Since a point group operation on a constant is still a constant, we act $P^$.You must have FFMpeg installed on your system and should have been configured with –enable-libfreetype $(P_\alpha K_m) Rn = 2\pi N_1$, where $N_1$ is an integer Let $K_m$ denotes a high-symmetry point in the first Brillouin zone of a lattice, $P_\alpha$ a symmetry operation of the point group that leaves $K_m$ invariant, $R_n$ a lattice vector with its end point on a lattice plane $(hkl)$ normal to $K_m$. I think it is possible because a reciprocal point corresponds to a family of lattice planes in direct space, however, I cannot establish a concret relation between symmetry operations on a point and on a family of planes.
How to relate point group of high-symmetry K point with the symmetry of the corresponding lattice planes? I have this question because I want to "visualize" the symmetry operations of a high-symmetry point in the first Brillouin zone in direct space. MeTchaikovsky Asks: How to relate point group of high-symmetry K point with the symmetry of the corresponding lattice planes?
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