The property of almost every point being a Lebesgue point has proven to be crucial for the consistency of several classification algorithms based on nearest neighbors. We characterize Lebesgue points in terms of a 1-Nearest Neighbor regression algorithm for pointwise estimation, fleshing out the role played by tie-breaking rules in the corresponding convergence problem. We then give an application of our results, proving the convergence of the risk of a large class of 1-Nearest Neighbor classification algorithms in general metric spaces where almost every point is a Lebesgue point.
A Nearest Neighbor Characterization of Lebesgue Points in Metric Measure Spaces / T. Cesari, R. Colomboni. - In: MATHEMATICAL STATISTICS AND LEARNING. - ISSN 2520-2316. - 3:1(2020), pp. 71-112. [10.4171/MSL/19]
A Nearest Neighbor Characterization of Lebesgue Points in Metric Measure Spaces
T. Cesari
Primo
;R. ColomboniUltimo
2020
Abstract
The property of almost every point being a Lebesgue point has proven to be crucial for the consistency of several classification algorithms based on nearest neighbors. We characterize Lebesgue points in terms of a 1-Nearest Neighbor regression algorithm for pointwise estimation, fleshing out the role played by tie-breaking rules in the corresponding convergence problem. We then give an application of our results, proving the convergence of the risk of a large class of 1-Nearest Neighbor classification algorithms in general metric spaces where almost every point is a Lebesgue point.
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