Problem definition
When talking about solid meterials, the discussion is mainly around crystals - periodic lattices. Here we will discuss a 1 dimentional lattice of positive ions. Assuming the spacing between two ions is a, the potential in the lattice will look something like this:
The mathematical representation of the potential is a periodic function with a period a.
According to Bloch's theorem, the wavefunction solution of schroedinger's equation when the potential is periodic, can be written as:
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Where u(x) is a periodic function which satisfies: u(x+a)=u(x) ; u'(x+a)=u'(x)
When nearing the edges of the lattice, there are problems with the boundry condition. Therefore, we can represend the ion lattice as a ring. If L is the length of the lattice so that L>>a, then the number of ions in the lattice is so big, that when considering one ion, its surrounding is almost linear, and the wavefuntion of the electron is unchanged.
So now, instead of two boundry conditions we get one circular boundry condition:
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If N is the number of Ions in the lattice, then we have the relation: aN=L. Replacing in the boundry condition and applying Bloch's theorem will result in a quantization for k:
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