Radial Bases and Ill-Posed Problems

Chen, Ho-Pu

15 August 2006

RBFs are useful in scientific computing. In this thesis, we are interested in the positions of collocation points and RBF centers which causes the matrix for RBF interpolation singular and ill-conditioned. We explore the best bases by minimizing error function in supremum norm and root mean squares. We also use radial basis function to interpolate shifted data and find the best basis in certain sense. In the second part, we solve ill-posed problems by radial basis collocation method with different radial basis functions and various number of bases. If the solution is not unique, then the numerical solutions are different for different bases. To construct all the solutions, we can choose one approximation solution and add the linear combinations of the difference functions for various bases. If the solution does not exist, we show the numerical solution always fail to satisfy the origin equation.

ill-posed problems

radial basis function

Ill-Posed Problems in Early Vision

Bertero, Mario, Poggio, Tomaso, Torre, Vincent

01 May 1987

The first processing stage in computational vision, also called early vision, consists in decoding 2D images in terms of properties of 3D surfaces. Early vision includes problems such as the recovery of motion and optical flow, shape from shading, surface interpolation, and edge detection. These are inverse problems, which are often ill-posed or ill-conditioned. We review here the relevant mathematical results on ill-posed and ill-conditioned problems and introduce the formal aspects of regularization theory in the linear and non-linear case. More general stochastic regularization methods are also introduced. Specific topics in early vision and their regularization are then analyzed rigorously, characterizing existence, uniqueness, and stability of solutions.

computational vision

regularization theory

sinverse problems

ill-posed problems

Multiplication operators and its ill-posedness properties

G.Fleischer,

30 October 1998

This paper deals with the characterization of multiplication operators, especially with its behavior in the ill-posed case. We want to classify the different types and degrees of ill-posedness. We give some connections between this classification and regularization methods.

ill-posed

multiplication operator

MSC 47B38

MSC 65J20

ddc:510

Solving ill-posed problems with mollification and an application in biometrics

Lindgren, Emma

January 2018

This is a thesis about how mollification can be used as a regularization method to reduce noise in ill-posed problems in order to make them well-posed. Ill-posed problems are problems where noise get magnified during the solution process. An example of this is how measurement errors increases with differentiation. To correct this we use mollification. Mollification is a regularization method that uses integration or weighted average to even out a noisy function. The different types of error that occurs when mollifying are the truncation error and the propagated data error. We are going to calculate these errors and see what affects them. An other thing worth investigating is the ability to differentiate a mollified function even if the function itself can not be differentiated. An application to mollification is a blood vessel problem in biometrics where the goal is to calculate the elasticity of the blood vessel’s wall. To do this measurements from the blood and the blood vessel are required, as well as equations for the calculations. The model used for the calculations is ill-posed with regard to specific variables which is why we want to apply mollification. Here we are also going to take a look at how the noise level affects the final result as well as the mollification radius.

Mollification

regularization

ill-posed problems

biometrics

blood vessel

Mathematics

Matematik

PARAMETER SELECTION RULES FOR ILL-POSED PROBLEMS

Park, Yonggi

19 November 2019

No description available.

Applied Mathematics

Quadrature Approximation of Matrix Functions, with Applications

Martin, David Royce

19 June 2012

No description available.

Mathematics

matrix

numerical analysis

quadrature

ill-posed

Lanczos

network

Identification of General Source Terms in Parabolic Equations

Yi, Zhuobiao

January 2002

No description available.

Mathematics

IHCP

general source tem

ill-posed

inverse problem

mollification

Regularizace založená na metodách Krylovových podprostorů / Regularization based on Krylov subspace iterations

Kovtun, Viktor

January 2013

No description available.

Regularizační metody založené na metodách nejmenších čtverců / Regularizační metody založené na metodách nejmenších čtverců

Michenková, Marie

January 2013

Title: Regularization Techniques Based on the Least Squares Method Author: Marie Michenková Department: Department of Numerical Mathematics Supervisor: RNDr. Iveta Hnětynková, Ph.D. Abstract: In this thesis we consider a linear inverse problem Ax ≈ b, where A is a linear operator with smoothing property and b represents an observation vector polluted by unknown noise. It was shown in [Hnětynková, Plešinger, Strakoš, 2009] that high-frequency noise reveals during the Golub-Kahan iterative bidiagonalization in the left bidiagonalization vectors. We propose a method that identifies the iteration with maximal noise revealing and reduces a portion of high-frequency noise in the data by subtracting the corresponding (properly scaled) left bidiagonalization vector from b. This method is tested for different types of noise. Further, Hnětynková, Plešinger, and Strakoš provided an estimator of the noise level in the data. We propose a modification of this estimator based on the knowledge of the point of noise revealing. Keywords: ill-posed problems, regularization, Golub-Kahan iterative bidiagonalization, noise revealing, noise estimate, denoising 1

Numerical Methods for the Solution of Linear Ill-posed Problems

Alqahtani, Abdulaziz Mohammed M

28 November 2022

No description available.

Applied Mathematics

Golub–Kahan block bidiagonalization

large-scale discrete ill-posed problem

Tikhonov regularization

Ill-posed problem

Inverse problem

Chebfun

Truncated SVE.