Magnetic field: Difference between revisions

From Citizendium
Jump to navigation Jump to search
imported>John R. Brews
imported>John R. Brews
(→‎Relation between H and B: magnetized sphere example)
Line 50: Line 50:
</math>
</math>
which need not be zero, although it will be zero in some common cases, for example, when '''B'''&nbsp;=&nbsp;μ'''H'''.
which need not be zero, although it will be zero in some common cases, for example, when '''B'''&nbsp;=&nbsp;μ'''H'''.
===Example===
To illustrate the roles of '''B''' and '''H''' a classic example is a sphere with constant permeability in a uniform external magnetic flux density '''B'''.<ref name=Cloud>
This derivation follows {{cite book |title=Electromagnetics |author=Edward J. Rothwell, Michael J. Cloud |url=http://books.google.com/books?id=jCqv1UygjA4C&pg=PA176 |pages=pp. 1676 ''ff'' |chapter=§3.3.7 Magnetic field of a permanently magnetized body |isbn=084931397X |year=2001 |publisher=CRC Press}}
</ref> The magnetic field '''H''' satisfies:
:<math>\mathrm{curl}\  \mathbf H = 0 \ , </math>
which allows the introduction of a potential Φ:
:<math>\mathbf H = -\ \mathrm{grad}\  \Phi \ .</math>
Taking the divergence, and using the zero divergence of '''B''':
:<math>\nabla ^2 \Phi =\mathrm{div} \mathbf M \ , </math>
which is [[Coulomb%27s_law#Poisson_equation|Poisson's equation]]. For constant '''M''', div '''M''' = 0. However, the solutions inside and outside the sphere must satisfy the boundary conditions on the sphere's surface that the normal component of '''B''' is continuous and the normal component of '''H''' may be discontinuous if there is a surface "magnetic" charge, that is:
:<math>\mathbf{ \hat{u} _{12} \cdot}\left(\mathbf{B_1-B_2}\right) =\mathbf{ \hat{u} _{12} \cdot} \mu_0\left(\mathbf{H_1+M_1 -H_2-M_2}\right)  =0 \ , </math>
:<math>\mathbf{ \hat{u} _{12} \cdot}\left(\mathbf{H_1-H_2}\right) =\sigma_1+\sigma_2 \ , </math>
where unit vector '''û<sub>12</sub>''' points into region 2 from region 1. Taking region 1 inside the sphere and region 2 outside where '''M<sub>2</sub>'''=0 and σ<sub>2</sub> = 0,
:<math>\mathbf{ \hat{u} _{12} \cdot} \mu_0\left(\mathbf{H_1+M  -H_2 }\right)  =0 \ , </math>
or:
:<math>\mathbf{ \hat{u} _{12} \cdot} \left(\mathbf{H_1 -H_2 }\right)  = -\mathbf{ \hat{u} _{12} \cdot M} \ =\sigma_1 . </math>
The solution to Poisson's equation with this surface charge is (see [[Coulomb%27s_law#Poisson_equation|Poisson's equation]]):
:<math>
\begin{align}
\Phi(\mathbf{r}) &=  \iint _{S} \frac{\sigma(\mathbf{r'})}{4\pi|\mathbf{r} - \mathbf{r'}|} d{S'}\\
&=\int _{-\pi}^{\pi}\sin \theta ' d \theta ' \int_0^\pi d\phi '  \frac{M_1 \cos \theta '}{4\pi |\mathbf{r} - \mathbf{r'}|}\\
&= \frac{M_1}{3} R^2 \cos \theta \frac {r_<} {r_>^2} \ ,
\end{align}
</math>
with ''R'' the radius of the sphere and ''r<sub><</sub>'' referring to the minimum of ''r'' and ''R'', ''r<sub>></sub> '' to the maximum of ''r'' and ''R''. The magnetic field is given inside the sphere by the gradient as:
:<math>\mathbf{H} = -\frac{M_1}{3}\mathbf{ \hat{u}_z}\ , </math>
with '''û<sub>z</sub>''' a unit vector in the applied field direction, and outside the sphere by
:<math>\mathbf H = \frac{M_1 R^3}{3r^3}\left(\hat{\mathbf{ r}}\ 2 \cos \theta + \hat{\boldsymbol{ \theta}} \sin \theta \right) \ . </math>


==Note==
==Note==
<references />
<references />

Revision as of 19:23, 13 December 2010

This article is developing and not approved.
Main Article
Discussion
Related Articles  [?]
Bibliography  [?]
External Links  [?]
Citable Version  [?]
Video [?]
 
This editable Main Article is under development and subject to a disclaimer.

In physics, a magnetic field (commonly denoted by H) describes a magnetic field (a vector) at every point in space; it is a vector field. In non-relativistic physics, the space in question is the three-dimensional Euclidean space —the infinite world that we live in.

In general H is seen as an auxiliary field useful when a magnetizable medium is present. The magnetic flux density B is usually seen as the fundamental magnetic field, see the article about B for more details about magnetism.

The SI unit of magnetic field strength is ampere⋅turn/meter; a unit that is based on the magnetic field of a solenoid. In the Gaussian system of units |H| has the unit oersted, with one oersted being equivalent to (1000/4π)⋅A⋅turn/m.

Relation between H and B

The magnetic field H is closely related to the magnetic induction B (also a vector field). It is the vector B that enters the expression for magnetic force on moving charges (Lorentz force). Historically, the theory of magnetism developed from Coulomb's law, where H played a pivotal role and B was an auxiliary field, which explains its historic name "magnetic induction". At present the roles have swapped and some authors give B the name magnetic field (and do not give a name to H other than "auxiliary field").

In the general case, H is introduced in terms of B as:

with M(r, t) the magnetization of the medium.

For the most common case of linear materials, M is linear in H,[1] and in SI units,

where 1 is the 3×3 unit matrix, χ the magnetic susceptibility tensor of the magnetizable medium, and μ0 the magnetic permeability of the vacuum (also known as magnetic constant). In Gaussian units the relation is

Many non-ferromagnetic materials are linear and isotropic; in the isotropic case the susceptibility tensor is equal to χm1, and H can easily be solved (in SI units)

with the relative magnetic permeability μr = 1 + χm.

For example, at standard temperature and pressure (STP) air, a mixture of paramagnetic oxygen and diamagnetic nitrogen, is paramagnetic (i.e., has positive χm), the χm of air is 4⋅10−7. Argon at STP is diamagnetic with χm = −1⋅10−8. For most ferromagnetic materials χm depends on H, with a non-linear relation between H and B and is large (depending on the material) from, say, 50 to 10000 and strongly varying as a function of H.

The magnetic flux density B is a solenoidal (divergence-free, transverse) vector field because of one of Maxwell's equations

This equation denies the existence of magnetic monopoles (magnetic charges) and hence also of magnetic currents.

The magnetic field H is not necessarily solenoidal, however, because it satisfies:

which need not be zero, although it will be zero in some common cases, for example, when B = μH.

Example

To illustrate the roles of B and H a classic example is a sphere with constant permeability in a uniform external magnetic flux density B.[2] The magnetic field H satisfies:

which allows the introduction of a potential Φ:

Taking the divergence, and using the zero divergence of B:

which is Poisson's equation. For constant M, div M = 0. However, the solutions inside and outside the sphere must satisfy the boundary conditions on the sphere's surface that the normal component of B is continuous and the normal component of H may be discontinuous if there is a surface "magnetic" charge, that is:

where unit vector û12 points into region 2 from region 1. Taking region 1 inside the sphere and region 2 outside where M2=0 and σ2 = 0,

or:

The solution to Poisson's equation with this surface charge is (see Poisson's equation):

with R the radius of the sphere and r< referring to the minimum of r and R, r> to the maximum of r and R. The magnetic field is given inside the sphere by the gradient as:

with ûz a unit vector in the applied field direction, and outside the sphere by

Note

  1. Some materials exhibit nonlinearity; that is, second and higher powers of H appear in the relation between M and H, and hence, between B and H. At strong fields, such nonlinearity is found in most materials.
  2. This derivation follows Edward J. Rothwell, Michael J. Cloud (2001). “§3.3.7 Magnetic field of a permanently magnetized body”, Electromagnetics. CRC Press, pp. 1676 ff. ISBN 084931397X.