Fraunhofer Diffraction Using a Fast Fourier Transform
Fraunhofer Diffraction Using a Fast Fourier Transform
Patterns resulting from the refraction of light through a grating of slits or through a crystal show the phenomena of interference as the sum of path-dependent phases. Thomas Young and Max von Laue first published results on the diffraction of visible light in 1803 and on the diffraction of X-rays in 1912. A simulation can recreate both results using a combination of Huygens' principle and the Fraunhofer or far-field approximation. When the grating is dense on a scale comparable to the wavelength, each infinitesimal region of zero density within a slit emits a spherical wave. When an atomic configuration is not dense on a scale comparable to the wavelength, each point of non-zero density emits a spherical wave. In the limit where the target is far from the grating or atomic configuration, the integral expression describing the diffraction pattern can be rewritten in terms of the Fourier transform. That is, the diffraction pattern is the Fourier transform of some interpretation of the density function. Measurements of diffraction patterns have so accurately characterized the symmetry of crystals that some crystallographers have recently suggested a criterion for a material to be classified as a crystal if its diffraction pattern shows discrete maximums or Bragg peaks. This definition can include crystals with both periodic order and aperiodic order, as these diffraction patterns show.