Non-asymptotic behavior and the distribution of the spectrum of the finite Hankel transform operator

Abstract

For a fixed reals c>0, a>0 and α>-12, the circular prolate spheroidal wave functions (CPSWFs) or 2d-Slepian functions as some authors call it, are the eigenfunctions of the finite Hankel transform operator, denoted by Hcα, which is the integral operator defined on L2(0,1) with kernel Hcα(x,y)=cxyJα(cxy). Also, they are the eigenfunctions of the positive, self-adjoint compact integral operator Qcα=cHcαHcα. The CPSWFs play a central role in many applications such as the analysis of 2d-radial signals. Moreover, a renewed interest on the CPSWFs instead of Fourier-Bessel basis is expected to follow from the potential applications in Cryo-EM and that makes them attractive for steerable of principal component analysis(PCA). For this purpose, we give in this paper a precise non-asymptotic estimates for these eigenvalues, within the three main regions of the spectrum of Qcα as well as these distributions in (0,1). Moreover, we describe a series expansion of CPSWFs with respect to the generalized Laguerre functions basis of L2(0,∞) defined by n,αa(x)=2aα+1xα+1/2e-(ax)22Lnα(a2x2), where Lnα is the normalised Laguerre polynomial.