Litcius/Paper detail

Functional regression on the manifold with contamination

Zhenhua Lin, Fang Yao

2020Biometrika19 citationsDOI

Abstract

Summary We propose a new method for functional nonparametric regression with a predictor that resides on a finite-dimensional manifold, but is observable only in an infinite-dimensional space. Contamination of the predictor due to discrete or noisy measurements is also accounted for. By using functional local linear manifold smoothing, the proposed estimator enjoys a polynomial rate of convergence that adapts to the intrinsic manifold dimension and the contamination level. This is in contrast to the logarithmic convergence rate in the literature of functional nonparametric regression. We also observe a phase transition phenomenon related to the interplay between the manifold dimension and the contamination level. We demonstrate via simulated and real data examples that the proposed method has favourable numerical performance relative to existing commonly used methods.

Topics & Concepts

MathematicsManifold (fluid mechanics)Nonparametric regressionEstimatorNonparametric statisticsSmoothingDimension (graph theory)Applied mathematicsRate of convergenceLogarithmNonlinear dimensionality reductionPolynomialIntrinsic dimensionConvergence (economics)Regression analysisStatisticsMathematical analysisDimensionality reductionCurse of dimensionalityArtificial intelligencePure mathematicsComputer scienceEconomicsMechanical engineeringChannel (broadcasting)EngineeringComputer networkEconomic growthStatistical Methods and InferenceGenetic and phenotypic traits in livestockBayesian Methods and Mixture Models