Singular value analysis and reconstruction of photon correlation data equidistant in time
- 15 December 1989
- journal article
- Published by AIP Publishing in The Journal of Chemical Physics
- Vol. 91 (12), 7374-7383
- https://doi.org/10.1063/1.457260
Abstract
No abstract availableKeywords
This publication has 16 references indexed in Scilit:
- Particle size distributions determined by a "multiangle" analysis of photon correlation spectroscopy dataLangmuir, 1987
- Maximum entropy analysis of quasielastic light scattering from colloidal dispersionsThe Journal of Chemical Physics, 1986
- On the recovery and resolution of exponential relaxation rates from experimental data. - III. The effect of sampling and truncation of data on the Laplace transform inversionProceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences, 1985
- Retrieval of frequencies, amplitudes, damping factors, and phases from time-domain signals using a linear least-squares procedureJournal of Magnetic Resonance (1969), 1985
- On the recovery and resolution of exponential relaxational rates from experimental data: Laplace transform inversions in weighted spacesInverse Problems, 1985
- On the recovery and resolution of exponential relaxation rates from experimental data II. The optimum choice of experimental sampling points for Laplace transform inversionProceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences, 1984
- On the recovery and resolution of exponential relaxation rates from experimental data: a singular-value analysis of the Laplace transform inversion in the presence of noiseProceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences, 1982
- CONTIN: A general purpose constrained regularization program for inverting noisy linear algebraic and integral equationsComputer Physics Communications, 1982
- A constrained regularization method for inverting data represented by linear algebraic or integral equationsComputer Physics Communications, 1982
- Approximate linear realizations of given dimension via Ho's algorithmIEEE Transactions on Automatic Control, 1974