Bayesian non-parametric simultaneous quantile regression for complete and grid data

Bayesian methods for non-parametric quantile regression have been considered with multiple continuous predictors ranging values in the unit interval. Two methods are proposed based on assuming that either the quantile function or the distribution function is smooth in the explanatory variables and i...

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Main Authors:	Das, Priyam, Ghosal, Subhashis
Format:	Article in Journal/Newspaper
Language:	unknown
Subjects:	Hastings North Atlantic
Online Access:	http://www.sciencedirect.com/science/article/pii/S0167947318300963

id	ftrepec:oai:RePEc:eee:csdana:v:127:y:2018:i:c:p:172-186
record_format	openpolar
spelling	ftrepec:oai:RePEc:eee:csdana:v:127:y:2018:i:c:p:172-186 2024-04-14T08:15:37+00:00 Bayesian non-parametric simultaneous quantile regression for complete and grid data Das, Priyam Ghosal, Subhashis http://www.sciencedirect.com/science/article/pii/S0167947318300963 unknown http://www.sciencedirect.com/science/article/pii/S0167947318300963 article ftrepec 2024-03-19T10:27:32Z Bayesian methods for non-parametric quantile regression have been considered with multiple continuous predictors ranging values in the unit interval. Two methods are proposed based on assuming that either the quantile function or the distribution function is smooth in the explanatory variables and is expanded in tensor product of B-spline basis functions. Unlike other existing methods of non-parametric quantile regressions, the proposed methods estimate the whole quantile function instead of estimating on a grid of quantiles. Priors on the coefficients of the B-spline expansion are put in such a way that the monotonicity of the estimated quantile levels are maintained unlike local polynomial quantile regression methods. The proposed methods are also modified for quantile grid data where only the percentile range of each response observations are known. A comparative simulation study of the performances of the proposed methods and some other existing methods are provided in terms of prediction mean squared errors and mean L1-errors over the quartiles. The proposed methods are used to estimate the quantiles of US household income data and North Atlantic hurricane intensity data. B-spline prior; Black-box optimization; Block Metropolis–Hastings; Non-parametric quantile regression; North Atlantic hurricane data; US household income data; Article in Journal/Newspaper North Atlantic RePEc (Research Papers in Economics) Hastings ENVELOPE(-154.167,-154.167,-85.567,-85.567)
institution	Open Polar
collection	RePEc (Research Papers in Economics)
op_collection_id	ftrepec
language	unknown
description	Bayesian methods for non-parametric quantile regression have been considered with multiple continuous predictors ranging values in the unit interval. Two methods are proposed based on assuming that either the quantile function or the distribution function is smooth in the explanatory variables and is expanded in tensor product of B-spline basis functions. Unlike other existing methods of non-parametric quantile regressions, the proposed methods estimate the whole quantile function instead of estimating on a grid of quantiles. Priors on the coefficients of the B-spline expansion are put in such a way that the monotonicity of the estimated quantile levels are maintained unlike local polynomial quantile regression methods. The proposed methods are also modified for quantile grid data where only the percentile range of each response observations are known. A comparative simulation study of the performances of the proposed methods and some other existing methods are provided in terms of prediction mean squared errors and mean L1-errors over the quartiles. The proposed methods are used to estimate the quantiles of US household income data and North Atlantic hurricane intensity data. B-spline prior; Black-box optimization; Block Metropolis–Hastings; Non-parametric quantile regression; North Atlantic hurricane data; US household income data;
format	Article in Journal/Newspaper
author	Das, Priyam Ghosal, Subhashis
spellingShingle	Das, Priyam Ghosal, Subhashis Bayesian non-parametric simultaneous quantile regression for complete and grid data
author_facet	Das, Priyam Ghosal, Subhashis
author_sort	Das, Priyam
title	Bayesian non-parametric simultaneous quantile regression for complete and grid data
title_short	Bayesian non-parametric simultaneous quantile regression for complete and grid data
title_full	Bayesian non-parametric simultaneous quantile regression for complete and grid data
title_fullStr	Bayesian non-parametric simultaneous quantile regression for complete and grid data
title_full_unstemmed	Bayesian non-parametric simultaneous quantile regression for complete and grid data
title_sort	bayesian non-parametric simultaneous quantile regression for complete and grid data
url	http://www.sciencedirect.com/science/article/pii/S0167947318300963
long_lat	ENVELOPE(-154.167,-154.167,-85.567,-85.567)
geographic	Hastings
geographic_facet	Hastings
genre	North Atlantic
genre_facet	North Atlantic
op_relation	http://www.sciencedirect.com/science/article/pii/S0167947318300963
_version_	1796314000633364480

Bayesian non-parametric simultaneous quantile regression for complete and grid data

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