Joint estimation of conditional quantiles in multivariate linear regression models with an application to financial distress

Petrella, Lea; Raponi, Valentina

doi:10.1016/j.jmva.2019.02.008

Cited by 43 publications

(64 citation statements)

References 50 publications

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“…(2001). In the quantile regression framework, the extension to multivariate responses has been dealt by Petrella and Raponi (2019). They account for the association among several responses while studying the effect of observed predictors on different quantiles of the marginal (univariate) conditional distribution of the responses.…”

Section: Introductionmentioning

confidence: 99%

M-Quantile Regression for Multivariate Longitudinal Data with an Application to the Millennium Cohort Study

Alfó

Marino

Ranalli

et al. 2021

Journal of the Royal Statistical Society Series C: Applied Statistics

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Motivated by the analysis of data from the UK Millennium Cohort Study on emotional and behavioural disorders, we develop an M‐quantile regression model for multivariate longitudinal responses. M‐quantile regression is an appealing alternative to standard regression models; it combines features of quantile and expectile regression and it may produce a detailed picture of the conditional response variable distribution, while ensuring robustness to outlying data. As we deal with multivariate data, we need to specify what it is meant by M‐quantile in this context, and how the structure of dependence between univariate profiles may be accounted for. Here, we consider univariate (conditional) M‐quantile regression models with outcome‐specific random effects for each outcome. Dependence between outcomes is introduced by assuming that the random effects in the univariate models are dependent. The multivariate distribution of the random effects is left unspecified and estimated from the observed data. Adopting this approach, we are able to model dependence both within and between outcomes. We further discuss a suitable model parameterisation to account for potential endogeneity of the observed covariates. An extended EM algorithm is defined to derive estimates under a maximum likelihood approach.

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Section: Introductionmentioning

confidence: 99%

M-Quantile Regression for Multivariate Longitudinal Data with an Application to the Millennium Cohort Study

Alfó

Marino

Ranalli

et al. 2021

Journal of the Royal Statistical Society Series C: Applied Statistics

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show abstract

“…, σ p )). Petrella and Raponi (2019) proved that the j-th marginal distribution of Y i under the assumption of MAL distribution is a UAL distribution AL(β T τ j X i , τ j , σ j ) for j ∈ 1, . .…”

Section: Multivariate Quantile Regression Model and Its Joint Working Likelihoodmentioning

confidence: 99%

“…There is scattered literature for joint quantile inference of multivariate-response regression models. Recently, Petrella and Raponi (2019) extended the univariate linear quantile regression approach to a multivariate framework based on the multivariate asymmetric Laplace (MAL) distribution using EM algorithm. In this paper, we consider joint inference of the multivariate linear quantie regression models from a Bayesian point of view.…”

Section: Introductionmentioning

confidence: 99%

Bayesian joint inference for multivariate quantile regression model with L$$_{1/2}$$ penalty

2021

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This paper considers a Bayesian approach for joint estimation of the marginal conditional quantiles from several dependent variables under a linear regression framework. This approach incorporates the dependence among different dependent variables in the regression model which studies how the relationship between dependent variables and a set of explanatory variables can vary across different quantiles of the marginal conditional distribution of the dependent variables. A Bayesian regularization approach with L 1/2 penalty is adopted to conduct high-dimensional variable selection. Some simulation studies are conducted to evaluate the performance of our proposed method. We illustrate the proposed estimation approach using a real data set on energy efficiency with two responses.

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“…On the other hand, the other method is called the backward method, in which we assume a complicated model first, and we then fit the model, trying to simplify it. Both methods could achieve the same goal for modeling the data appropriately, depending on the given situation and features of the data set [17].…”

Section: Multiple Linear Regression Model For Housing Pricementioning

confidence: 99%

Housing Price Prediction Based on Multiple Linear Regression

Zhang

2021

Scientific Programming

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In this paper, the author first analyzes the major factors affecting housing prices with Spearman correlation coefficient, selects significant factors influencing general housing prices, and conducts a combined analysis algorithm. Then, the author establishes a multiple linear regression model for housing price prediction and applies the data set of real estate prices in Boston to test the method. Through the data analysis and test in this paper, it can be summarized that the multiple linear regression model can effectively predict and analyze the housing price to some extent, while the algorithm can still be improved through more advanced machine learning methods.

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Joint estimation of conditional quantiles in multivariate linear regression models with an application to financial distress

Cited by 43 publications

References 50 publications

M-Quantile Regression for Multivariate Longitudinal Data with an Application to the Millennium Cohort Study

M-Quantile Regression for Multivariate Longitudinal Data with an Application to the Millennium Cohort Study

Bayesian joint inference for multivariate quantile regression model with L$$_{1/2}$$ penalty

Housing Price Prediction Based on Multiple Linear Regression

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