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General Fitting Methods Based on Lq Norms and their Optimization

G. Livadiotis

2020Stats11 citationsDOIOpen Access PDF

Abstract

The widely used fitting method of least squares is neither unique nor does it provide the most accurate results. Other fitting methods exist which differ on the metric norm can be used for expressing the total deviations between the given data and the fitted statistical model. The least square method is based on the Euclidean norm L2, while the alternative least absolute deviations method is based on the Taxicab norm, L1. In general, there is an infinite number of fitting methods based on metric spaces induced by Lq norms. The most accurate, and thus optimal method, is the one with the (i) highest sensitivity, given by the curvature at the minimum of total deviations, (ii) the smallest errors of the fitting parameters, (iii) best goodness of fitting. The first two cases concern fitting methods where the given curve functions or datasets do not have any errors, while the third case deals with fitting methods where the given data are assigned with errors.

Topics & Concepts

MathematicsCurve fittingNorm (philosophy)Metric (unit)Goodness of fitCurvatureEuclidean distanceApplied mathematicsEuclidean geometryLeast absolute deviationsLeast-squares function approximationStatisticsMathematical optimizationAlgorithmGeometryRegressionEconomicsOperations managementLawEstimatorPolitical scienceStatistical and numerical algorithmsAdvanced Statistical Methods and ModelsControl Systems and Identification
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