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On Linear Regression for Interval-valued Data in mathcal{K}_{mathcal{C}}left(mathbb{R}right)
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On Linear Regression for Interval-valued Data in mathcal{K}_{mathcal{C}}left(mathbb{R}right)
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It has been some time since interval-valued linear regression was investigated. In this paper, we focus on linear regression for interval-valued data within the framework of random sets. The model we propose generalizes a series of existing models. We establish important properties of the model in the space of compact convex subsets of $\mathbb{R}$, analogous to those for the classical linear regression. Furthermore, we carry out theoretical investigations into the least squares estimation that is widely used in the literature. A simulation study is presented that supports our theorems. Finally, an application to a climate data set is provided to demonstrate the applicability of our model.
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