- #1
jonesj314
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Homework Statement
Si(001) has the following lattice vectors in a (2x1) reconstruction \vec{a'_1} = \vec{a_1} + \vec{a_2} \vec{a'_2} = -0.5 \vec{a_1} + 0.5 \vec{a_2}
Calculate the reciprocal lattice vectors of the reconstructed unit cell, \vec{b'_1} and \vec{b'_2} in terms of \vec{a_1} and \vec{a_2}.
Homework Equations
I have been using the formulae for finding reciprocal lattice vectors in 3D, i.e
\vec{b'_1} = 2 π \frac{(\vec{a'_2} ×\vec{a'_3})}{\vec{a'_1}. (\vec{a'_2} × \vec{a'_3})}
and the usual permutations for the other 2 reciprocal vectors
The Attempt at a Solution
Since I'm trying to do this for a 2D lattice I'm running into problems. If I treat \vec{a'_3} as simply being the z unit vector, then i find the numerator to be \vec{b'_1} = 2π (0.5 \vec{a_1} - 0.5 \vec{a_2}) is this correct for the numerator?? (it's orthogonal to \vec{a'_2} as I was expecting)
however, using this method I find the denominator to be zero since,
\vec{a'_1}. (\vec{a'_2} × \vec{a'_3}) = (\vec{a_1} + \vec{a_2}) . (0.5\vec{a_1} - 0.5\vec{a_2} )
and this dot product equals zero.
What am I doing wrong? Any help appreciated
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