Conditional quantile curves provide a comprehensive picture of a response contingent on explanatory variables. Quantile regression is a technique to estimate such curves. In a flexible modeling framework, a specific form of the quantile is not a priori fixed. Indeed, the majority of applications do not per se require specific functional forms. This motivates a local parametric rather than a global fixed model fitting approach. A nonparametric smoothing estimate of the conditional quantile curve requires to consider a balance between local curvature and variance. In this paper, we analyze a method based on a local model selection technique that provides an adaptive estimate. Theoretical properties on mimicking the oracle choice are offered a...
In this paper a new nonparametric estimate of conditional quantiles is proposed, that avoids the pro...
Estimating derivatives is of primary interest as it quantitatively measures the rate of change of th...
The choice of a smoothing parameter or bandwidth is crucial when applying non-parametric regression ...
Quantile regression is a technique to estimate conditional quantile curves. It pro-vides a comprehen...
Conditional quantile curves provide a comprehensive picture of a response contingent on explanatory ...
We propose a new approach to conditional quantile function estimation that combines both parametric ...
In this article we study nonparametric regression quantile estimation by kernel weighted local linea...
Abstract: We define a nonparametric prewhitening method for estimating condi-tional quantiles based ...
Non-parametric methods as local normal regression, polynomial local regression and penalized cubic B...
We define a nonparametric prewhitening method for estimating conditional quantiles based on local li...
Two popular nonparametric conditional quantile estimation methods, local constant fitting and local ...
Since the introduction by Koenker and Bassett, quantile regression has become increasingly important...
83 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2003.Quantile regression extends th...
Dieser Artikel enthält vier Kapitel. Das erste Kapitel ist berechtigt, '''' lokalen Quantil Regressi...
A nonparametric procedure for quantile regression, or more generally nonparametric M-estimation, is ...
In this paper a new nonparametric estimate of conditional quantiles is proposed, that avoids the pro...
Estimating derivatives is of primary interest as it quantitatively measures the rate of change of th...
The choice of a smoothing parameter or bandwidth is crucial when applying non-parametric regression ...
Quantile regression is a technique to estimate conditional quantile curves. It pro-vides a comprehen...
Conditional quantile curves provide a comprehensive picture of a response contingent on explanatory ...
We propose a new approach to conditional quantile function estimation that combines both parametric ...
In this article we study nonparametric regression quantile estimation by kernel weighted local linea...
Abstract: We define a nonparametric prewhitening method for estimating condi-tional quantiles based ...
Non-parametric methods as local normal regression, polynomial local regression and penalized cubic B...
We define a nonparametric prewhitening method for estimating conditional quantiles based on local li...
Two popular nonparametric conditional quantile estimation methods, local constant fitting and local ...
Since the introduction by Koenker and Bassett, quantile regression has become increasingly important...
83 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2003.Quantile regression extends th...
Dieser Artikel enthält vier Kapitel. Das erste Kapitel ist berechtigt, '''' lokalen Quantil Regressi...
A nonparametric procedure for quantile regression, or more generally nonparametric M-estimation, is ...
In this paper a new nonparametric estimate of conditional quantiles is proposed, that avoids the pro...
Estimating derivatives is of primary interest as it quantitatively measures the rate of change of th...
The choice of a smoothing parameter or bandwidth is crucial when applying non-parametric regression ...