The modulus of the Fourier transform on a sphere determines 3-dimensional convex polytopes

Abstract

Let P and P' be 3-dimensional convex polytopes in R3 and S ⊂eq R3 be a non-empty intersection of an open set with a sphere. As a consequence of a somewhat more general result it is proved that P and P' coincide up to translation and/or reflection in a point if |∫P e-is·x \,dx| = |∫P' e-is·x \,dx| for all s ∈ S. This can be applied to the field of crystallography regarding the question whether a nanoparticle modelled as a convex polytope is uniquely determined by the intensities of its X-ray diffraction pattern on the Ewald sphere.