TY - JOUR
T1 - Geometry and singularities of the prony mapping
AU - Batenkov, Dmitry
AU - Yomdin, Yosef
N1 - Publisher Copyright:
© 2014, Worldwide Center of Mathematics. All rights reserved.
PY - 2014
Y1 - 2014
N2 - The Prony mapping provides the global solution of the Prony system of equations (formula presented) This system appears in numerous theoretical and applied problems arising in Signal Reconstruction. The simplest example is the problem of reconstruction of linear combination of δ functions of the form (formula presented) with the unknown parameters ai, xi, i=1,..., n from the “moment measurements” (formula presented).The global solution of the Prony system, i.e., the inversion of the Prony mapping, encounters several types of singularities. One of the most important ones is a collision of some of the points xi: The investigation of this type of singularities has been started in [21] where the role of finite differences was demonstrated.In the present paper we study this and other types of singularities of the Prony mapping, and describe its global geometry. We show, in particular, close connections of the Prony mapping with the “Vieta mapping” expressing the coefficients of a polynomial through its roots, and with hyperbolic polynomials and “Vandermonde mapping” studied by V. Arnold.
AB - The Prony mapping provides the global solution of the Prony system of equations (formula presented) This system appears in numerous theoretical and applied problems arising in Signal Reconstruction. The simplest example is the problem of reconstruction of linear combination of δ functions of the form (formula presented) with the unknown parameters ai, xi, i=1,..., n from the “moment measurements” (formula presented).The global solution of the Prony system, i.e., the inversion of the Prony mapping, encounters several types of singularities. One of the most important ones is a collision of some of the points xi: The investigation of this type of singularities has been started in [21] where the role of finite differences was demonstrated.In the present paper we study this and other types of singularities of the Prony mapping, and describe its global geometry. We show, in particular, close connections of the Prony mapping with the “Vieta mapping” expressing the coefficients of a polynomial through its roots, and with hyperbolic polynomials and “Vandermonde mapping” studied by V. Arnold.
KW - Moments inversion
KW - Non-linear models
KW - Signal acquisition
KW - Singularities
UR - http://www.scopus.com/inward/record.url?scp=84919880999&partnerID=8YFLogxK
U2 - 10.5427/jsing.2014.10a
DO - 10.5427/jsing.2014.10a
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AN - SCOPUS:84919880999
SN - 1949-2006
VL - 10
SP - 1
EP - 25
JO - Journal of Singularities
JF - Journal of Singularities
ER -