Functional local linear relative regression

Abdelkader Chahad; Ali Laksaci; Larbi Ait-Hennani

doi:10.1109/icmit47780.2020.9047027

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JOURNAL ARTICLE

Functional local linear relative regression

Abdelkader Chahad Ali Laksaci Larbi Ait-Hennani

Year: 2020 Vol: 12 Pages: 102-108

DOI: 10.1109/icmit47780.2020.9047027

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Abstract

In this contribution we present a new estimator of the regression operator of a scalar response variable given a functional explanatory variable. The last is built by limiting the mean squared relative error of the local linear regression operator. As asymptotic results, we prove the punctual and the uniform almost complete convergence with speed of this estimator.

Keywords:

Estimator Mathematics Linear regression Applied mathematics Regression analysis Statistics Convergence (economics) Proper linear model Regression Operator (biology) Mean squared error Scalar (mathematics) Bayesian multivariate linear regression

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Statistical Methods and Inference

Physical Sciences → Mathematics → Statistics and Probability

Numerical methods in inverse problems

Physical Sciences → Mathematics → Mathematical Physics

Mathematical Inequalities and Applications

Physical Sciences → Mathematics → Applied Mathematics

Functional local linear relative regression

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