Weighted Total Least Squares with correlated coefficients

Versione 1.0.0 (42,5 KB) da Matthias Wurm

Solving linear systems with correlated coefficients using weighted total least squares

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Aggiornato 17 dic 2021

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This function solves over-determined linear systems of the form (A+dA)x = (b+db) numerically.

Individual weights for and correlations between the deviations [dA,db] are allowed.

These weights have to be given as a matrix W, which typically is the inverse of a (positive definite) covariance-matrix.

If A is a (m x n) matrix, then b has to be a (m x 1) vector and the weight matrix has to be a (m (n+1) x m (n+1)) matrix.

This is different from the so-called "general total leat squares" method, where only column or row-wise correlations are considered.

Additionally it is allowed to declare individual elements of a [A,b] to be free of errors.

The covariance matrix of the best fitting x-vector is provided.

The code has been optimized to achieve high computational speed.

"lsqnonlin" from the "optimization toolbox" is needed.

For large problems and highest performance A, b, and W should be declared as gpuArrays (which requires the "Parallel Computing Toolbox").

Partially modified code from other authors is required and included:

- "wtls_line" and "wtlsc_line" from Anton

- "multiprod" from de Leva

- "derivest", "hessdiag", "hessian", and "nderivediag" from D'Errico

- "gmtls" and "mtls" from Houtzager

- "gtls" from Rhode

(full references are given in the paper)

Best practice: Use the demo to see some examples and check the paper.

Cita come

Matthias Wurm (2024). Weighted Total Least Squares with correlated coefficients (https://www.mathworks.com/matlabcentral/fileexchange/103720-weighted-total-least-squares-with-correlated-coefficients), MATLAB Central File Exchange. Recuperato aprile 26, 2024.

Wurm, Matthias. “A Universal and Fast Method to Solve Linear Systems with Correlated Coefficients Using Weighted Total Least Squares.” Measurement Science and Technology, vol. 33, no. 1, IOP Publishing, Nov. 2021, p. 015017, doi:10.1088/1361-6501/ac32ec.

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Ispirato da: weighted total least squares straight line fit, weighted total least squares for mutually correlated coordinates, Adaptive Robust Numerical Differentiation, Multiple matrix multiplications, with array expansion enabled

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Versione	Pubblicato	Note della release
1.0.0	17 dic 2021		Scarica

MLA	Wurm, Matthias. “A Universal and Fast Method to Solve Linear Systems with Correlated Coefficients Using Weighted Total Least Squares.” Measurement Science and Technology, vol. 33, no. 1, IOP Publishing, Nov. 2021, p. 015017, doi:10.1088/1361-6501/ac32ec.
APA	Wurm, M. (2021). A universal and fast method to solve linear systems with correlated coefficients using weighted total least squares. Measurement Science and Technology, 33(1), 015017. IOP Publishing. Retrieved from https://doi.org/10.1088%2F1361-6501%2Fac32ec
BibTeX	@article{Wurm_2021, doi = {10.1088/1361-6501/ac32ec}, url = {https://doi.org/10.1088%2F1361-6501%2Fac32ec}, year = 2021, month = {nov}, publisher = {{IOP} Publishing}, volume = {33}, number = {1}, pages = {015017}, author = {Matthias Wurm}, title = {A universal and fast method to solve linear systems with correlated coefficients using weighted total least squares}, journal = {Measurement Science and Technology} }