Smoothing exponential-polynomial splines for multiexponential decay data
Title | Smoothing exponential-polynomial splines for multiexponential decay data |
Publication Type | Journal Article |
Year of Publication | 2019 |
Authors | Campagna, R, Conti, C, Cuomo, S |
Journal | Dolomites Research Notes on Approximation |
Volume | 12 |
Issue | 1 |
Pagination | 86-100 |
Date Published | 09/2019 |
Publisher | Padova University Press |
Place Published | Padova, IT |
ISSN Number | 2035-6803 |
Abstract | In many applications, the definition of fitting models that mimic the behaviour of experimental data is a challenging issue. In this paper a data-driven approach to represent (multi)exponential decay data is presented. We propose a fitting model based on smoothing splines defined by means of a differential operator. To solve the linear system involved in the smoothing exponential-polynomial spline definition, the main idea is to define B-spline like functions for the spline space, that are locally represented by Bernstein-like bases through Hermite interpolation conditions. |
URL | https://drna.padovauniversitypress.it/2019/1/9 |
DOI | 10.14658/pupj-drna-2019-1-9 |