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It seems on a first glance that we have justified the "law" P=c · E. |
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However, that is not quite true at this point. In the "law" given by equation above,
E refers to the external field, i.e. to the field that would be present
in our capacitor without a material inside. |
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We have Eex=U / d for our plate capacitor held at
a voltage U and a spacing between the plates of d. |
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On the other hand, the induced dipole moment that we calculated, always referred
to the field at the place of the dipole, i.e. the local
field Eloc. And if you think about it, you should at least feel a bit uneasy in assuming that the
two fields are identical. We will see about this in the next paragraph. |
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Here we can only define a factor that relates µ and Eloc;
it is called the polarizability
a. It is rarely used with a number attached, but if you run across it, be careful if e0 is included or not; in other words what kind of unit
system is used. |
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We now can reformulate the three equations on top of this paragraph into one equation |
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The polarizability
a is a material parameter which depends on the polarization mechanism: For our three paradigmatic
cases they are are given by |
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| aEP | = |
4p · e0 · R3
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| aIP | = |
q2
kIP |
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| aOP | = |
m2
3kT |
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This does not add anything new but emphasizes the proportionality to E. |
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So we almost answered our first
basic question about dielectrics - but for a full answer we need a relation between the local
field and the external field. This, unfortunately, is not a
particularly easy problem |
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One reason for this is: Whenever we talk about electrical fields, we always have a certain scale in mind
- without necessarily being aware of this. Consider: In a metal, as we learn from electrostatics, there is no
field at all, but that is only true if we do not look too closely. If we
look on an atomic scale, there are tremendous fields between the nucleus and the electrons.
At a somewhat larger scale, however, they disappear or perfectly balance each other (e.g. in ionic crystals) to give no
field on somewhat larger dimensions. |
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The scale we need here, however, is the atomic scale. In the electronic
polarization mechanism, we actually "looked" inside the atom - so we shouldn't
just stay on a "rough" scale and neglect the fine details. |
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Nevertheless, that is what we are going to do in the next paragraph: Neglect
the details. The approach may not be beyond reproach, but it works and gives simple relations. |
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© H. Föll (Electronic Materials - Script)
