Minimum average variance estimation (MAVE, Xia et al: 2002) is an effective dimension reduction method. It requires no strong probabilistic assumptions on the predictors, and can consistently estimate the central mean subspace. It is applicable to a wide range of models, including time series. However, the least squares criterion used in MAVE will lose its effciency when the error is not normally distributed. In this article, we propose an adaptive MAVE which can be adaptive to different error distributions. We show that the proposed estimate has the same convergence rate as the original MAVE. An EM algorithm is proposed to implement the new adaptive MAVE. Using both simulation studies and a real data analysis, we demonstrate the superior ...
Most dimension reduction methods based on nonparametric smoothing are highly sensitive to outliers a...
International audienceIn this paper, we address the problem of regression estimation in the context ...
Stable autoregressive models of known finite order are considered with martingale differences errors s...
Minimum average variance estimation (MAVE, Xia et al: 2002) is an effective dimension reduction meth...
AbstractMinimum average variance estimation (MAVE, Xia et al. (2002) [29]) is an effective dimension...
Searching for an effective dimension reduction space is an important problem in regression, especial...
Most dimension reduction methods based on nonparametric smoothing are highly sensitive to outliers ...
Dimension reduction and variable selection play important roles in high dimensional data analysis. T...
High-dimensional data are becoming increasingly available as data collection technology advances. Ov...
this paper, we shall propose a new method to estimate the EDR directions. We call it the (conditiona...
In order to reduce the dimension of input vectors before construction of ap-proximation MAVE-type me...
Dimension reduction and variable selection play important roles in high dimensional data analysis. T...
Traditional variable selection methods are model based and may suffer from possible model misspecifi...
We investigate the estimation efficiency of the central mean subspace in the framework of sufficient...
International audienceIn regression with a high-dimensional predictor vector, dimension reduction me...
Most dimension reduction methods based on nonparametric smoothing are highly sensitive to outliers a...
International audienceIn this paper, we address the problem of regression estimation in the context ...
Stable autoregressive models of known finite order are considered with martingale differences errors s...
Minimum average variance estimation (MAVE, Xia et al: 2002) is an effective dimension reduction meth...
AbstractMinimum average variance estimation (MAVE, Xia et al. (2002) [29]) is an effective dimension...
Searching for an effective dimension reduction space is an important problem in regression, especial...
Most dimension reduction methods based on nonparametric smoothing are highly sensitive to outliers ...
Dimension reduction and variable selection play important roles in high dimensional data analysis. T...
High-dimensional data are becoming increasingly available as data collection technology advances. Ov...
this paper, we shall propose a new method to estimate the EDR directions. We call it the (conditiona...
In order to reduce the dimension of input vectors before construction of ap-proximation MAVE-type me...
Dimension reduction and variable selection play important roles in high dimensional data analysis. T...
Traditional variable selection methods are model based and may suffer from possible model misspecifi...
We investigate the estimation efficiency of the central mean subspace in the framework of sufficient...
International audienceIn regression with a high-dimensional predictor vector, dimension reduction me...
Most dimension reduction methods based on nonparametric smoothing are highly sensitive to outliers a...
International audienceIn this paper, we address the problem of regression estimation in the context ...
Stable autoregressive models of known finite order are considered with martingale differences errors s...