An identity theorem for the Fourier transform of polytopes on rationally parameterisable hypersurfaces

Abstract

A set S of points in Rn is called a rationally parameterisable hypersurface if S=\σ(t): t ∈ D\, where σ: Rn-1 → Rn is a vector function with domain D and rational functions as components. A generalized n-dimensional polytope in Rn is a union of a finite number of convex n-dimensional polytopes in Rn. The Fourier transform of such a generalized polytope P in Rn is defined by FP(s)=∫P e-is·x \,dx. We prove that FP1(σ(t)) = FP2(σ(t))\ ∀ t ∈ O implies P1=P2 if O is an open subset of D satisfying some well-defined conditions. Moreover we show that this theorem can be applied to quadric hypersurfaces that do not contain a line, but at least two points, i.e., in particular to spheres.