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If a collection of atoms with these associated magnetic moments are now subject to a magnetic flux, all the atoms will experience a torque, in part due to the applied field and in part as a response to the magnetic flux they create among themselves. The calculation of the magnetization thus involves determination of the orientation of these moments taking into account their influence upon each other and also the influence of the external magnetic flux.
If a collection of atoms with these associated magnetic moments are now subject to a magnetic flux, all the atoms will experience a torque, in part due to the applied field and in part as a response to the magnetic flux they create among themselves. The calculation of the magnetization thus involves determination of the orientation of these moments taking into account their influence upon each other and also the influence of the external magnetic flux.
===Statistical mechanics===
When an assembly of atoms is placed in a magnetic flux, a torque is exerted upon the atoms because of their magnetic moment. The result is that atoms that are aligned with the magnetic flux have lower energy than those that are at an angle to the field. The difference in energies is proportional to the magnetic flux density and to the component of magnetic moment along the field.
According to the [[Boltzmann distribution|Boltzmann factor]], higher energy configurations are less probable than lower ones, and as temperature is lowered, the population of the lower energy configurations grows at the expense of the higher energy configurations. Also, as the magnetic flux density is increased the separation of the configurations increases and the lower energies become more populated.
These observations can be made quantitative.<ref name=Kittel>
{{cite book |title=Introduction to Solid State Physics |author=Charles Kittel |pages=pp. 303 ''ff'' |chapter=Quantum theory of paramagnetism |isbn=978-0-471-41526-8 |year=2004 |publisher=Wiley |edition=8th ed |url=http://www.amazon.com/Introduction-Solid-Physics-Charles-Kittel/dp/047141526X/ref=sr_1_1?s=books&ie=UTF8&qid=1291941197&sr=1-1#reader_047141526X}}
</ref>


==Notes==
==Notes==
<references/>
<references/>

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Magnetization, M, is the magnetic moment per unit volume, V of a material, defined in terms of the magnetic moments of its constituents by:

where the magnetic moment mj of the j-th constituent is a vector property that determines the torque the object experiences in a magnetic field tending to align its moment with the field. Here, N is the number of magnetic moments in the volume V. The M-field is measured in amperes per meter (A/m) in SI units.[1] Usually the magnetization is referred to a particular location r by imagining the volume V to be a microscopic region enclosing point r, and is anticipated to change with time t in the general case (perhaps because the moments are moving), defining a magnetization field, M(r, t).

At a microscopic level, the origin of the magnetic moments responsible for magnetization is traced to angular momentum, such as due to motion of electrons in atoms, or to spin, such as the intrinsic spin of electrons or atomic nuclei.

Magnetic moments

As magnetization is related to magnetic moments, its understanding requires a notion of where magnetic moments originate. As a general statement, magnetic moments are related to either angular momentum or to spin, both of which at a microscopic level are related to rotational phenomena. The connection is made via the gyromagnetic ratio, the proportionality factor between magnetic moment and spin or angular momentum for a given object.

Although these ideas apply to nucleii and other particles, here attention is focused on electrons in atoms. The magnetic moment mS of a system of electrons with spin S is:

and the magnetic moment mL of an electronic orbital momentum L is:

Here the factor mB refers to the Bohr magneton, defined by:

with e = the electron charge, ℏ = Planck's constant divided by 2π, and me = the electron mass. These relations are combined using the g-factor:

with g=2 for spin and g=1 for orbital motion.[2] The resultant total spin S of an ensemble of electrons in an atom is the vector sum of the constituent spins sj:

Likewise, the orbital momenta of an ensemble of electrons in an atom add as vectors.

Where both spin and orbital motion are present, they combine by vector addition:

and the magnetic moment is

with g the Lande g-factor or spectroscopic splitting factor:[3]

If a collection of atoms with these associated magnetic moments are now subject to a magnetic flux, all the atoms will experience a torque, in part due to the applied field and in part as a response to the magnetic flux they create among themselves. The calculation of the magnetization thus involves determination of the orientation of these moments taking into account their influence upon each other and also the influence of the external magnetic flux.

Statistical mechanics

When an assembly of atoms is placed in a magnetic flux, a torque is exerted upon the atoms because of their magnetic moment. The result is that atoms that are aligned with the magnetic flux have lower energy than those that are at an angle to the field. The difference in energies is proportional to the magnetic flux density and to the component of magnetic moment along the field.

According to the Boltzmann factor, higher energy configurations are less probable than lower ones, and as temperature is lowered, the population of the lower energy configurations grows at the expense of the higher energy configurations. Also, as the magnetic flux density is increased the separation of the configurations increases and the lower energies become more populated.

These observations can be made quantitative.[4]

Notes

  1. Units for Magnetic Properties. Lake Shore Cryotronics, Inc.. Retrieved on 2010-12-09.
  2. Charles P. Poole (1996). Electron spin resonance: a comprehensive treatise on experimental techniques, Reprint of Wiley 1982 2nd ed. Courier Dover Publications, p. 4. ISBN 0486694445. 
  3. R. B. Singh (2008). Introduction To Modern Physics. New Age International, p. 262. ISBN 8122414087. 
  4. Charles Kittel (2004). “Quantum theory of paramagnetism”, Introduction to Solid State Physics, 8th ed. Wiley, pp. 303 ff. ISBN 978-0-471-41526-8.