Kilian Stampfer scite author profile

Kilian Stampfer

4Publications

66Citation Statements Received

64Citation Statements Given

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University of Göttingen

Publications

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Reconstruction of stationary and non-stationary signals by the generalized Prony method

2019

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We employ the generalized Prony method in [T. Peter and G. Plonka, A generalized Prony method for reconstruction of sparse sums of eigenfunctions of linear operators, Inverse Problems 29 (2013) 025001] to derive new reconstruction schemes for a variety of sparse signal models using only a small number of signal measurements. By introducing generalized shift operators, we study the recovery of sparse trigonometric and hyperbolic functions as well as sparse expansions into Gaussians chirps and modulated Gaussian windows. Furthermore, we show how to reconstruct sparse polynomial expansions and sparse non-stationary signals with structured phase functions.

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The Generalized Operator Based Prony Method

Stampfer

Plonka

2020

Constr Approx

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The generalized Prony method introduced in [13] is a reconstruction technique for a large variety of sparse signal models that can be represented as sparse expansions into eigenfunctions of a linear operator A. However, this procedure requires the evaluation of higher powers of the linear operator A that are often expensive to provide.In this paper we propose two important extensions of the generalized Prony method that simplify the acquisition of the needed samples essentially and at the same time can improve the numerical stability of the method. The first extension regards the change of operators from A to ϕ(A), where ϕ is an analytic function, while A and ϕ(A) possess the same set of eigenfunctions. The goal is now to choose ϕ such that the powers of ϕ(A) are much simpler to evaluate than the powers of A. The second extension concerns the choice of the sampling functionals. We show, how new sets of different sampling functionals F k can be applied with the goal to reduce the needed number of powers of the operator A (resp. ϕ(A)) in the sampling scheme and to simplify the acquisition process for the recovery method.

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Reconstruction of Non‐Stationary Signals by the Generalized Prony Method

Keller

Plonka

Stampfer

2019

Proc Appl Math and Mech

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The Generalized Operator Based Prony Method

Stampfer¹

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Kilian Stampfer

Reconstruction of stationary and non-stationary signals by the generalized Prony method

The Generalized Operator Based Prony Method

Reconstruction of Non‐Stationary Signals by the Generalized Prony Method

The Generalized Operator Based Prony Method

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