Locally-weighted regression is a computationally-efficient technique for non-linear regression. However, for high-dimensional data, this technique becomes numerically brittle and computationally too expensive if many local models need to be maintained simultaneously. Thus, local linear dimensionality reduction combined with locally-weighted regression seems to be a promising solution. In this context, we review linear dimensionalityreduction methods, compare their performance on non-parametric locally-linear regression, and discuss their ability to extend to incremental learning. The considered methods belong to the following three groups: (1) reducing dimensionality only on the input data, (2) modeling the joint input-output data d...
This thesis has two themes: (1) the predictive potential of principal components in regression, and ...
Dimension reduction methods have come to the forefront of many applications where the number of cova...
Local polynomial fitting for univariate data has been widely studied and discussed, but up until now...
If globally high dimensional data has locally only low dimensional distributions, it is advantageous...
Locally weighted projection regression (LWPR) is a new algorithm for incremental nonlinear func- ti...
Locally weighted projection regression is a new algorithm that achieves nonlinear function approxima...
Locally weighted projection regression (LWPR) is a new algorithm for incremental non-linear function...
Locally weighted projection regression (LWPR) is a new algorithm for incremental nonlinear function ...
This paper presents a Local Learning Projection (LLP) approach for linear dimensionality reduction. ...
Abstract We propose a novel linear dimensionality reduction algorithm, namely Locally Regressive Pro...
We propose a novel dimensionality reduction approach based on the gradient of the regression functio...
In this paper we introduce an improved implementation of locally weighted projection regression (LW...
Incremental learning of sensorimotor transformations in high dimensional spaces is one of the basic ...
Linear dimensionality reduction methods are a cornerstone of analyzing high dimensional data, due to...
Locally weighted regression (LWR) was created as a nonparametric method that can approximate a wide ...
This thesis has two themes: (1) the predictive potential of principal components in regression, and ...
Dimension reduction methods have come to the forefront of many applications where the number of cova...
Local polynomial fitting for univariate data has been widely studied and discussed, but up until now...
If globally high dimensional data has locally only low dimensional distributions, it is advantageous...
Locally weighted projection regression (LWPR) is a new algorithm for incremental nonlinear func- ti...
Locally weighted projection regression is a new algorithm that achieves nonlinear function approxima...
Locally weighted projection regression (LWPR) is a new algorithm for incremental non-linear function...
Locally weighted projection regression (LWPR) is a new algorithm for incremental nonlinear function ...
This paper presents a Local Learning Projection (LLP) approach for linear dimensionality reduction. ...
Abstract We propose a novel linear dimensionality reduction algorithm, namely Locally Regressive Pro...
We propose a novel dimensionality reduction approach based on the gradient of the regression functio...
In this paper we introduce an improved implementation of locally weighted projection regression (LW...
Incremental learning of sensorimotor transformations in high dimensional spaces is one of the basic ...
Linear dimensionality reduction methods are a cornerstone of analyzing high dimensional data, due to...
Locally weighted regression (LWR) was created as a nonparametric method that can approximate a wide ...
This thesis has two themes: (1) the predictive potential of principal components in regression, and ...
Dimension reduction methods have come to the forefront of many applications where the number of cova...
Local polynomial fitting for univariate data has been widely studied and discussed, but up until now...