Geometry and Singularities of Prony varieties

Abstract

We start a systematic study of the topology, geometry and singularities of the Prony varieties Sq(μ), defined by the first q+1 equations of the classical Prony system Σj=1d aj xjk = μk, \ k= 0,1,… \ . Prony varieties, being a generalization of the Vandermonde varieties, introduced in [5,21], present a significant independent mathematical interest (compare [5,19,21]). The importance of Prony varieties in the study of the error amplification patterns in solving Prony system was shown in [1-4,19]. In [19] a survey of these results was given, from the point of view of Singularity Theory. In the present paper we show that for q d the variety Sq(μ) is diffeomerphic to an intersection of a certain affine subspace in the space Vd of polynomials of degree d, with the hyperbolic set Hd. On the Prony curves S2d-2 we study the behavior of the amplitudes aj as the nodes xj collide, and the nodes escape to infinity. We discuss the behavior of the Prony varieties as the right hand side μ varies, and possible connections of this problem with J. Mather's result in [23] on smoothness of solutions in families of linear systems.