily observed, for instance, in magnets on one's refrigerator.
For gyromagnetic media (see Faraday rotation) the magnetic permeability response to an alternating electromagnetic field in the microwave frequency domain is treated as a non-diagonal tensor expressed by:[4]
\begin{align} B(\omega)&=\begin{vmatrix} \mu1&-i\mu2&0\\ i\mu2&\mu1&0\\ 0&0&\muz \end{vmatrix}H(\omega) \end{align}
The following table should be used with caution as the permeability of ferromagnetic materials varies greatly with field strength and specific composition and fabrication. For example, 4% electrical steel has an initial relative permeability (at or near 0 T) of 2,000 and a maximum of 38,000 at T = 1 [5] [6] and different range of values at different percent of Si and manufacturing process, and, indeed, the relative permeability of any material at a sufficiently high field strength trends toward 1 (at magnetic saturation).
| Medium | Susceptibility, volumetric, SI, χm | data-sort-type="number" | Relative permeability, , μ/μ0 | Permeability, μ (H/m) | Magnetic field | Frequency, |
|---|---|---|---|---|---|---|
| Vacuum | 0 | 1, exactly[7] | ||||
| Metglas 2714A (annealed) | [8] | At 0.5 T | 100 kHz | |||
| Iron (99.95% pure Fe annealed in H) | [9] | |||||
| Permalloy | [10] | At 0.002 T | ||||
| NANOPERM® | [11] | At 0.5 T | 10 kHz | |||
| Mu-metal | [12] | |||||
| Mu-metal | [13] | At 0.002 T | ||||
| Cobalt-iron (high permeability strip material) | [14] | |||||
| Iron (99.8% pure) | ||||||
| Electrical steel | 2000 - 38000[15] [16] | At 0.002 T, 1 T | ||||
| Ferritic stainless steel (annealed) | 1000 – 1800[17] | – | ||||
| Martensitic stainless steel (annealed) | 750 – 950 | – | ||||
| Ferrite (manganese zinc) | 350 – 20 000[18] | – | At 0.25 mT | 100 Hz – 4 MHz | ||
| Ferrite (nickel zinc) | 10 – 2300[19] | – | At ≤ 0.25 mT | 1 kHz – 400 MHz | ||
| Ferrite (magnesium manganese zinc) | 350 – 500[20] | – | At 0.25 mT | |||
| Ferrite (cobalt nickel zinc) | 40 – 125[21] | – | At 0.001 T | 2 MHz – 150 MHz | ||
| Mo-Fe-Ni powder compound (molypermalloy powder, MPP) | 14 – 550[22] | – | 50 Hz – 3 MHz | |||
| Nickel iron powder compound | 14 – 160[23] | – | At 0.001 T | 50 Hz – 2 MHz | ||
| Al-Si-Fe powder compound (Sendust) | 14 – 160[24] | – | 50 Hz – 5 MHz[25] | |||
| Iron powder compound | 14 – 100[26] | – | At 0.001 T | 50 Hz – 220 MHz | ||
| Silicon iron powder compound | 19 – 90[27] [28] | – | 50 Hz – 40 MHz | |||
| Carbonyl iron powder compound | 4 – 35[29] | – | At 0.001 T | 20 kHz – 500 MHz | ||
| Carbon steel | At 0.002 T | |||||
| Nickel | 100 – 600 | – | At 0.002 T | |||
| Martensitic stainless steel (hardened) | 40 – 95 | – | ||||
| Austenitic stainless steel | 1.003 – 1.05[30] | – | ||||
| Neodymium magnet | 1.05[31] | |||||
| Platinum | ||||||
| Aluminum | [32] | |||||
| Wood | ||||||
| Air | [33] | |||||
| Concrete (dry) | 1[34] | |||||
| Hydrogen | ||||||
| Teflon | ||||||
| Sapphire | ||||||
| Copper | or | |||||
| Water | ||||||
| Bismuth | ||||||
| Pyrolytic carbon | ||||||
| Superconductors | −1 | 0 | 0 |
A good magnetic core material must have high permeability.[35]
For passive magnetic levitation a relative permeability below 1 is needed (corresponding to a negative susceptibility).
Permeability varies with a magnetic field. Values shown above are approximate and valid only at the magnetic fields shown. They are given for a zero frequency; in practice, the permeability is generally a function of the frequency. When the frequency is considered, the permeability can be complex, corresponding to the in-phase and out of phase response.
A useful tool for dealing with high frequency magnetic effects is the complex permeability. While at low frequencies in a linear material the magnetic field and the auxiliary magnetic field are simply proportional to each other through some scalar permeability, at high frequencies these quantities will react to each other with some lag time.[36] These fields can be written as phasors, such that
H=H0ej B=B0ej\left(\omega
\delta
B
H
Understanding permeability as the ratio of the magnetic flux density to the magnetic field, the ratio of the phasors can be written and simplified as
\mu=
| B | |
| H |
=
| B0ej\left(\omega | |
| H0ej |
=
| B0 | |
| H0 |
e-j\delta,
By Euler's formula, the complex permeability can be translated from polar to rectangular form,
\mu=
| B0 | |
| H0 |
\cos(\delta)-j
| B0 | |
| H0 |
\sin(\delta)=\mu'-j\mu''.
The ratio of the imaginary to the real part of the complex permeability is called the loss tangent,
\tan(\delta)=
| \mu'' | |
| \mu' |
,