The covariogram and Fourier-Laplace transform in Cn

Abstract

The covariogram gK of a convex body K in Rn is the function which associates to each x∈Rn the volume of the intersection of K with K+x. Determining K from the knowledge of gK is known as the Covariogram Problem. It is equivalent to determining the characteristic function 1K of K from the modulus of its Fourier transform 1K in Rn, a particular instance of the Phase Retrieval Problem. We connect the Covariogram Problem to two aspects of the Fourier transform 1K seen as a function in Cn. The first connection is with the problem of determining K from the knowledge of the zero set of 1K in Cn. To attack this problem T. Kobayashi studied the asymptotic behavior at infinity of this zero set. We obtain this asymptotic behavior assuming less regularity on K and we use this result as an essential ingredient for proving that when K is sufficiently smooth and in any dimension n, K is determined by gK in the class of sufficiently smooth bodies. The second connection is with the irreducibility of the entire function 1K. This connection also shows a link between the Covariogram Problem and the Pompeiu Problem in integral geometry.