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Windowed Spectral Regularization of Inverse Problems
SIAM Journal on Scientific Computing, 2011Regularization is used in order to obtain a reasonable estimate of the solution to an ill-posed inverse problem. One common form of regularization is to use a filter to reduce the influence of components corresponding to small singular values, perhaps using a Tikhonov least squares formulation.
Julianne Chung +2 more
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Designing Optimal Spectral Filters for Inverse Problems
SIAM Journal on Scientific Computing, 2011Summary: Spectral filtering suppresses the amplification of errors when computing solutions to ill-posed inverse problems; however, selecting good regularization parameters is often expensive. In many applications, data are available from calibration experiments. In this paper, we describe how to use such data to precompute optimal spectral filters. We
Julianne Chung +2 more
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Solution of the finite complex Toda lattice by the method of inverse spectral problem
We show that the finite Toda lattice with complex-valued initial data can be integrated by the method of inverse spectral problem. For this goal spectral data for complex Jacobi matrices are introduced and an inverse spectral problem with respect to the ...
Gusein Sh Guseinov
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On an inverse spectral problem
Russian Journal of Mathematical Physics, 2017The author considers the inverse spectral problem of reconstructing a function \(Q\) appearing in \[ (Qy')' +\lambda (y(x)-ky''(x))=0\text{ for }0\leq x \leq 1, \] where \(y\) is subject to \[ y(0)=y(1)=0,\, \int_0^1 y(x)dx=0 \] for \(k>0\). The sought \(Q\) is normalized by \(\int_0^1 Q(x)dx=1\) and the question is to find \(Q\) that minimizes the ...
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On the Uniqueness of the Solution of an Inverse Spectral Problem
Differential Equations, 2003A uniqueness theorem is proved for the inverse spectral problem of recovering coefficients of the boundary conditions from the spectrum of the boundary value problem \[ y''+p_1(x)y'+(\lambda^2 p_{20}(x)+\lambda p_{21}(x)+p_{22}(x))y=0 ...
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On inverse spectral problem for non-selfadjoint Sturm–Liouville operator on a finite interval
An inverse spectral problem is studied for a non-selfadjoint Sturm–Liouville operator on a finite interval with an arbitrary behavior of the spectrum.
Sergey Buterin
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SPECTRAL INVERSE PROBLEM IN SUPERSYMMETRIC QUANTUM MECHANICS
International Journal of Modern Physics A, 1993The supersymmetric WKB quantization condition is used to study the so-called spectral inverse problem. Wavefunctions for the harmonic oscillator and hydrogen atom are obtained from the knowledge of their bound-state energy spectra. The analysis presented is based essentially on a repackaging of the conventional theory of integral equations.
Bera, P. K. +2 more
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An inverse spectral problem for the Laplacian
Applicable Analysis, 2005We propose an algorithm for the recovery of a potential from the knowledge of the eigenvalues of the Laplacian operator and the traces of its eigenfunctions. This inverse spectral problem is solved by recasting the operator as an infinite matrix and using transition matrices together with spectral projections on the boundary.
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The Zakharov–Shabat inverse spectral problem for operators
Journal of Mathematical Physics, 1993Many soliton equations, their solutions and their properties, can be deduced from simpler (essentially linear) equations involving more complicated objects, e.g., integral operators. The deduction process from the operator-valued equation to the scalar one amounts to some rather simple procedure like taking a trace or a determinant.
Bauhardt, Wolfgang, Pöppe, Christoph
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Spectral Analysis of an Inverse Problem
2013In this chapter we treat the solution of systems of linear equations in finite dimension spaces. This can be seen as examples of inverse reconstruction problems of Type I.We present a mathematical analysis of these linear inverse problems of finite dimension based on the spectral theorem.We study several aspects and behaviour of well-established ...
Francisco Duarte Moura Neto +1 more
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