Non asymptotic risk bounds for Classification And Regression Trees (CART) classifiers are obtained in the binary supervised classification framework under a margin assumption on the joint distribution of the covariates and the labels. These risk bounds are derived conditionally on the construction of the maximal binary tree and allow to prove that the linear penalty used in the CART pruning algorithm is valid under the margin condition. It is also shown that, conditionally on the construction of the maximal tree, the final selection by test sample does not alter dramatically the estimation accuracy of the Bayes classifier
Conference PaperIn this paper we challenge three of the underlying principles of CART, a well know a...
In many classification procedures, the classification function is obtained (or trained) by minimizi...
We consider the problem of adaptation to the margin in binary classi-fication. We suggest a penalize...
Risk bounds for Classification and Regression Trees (CART, Breiman et. al. 1984) classifiers are obt...
Margin adaptive risk bounds for Classification and Regression Trees (CART, Breiman et. al. 1984) cla...
International audienceRisk bounds for Classification and Regression Trees (CART, Breiman et. al. 198...
International audienceThe problems of model and variable selections for classification trees are joi...
The decision tree is a well-known methodology for classification and regression. In this dissertatio...
12 pagesInternational audienceThe performance of the Classification And Regression Trees (CART) prun...
Consider a family of binary classifiers G = {g: X 7 → {−1, 1}}. G can be either probabilistic models...
We analyze the expected risk of linear classifiers for a fixed weight vector in the “minimax” settin...
The purpose of this paper is to investigate statistical properties of risk minimization based multic...
International audienceWe consider the binary classification problem. Given an i.i.d. sample drawn fr...
We study how closely the optimal Bayes error rate can be approximately reached using a classificatio...
This paper deals with variable selection in regression and binary classification framework...
Conference PaperIn this paper we challenge three of the underlying principles of CART, a well know a...
In many classification procedures, the classification function is obtained (or trained) by minimizi...
We consider the problem of adaptation to the margin in binary classi-fication. We suggest a penalize...
Risk bounds for Classification and Regression Trees (CART, Breiman et. al. 1984) classifiers are obt...
Margin adaptive risk bounds for Classification and Regression Trees (CART, Breiman et. al. 1984) cla...
International audienceRisk bounds for Classification and Regression Trees (CART, Breiman et. al. 198...
International audienceThe problems of model and variable selections for classification trees are joi...
The decision tree is a well-known methodology for classification and regression. In this dissertatio...
12 pagesInternational audienceThe performance of the Classification And Regression Trees (CART) prun...
Consider a family of binary classifiers G = {g: X 7 → {−1, 1}}. G can be either probabilistic models...
We analyze the expected risk of linear classifiers for a fixed weight vector in the “minimax” settin...
The purpose of this paper is to investigate statistical properties of risk minimization based multic...
International audienceWe consider the binary classification problem. Given an i.i.d. sample drawn fr...
We study how closely the optimal Bayes error rate can be approximately reached using a classificatio...
This paper deals with variable selection in regression and binary classification framework...
Conference PaperIn this paper we challenge three of the underlying principles of CART, a well know a...
In many classification procedures, the classification function is obtained (or trained) by minimizi...
We consider the problem of adaptation to the margin in binary classi-fication. We suggest a penalize...