2016
DOI: 10.1016/j.jmva.2016.03.002
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Adaptive kernel estimation of the baseline function in the Cox model with high-dimensional covariates

Abstract: International audienceWe propose a novel kernel estimator of the baseline function in a general high-dimensional Cox model, for which we derive non-asymptotic rates of convergence. To construct our estimator, we first estimate the regression parameter in the Cox model via a LASSO procedure. We then plug this estimator into the classical kernel estimator of the baseline function, obtained by smoothing the so-called Breslow estimator of the cumulative baseline function. We propose and study an adaptive procedure… Show more

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Cited by 7 publications
(4 citation statements)
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References 29 publications
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“…We follow the two-step procedure of Guilloux et al (2016): first, we estimate β from the penalized Cox partial likelihood, and then we estimate α 0 (t) from the kernel estimator introduced by Ramlau-Hansen (1983), in which we have plugged the Lasso estimate of β.…”
Section: The Cox Modelmentioning
confidence: 99%
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“…We follow the two-step procedure of Guilloux et al (2016): first, we estimate β from the penalized Cox partial likelihood, and then we estimate α 0 (t) from the kernel estimator introduced by Ramlau-Hansen (1983), in which we have plugged the Lasso estimate of β.…”
Section: The Cox Modelmentioning
confidence: 99%
“…For that purpose, we estimate the baseline risk α 0 (t), with the kernel estimator introduced by Ramlau-Hansen (1983). As for the Cox model, we estimate α 0 (t) with the two-steps procedure of Guilloux et al (2016) and this estimator is defined by:…”
Section: Cox-nnetmentioning
confidence: 99%
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“…Another point of origin for future research might be to consider the case of highdimensional covariates as was done recently in [GLT16a] and [GLT16b].…”
Section: Conclusion and Outlook To Future Researchmentioning
confidence: 99%