Adaptive Warped Kernel Estimators

Abstract: In this work, we develop a method of adaptive non‐parametric estimation, based on ‘warped’ kernels. The aim is to estimate a real‐valued function s from a sample of random couples (X,Y). We deal with transformed data (Φ(X),Y), with Φ a one‐to‐one function, to build a collection of kernel estimators. The data‐driven bandwidth selection is performed with a method inspired by Goldenshluger and Lepski (Ann. Statist., 39, 2011, 1608). The method permits to handle various problems such as additive and multiplicative… Show more

“…As for Bouaziz et al [3], our kernel estimator depends on another estimator, so we need Assumption 3.8(ii) in order to control the difference between the kernel estimator (8) and the pseudo-estimator (11). If our kernel estimator did not involve another estimator, we would have considered condition  1/h ≤ k 0 n a 0 , as in Chagny [8], instead of Assumption 3.8(ii). The term in ln(p)/n in the remaining term comes from the control of |β − β 0 | 1 given by Proposition 3.4.…”

“…In this paper, we do not assume that the kernel K has a compact support, unlike Bouaziz et al [3]. The Breslow estimator (8) and the pseudo-estimator (11) are then well-defined for all t ∈ [0, τ ].…”

“…Chagny [8], in the context of an additive regression model, established an oracle inequality for the kernel estimator of the real-value regression function with a term remaining of order 1/n. In the context of estimation of the intensity of a recurrent event process observed under a standard censoring scheme but without covariates, Bouaziz et al [3] have a logarithm term which appears in their oracle inequality, with a term remaining of order ln 1+a (n)/n instead of the expected 1/n.…”

“…For this, we use a relatively recent method introduced by Goldenshluger and Lepski [14] for the problem of density estimation. The ''Goldenshluger and Lepski method'' has only been considered in two different settings: Bouaziz et al [3] has applied it to provide an adaptive kernel function estimator of the intensity function of a recurrent event process, and Chagny [8] has used it to estimate a real-valued function from a sample of random pairs. Recently, Chagny [7] has also proposed a ''mixed strategy'', which consists in applying the ''Goldenshluger and Lepski method'' to select the relevant model in model selection methods for real-valued function in regression models.…”

“…In the latter, the problem of bandwidth selection in kernel density estimation is addressed and an adaptive estimator is derived, which satisfies non-asymptotic minimax bounds. This method was then considered by Doumic et al [11] for estimating the division rate of a size-structured population in a non-parametric setting, by Bouaziz et al [3] to estimate the intensity function of a recurrent event process, and by Chagny [8] for the estimation of a real function via a warped kernel strategy. In the present paper, we consider this method in order to obtain an adaptive kernel estimator of the baseline function with a data-driven bandwidth.…”

Adaptive kernel estimation of the baseline function in the Cox model with high-dimensional covariates

“…As for Bouaziz et al [3], our kernel estimator depends on another estimator, so we need Assumption 3.8(ii) in order to control the difference between the kernel estimator (8) and the pseudo-estimator (11). If our kernel estimator did not involve another estimator, we would have considered condition  1/h ≤ k 0 n a 0 , as in Chagny [8], instead of Assumption 3.8(ii). The term in ln(p)/n in the remaining term comes from the control of |β − β 0 | 1 given by Proposition 3.4.…”

“…In this paper, we do not assume that the kernel K has a compact support, unlike Bouaziz et al [3]. The Breslow estimator (8) and the pseudo-estimator (11) are then well-defined for all t ∈ [0, τ ].…”

“…Chagny [8], in the context of an additive regression model, established an oracle inequality for the kernel estimator of the real-value regression function with a term remaining of order 1/n. In the context of estimation of the intensity of a recurrent event process observed under a standard censoring scheme but without covariates, Bouaziz et al [3] have a logarithm term which appears in their oracle inequality, with a term remaining of order ln 1+a (n)/n instead of the expected 1/n.…”

“…For this, we use a relatively recent method introduced by Goldenshluger and Lepski [14] for the problem of density estimation. The ''Goldenshluger and Lepski method'' has only been considered in two different settings: Bouaziz et al [3] has applied it to provide an adaptive kernel function estimator of the intensity function of a recurrent event process, and Chagny [8] has used it to estimate a real-valued function from a sample of random pairs. Recently, Chagny [7] has also proposed a ''mixed strategy'', which consists in applying the ''Goldenshluger and Lepski method'' to select the relevant model in model selection methods for real-valued function in regression models.…”

“…In the latter, the problem of bandwidth selection in kernel density estimation is addressed and an adaptive estimator is derived, which satisfies non-asymptotic minimax bounds. This method was then considered by Doumic et al [11] for estimating the division rate of a size-structured population in a non-parametric setting, by Bouaziz et al [3] to estimate the intensity function of a recurrent event process, and by Chagny [8] for the estimation of a real function via a warped kernel strategy. In the present paper, we consider this method in order to obtain an adaptive kernel estimator of the baseline function with a data-driven bandwidth.…”

Adaptive kernel estimation of the baseline function in the Cox model with high-dimensional covariates

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