Publications in Scientific Journals:
S. de la Rosa de Saa, M.A. Lubiano, B. Sinova, P. Filzmoser, M. Gil:
"Location-free robust scale estimates for fuzzy data";
IEEE Transactions on Fuzzy Systems,
29
(2021),
1682
- 1694.
English abstract:
In analyzing fuzzy-valued imprecise data statistically, scale measures/estimates play an important role. Scale measures/estimates of datasets are often considered, among others, to descriptively summarize them, to compare the dispersion or the spread of different datasets, to standardize data, to state rules for detecting outliers, to formulate regression objective functions, and so on. To be robust, an estimate of scale should have a finite breakdown point close to 50% (i.e., around half data should be replaced by `outliersī to make the estimate break down, either in the sense of exploding to infinity or imploding to zero). In this respect, the Median Distance Deviation about the median (MDD) for fuzzy datasets has already been introduced and its robust behaviour has been proved. In contrast to the real-valued case, computation of the MDD for fuzzy data is much more complex and cannot be exactly but approximately performed in general. These computational inconveniencies are mainly associated with the fact that, in general, the `median of the fuzzy datasetī cannot be exactly calculated, but simply approximated through some levels, and the same happens with the distances between data and the approximate median. Consequently, the use of location-free scale measures would be especially appropriate in this setting. This paper aims to extend some robust global scale estimates and to show that the extension remains robust and they can be easily and exactly computed for fuzzy trapezoidal data. Consequently, the use of location-free scale measures would be especially appropriate-to-use in this fuzzy-valued environment. This paper aims to extend some robust global scale estimates, and to prove that the extension remains robust. Furthermore, it will be shown that these estimates can be easily and exactly computed for fuzzy trapezoidal data, the assumption of considering trapezoidal data not implying an important loss of generality in the setting of scale estimation.
"Official" electronic version of the publication (accessed through its Digital Object Identifier - DOI)
http://dx.doi.org/10.1109/TFUZZ.2020.2984203
Electronic version of the publication:
https://www.researchgate.net/publication/340392775_Location-free_robust_scale_estimates_for_fuzzy_data
Created from the Publication Database of the Vienna University of Technology.