Robust local quantile regression for reference curves

Barra lateral de artigos

PDF (English)
Publicado: Mar 24, 2023
DOI: https://doi.org/10.28951/bjb.v41i1.599

Conteúdo do artigo principal

Gianni M.S.Santos
Universidade Federal de São Paulo
Carmen D. S de André
Universidade de São Paulo
Julio M. Singer
Universidade de São Paulo

Resumo

We propose two non-parametric methods to construct locally fitted quantile reference curves that are robust with respect to outliers in the predictor variable. The first includes a weighting procedure and the second, the detection and subsequent elimination of outlying predictor variable values before the local fitting process. The reference curves fitted by the proposed methods generate quantile limits that are less affected in regions with a low frequency of the predictor variable values. The proposed procedures are used to fit reference curves to data extracted from a study conducted at the Heart Institute of the University of São Paulo Medical School.

Detalhes do artigo

Como Citar
M.S.Santos, G. ., D. S de André, C., & M. Singer, J. (2023). Robust local quantile regression for reference curves. REVISTA BRASILEIRA DE BIOMETRIA, 41(1), 58–69. https://doi.org/10.28951/bjb.v41i1.599
Edição
v. 41 n. 1 (2023)
Seção
Articles
Creative Commons License
Este trabalho está licenciado sob uma licença Creative Commons Attribution 4.0 International License.

Authors who publish with this journal agree to the following terms:

    1. Authors retain copyright and grant the journal right of first publication with the work simultaneously licensed under a Creative Commons Attribution License that allows others to share the work with an acknowledgement of the work's authorship and initial publication in this journal.
    2. Authors are able to enter into separate, additional contractual arrangements for the non-exclusive distribution of the journal's published version of the work (e.g., post it to an institutional repository or publish it in a book), with an acknowledgement of its initial publication in this journal.
    3. Authors are permitted and encouraged to post their work online (e.g., in institutional repositories or on their website) prior to and during the submission process, as it can lead to productive exchanges, as well as earlier and greater citation of published work (See The Effect of Open Access).

Referências

ANAS KNEFATI, M., CHAUVET, P. E., NGUYEN, S.; BASSAM, D. Reference curves estimation using conditional quantile and radial basis function network with mass constraint. Neural Process Letters, 43, 17-30 (2016).

BUCHANSKY, M. Recent advances in quantile regression models: A pratical guide for empirical research, Journal of Human Resources, 33, 88-126 (1998).

CADE, B. S.; TERREL, J.W.; SCHROEDER, R.L. Estimating effects of limiting factors with regression quantiles, Ecology), 80, 311-323 (1999).

de PAULA, R.S.; ANTELMI, I.; VINCENZI, M.A.; ANDRÉ, C.D.S.; ARTES, R.; GRUPI, C.G.; MANSUR, A.J. Influence of age, gender and serum triglycerides on heart rate in a cohort of asymptomatic individuals without heart disease. International Journal of Cardiology, 105, 152 - 158 (2005).

EINBECK, J.; ANDRÉ, C.D.S.; SINGER, J.M. Local smoothing with robustness against outlying predictors. Environmetrics, 15, 541-554 (2004).

FAN, J.; GIJBELS, I. Local Polynomial Modelling and Its Applications, Mono graphs on Statistics and Applied Probability, London: Chapman & Hall, (1996).

FITZENBERG B.; KOENKER, R.; MACHAD, J.A.F. Economic Applications of Quantile Regression, Berlin: Springer, (2002).

FREEMAN, J.V.; COLE, T.J.; CHINN, S.; JONES, P.R.M.; White, E.M.; PREECE, M.A.

Cross sectional stature and weight reference curves for the UK, 1990. Archives of Disease in Childhood, 73, 17-24 (1995).

HARRIS, E.K.; BOYD, J.C. Statistical Bases of Reference Values in Laboratory Medicine,New York: Marcel Dekker, 1995.

HEALY, M.J.R.; RASBACH, J.; YANG, M. Distribution-free estimation of age-related centiles. Annals of Human Biology, 15, 17-22 (1988).

HUANG, M.L.; NGUYEN, C. A nonparametric approach for quantile regression, Journal of Statistical Distributions and Applications, 5,(1), 1-3 (2018).

KOENKER, R.; BASSETT, G. Regression quantiles. Econometrica, 46, 33-50 (1978).

KOENKER, R.; HALLOCK, K.F. Quantile regression: An introduction. Journal of Economic Perspectives, 15, 143-156 (2001).

LIU, X.; YU, K.; XU, Q.; TANG, X. Improved local quantile regression. Statistical Modelling, 19, 501-523 (2019).

MARTINS, P.S.; PEREIRA, P.T. Does education reduce wage inequality? Quantile regresion evidence from 16 countries. Labour Economics, 11, 355-371 (2004).

MUGGEO, V.M.R.; TORRETTA, F.; EILERS, P.H.C.; SCIANDRA, M.; ATTANASIO, M. Multiple smoothing parameters selection in additive regression quantiles, Statistical Modelling, 21, 428-448 (2021).

ROYSTON, P. Constructing time-specific reference ranges. Statistics in Medicine, 10, 675-690, (1995).

RUPPERT, D.; SHEATHER, S.J.;WAND, M.P. An effective bandwidth selector for local least squares regression. Journal of the American Staiatical Association, 90, 1257-1270 (1995).

SCHARF, F.S.; JUANES, F.; SUTHERLAND, M. Inferring ecological relationships from the edges of scatter diagrams: comparison of regression techniques. Ecology, 79, 448-460, (1998).

SILVERMAN, B.W. Density Estimation for statistics and Data Analysis, London: Chapman & Hall, (1986).

WALDMANN, E. Quantile regression: a short story on how and why. Statistical Modelling, 18, 203-218 (2018).

YU, K,; JONES, M.C. Local linear quantile regression. Journal of the American Statistical Association, 93, 228-237 (1998).