Advanced search
Publication Cover
Journal of Computational and Graphical Statistics Volume 26, 2017 - Issue 3
Submit an article Journal homepage
754
Views
0
CrossRef citations to date
0
Altmetric
Data Mining

Penalized Nonparametric Scalar-on-Function Regression via Principal Coordinates

Philip T. ReissDepartment of Child and Adolescent Psychiatry and Department of Population Health, New York University, New York, NY, and Department of Statistics, University of Haifa, Haifa, IsraelCorrespondence[email protected]
,
David L. MillerIntegrated Statistics, Woods Hole, MA, and Centre for Research into Ecological and Environmental Modelling and School of Mathematics and Statistics, University of St Andrews, St Andrews, United Kingdom
,
Pei-Shien WuDepartment of Child and Adolescent Psychiatry, New York University, New York, NY
&
Wen-Yu HuaDepartment of Child and Adolescent Psychiatry, New York University, New York, NY
Pages 569-578 | Received 01 Nov 2015, Published online: 11 Apr 2017

References

  • Akaike, H. (1973), “Information Theory and an Extension of the Maximum Likelihood Principle,” in Second International Symposium on Information Theory, Akademiai Kiadopp, pp. 267–281.
  • Baíllo, A., and Grané, A. (2009), “Local Linear Regression for Functional Predictor and Scalar Response,” Journal of Multivariate Analysis, 100, 102–111.
  • Boj, E., Caballé, A., Delicado, P., Esteve, A., and Fortiana, J. (2016), “Global and Local Distance-Based Generalized Linear Models,” TEST, 25, 170–196.
  • Cailliez, F. (1983), “The Analytical Solution of the Additive Constant Problem,” Psychometrika, 48, 305–308.
  • Cardot, H., Ferraty, F., and Sarda, P. (1999), “Functional Linear Model,” Statistics and Probability Letters, 45, 11–22.
  • Chen, D., and Müller, H.-G. (2012), “Nonlinear Manifold Representations for Functional Data,” Annals of Statistics, 40, 1–29.
  • Chen, H., Reiss, P. T., and Tarpey, T. (2014), “Optimally Weighted L2 Distance for Functional Data,” Biometrics, 70, 516–525.
  • Corrada Bravo, H., Lee, K. E., Klein, B. E., Klein, R., Iyengar, S. K., and Wahba, G. (2009), “Examining the Relative Influence of Familial, Genetic, and Environmental Covariate Information in Flexible Risk Models,” Proceedings of the National Academy of Sciences, 106, 8128–8133.
  • Craven, P., and Wahba, G. (1979), “Smoothing Noisy Data With Spline Functions: Estimating the Correct Degree of Smoothing by the Method of Generalized Cross-Validation,” Numerische Mathematik, 31, 317–403.
  • Cuadras, C., and Arenas, C. (1990), “A Distance Based Regression Model for Prediction With Mixed Data,” Communications in Statistics—Theory and Methods, 19, 2261–2279.
  • Cuadras, C. M., Arenas, C., and Fortiana, J. (1996), “Some Computational Aspects of a Distance-Based Model for Prediction,” Communications in Statistics—Simulation and Computation, 25, 593–609.
  • Eckart, C., and Young, G. (1936), “The Approximation of One Matrix by Another of Lower Rank,” Psychometrika, 1, 211–218.
  • Eilers, P. H. C., and Marx, B. D. (1996), “Flexible Smoothing With B-Splines and Penalties” (with discussion), Statistical Science, 11, 89–121.
  • Fan, J., and Gijbels, I. (1996), Local Polynomial Modelling and Its Applications, London: Chapman & Hall.
  • Faraway, J. J. (2012), “Backscoring in Principal Coordinates Analysis,” Journal of Computational and Graphical Statistics, 21, 394–412.
  • Ferraty, F., and Vieu, P. (2006), Nonparametric Functional Data Analysis: Theory and Practice, New York: Springer.
  • Galeano, P., Joseph, E., and Lillo, R. E. (2015), “The Mahalanobis Distance for Functional Data With Applications to Classification,” Technometrics, 57, 281–291.
  • Geenens, G. (2011), “Curse of Dimensionality and Related Issues in Nonparametric Functional Regression,” Statistics Surveys, 5, 30–43.
  • Giorgino, T. (2009), “Computing and Visualizing Dynamic Time Warping Alignments in R: The DTW Package,” Journal of Statistical Software, 31, 1–24.
  • Gönen, M., and Alpaydın, E. (2011), “Multiple Kernel Learning Algorithms,” Journal of Machine Learning Research, 12, 2211–2268.
  • Goldsmith, J., Scheipl, F., Huang, L., Wrobel, J., Gellar, J., Harezlak, J., McLean, M. W., Swihart, B., Xiao, L., Crainiceanu, C., and Reiss, P. T. (2016), refund: Regression with Functional Data. R package version 0.1-16.
  • Gower, J. C. (1966), “Some Distance Properties of Latent Root and Vector Methods Used in Multivariate Analysis,” Biometrika, 53, 325–338.
  • ——— (1968), “Adding a Point to Vector Diagrams in Multivariate Analysis,” Biometrika, 55, 582–585.
  • Green, P. J., and Silverman, B. W. (1994), Nonparametric Regression and Generalized Linear Models: A Roughness Penalty Approach, Boca Raton, FL: Chapman & Hall.
  • Horváth, L., and Kokoszka, P. (2012), Inference for Functional Data with Applications, New York: Springer Science & Business Media.
  • Houmani, N., Mayoue, A., Garcia-Salicetti, S., Dorizzi, B., Khalil, M. I., Moustafa, M. N., Abbas, H., Muramatsu, D., Yanikoglu, B., Kholmatov, A., Martinez-Diaz, M., Fierrez, J., Ortega-Garcia, J., Alcobé, R., Fabregas, J., Faundez-Zanuy, M., Pascual-Gaspar, J. M., Carde noso Payo, V., and Vivaracho-Pascual, C. (2012), “BioSecure Signature Evaluation Campaign (BSEC’2009): Evaluating Online Signature Algorithms Depending on the Quality of Signatures,” Pattern Recognition, 45, 993–1003.
  • Hyndman, R. J., and Shang, H. L. (2010), “Rainbow Plots, Bagplots, and Boxplots for Functional Data,” Journal of Computational and Graphical Statistics, 19, 29–45.
  • Kholmatov, A., and Yanikoglu, B. (2005), “Identity Authentication Using Improved Online Signature Verification Method,” Pattern Recognition Letters, 26, 2400–2408.
  • LeDell, E., Petersen, M., and van der Laan, M. (2014), cvAUC: Cross-Validated Area Under the ROC Curve Confidence Intervals. R Package Version 1.1.0.
  • ——— (2015), “Computationally Efficient Confidence Intervals for Cross-Validated Area Under the ROC Curve Estimates,” Electronic Journal of Statistics, 9, 1583–1607.
  • Lu, F., Keleş, S., Wright, S. J., and Wahba, G. (2005), “Framework for Kernel Regularization With Application to Protein Clustering,” Proceedings of the National Academy of Sciences of the United States of America, 102, 12332–12337.
  • Marx, B. D., and Eilers, P. H. C. (1999), “Generalized Linear Regression on Sampled Signals and Curves: A P-Spline Approach,” Technometrics, 41, 1–13.
  • Miller, D. L., and Wood, S. N. (2014), “Finite Area Smoothing With Generalized Distance Splines,” Environmental and Ecological Statistics, 21, 715–731.
  • Müller, H.-G., and Stadtmüller, U. (2005), “Generalized Functional Linear Models,” Annals of Statistics, 33, 774–805.
  • Müller, H.-G., and Yao, F. (2008), “Functional Additive Models,” Journal of the American Statistical Association, 103, 1534–1544.
  • Nadaraya, E. A. (1964), “On Estimating Regression,” Theory of Probability & Its Applications, 9, 141–142.
  • Preda, C. (2007), “Regression Models for Functional Data by Reproducing Kernel Hilbert Spaces Methods,” Journal of Statistical Planning and Inference, 137, 829–840.
  • Ramsay, J. O., and Silverman, B. W. (2005), Functional Data Analysis ( 2nd ed.), New York: Springer.
  • Ramsay, J. O., Wickham, H., Graves, S., and Hooker, G. (2014), fda: Functional Data Analysis, R Package Version 2.4.4.
  • Randolph, T. W., Harezlak, J., and Feng, Z. (2012), “Structured Penalties for Functional Linear Models—Partially Empirical Eigenvectors for Regression,” Electronic Journal of Statistics, 6, 323–353.
  • R Core Team (2016), R: A Language and Environment for Statistical Computing, Vienna, Austria: R Foundation for Statistical Computing.
  • Reiss, P. T., Goldsmith, J., Shang, H. L., and Ogden, R. T. ( in press), “Methods for Scalar-on-Function Regression,” International Statistical Review.
  • Reiss, P. T., Huang, L., and Mennes, M. (2010), “Fast Function-on-Scalar Regression With Penalized Basis Expansions,” International Journal of Biostatistics, 6, article 28.
  • Reiss, P. T., and Ogden, R. T. (2007), “Functional Principal Component Regression and Functional Partial Least Squares,” Journal of the American Statistical Association, 102, 984–996.
  • ——— (2009), “Smoothing Parameter Selection for a Class of Semiparametric Linear Models,” Journal of the Royal Statistical Society, Series B, 71, 505–523.
  • ——— (2010), “Functional Generalized Linear Models With Images as Predictors,” Biometrics, 66, 61–69.
  • Ruppert, D. (2002), “Selecting the Number of Knots for Penalized Splines,” Journal of Computational and Graphical Statistics, 11, 735–757.
  • Ruppert, D., Wand, M. P., and Carroll, R. J. (2003), Semiparametric Regression, Cambridge: Cambridge University Press.
  • Sakoe, H., and Chiba, S. (1978), “Dynamic Programming Algorithm Optimization for Spoken Word Recognition,” IEEE Transactions on Acoustics, Speech and Signal Processing, 26, 43–49.
  • Schölkopf, B., Herbrich, R., and Smola, A. J. (2001), “A Generalized Representer Theorem, in Computational Learning Theory: 14th Annual Conference on Computational Learning Theory, COLT 2001 and 5th European Conference on Computational Learning Theory, EuroCOLT 2001, eds. D. Helmbold, and B. Williamson, Berlin and Heidelberg: Springer, pp. 416–426.
  • Shawe-Taylor, J., and Cristianini, N. (2004), Kernel Methods for Pattern Analysis, New York: Cambridge University Press.
  • Steinwart, I., and Christmann, A. (2008), Support Vector Machines, New York: Springer.
  • Torgerson, W. S. (1952), “Multidimensional Scaling: I. Theory and Method,” Psychometrika, 17, 401–419.
  • Wahba, G. (1990), Spline Models for Observational Data, Philadelphia, PA: Society for Industrial Mathematics.
  • Wasserman, L. (2006), All of Nonparametric Statistics, New York: Springer.
  • Watson, G. S. (1964), “Smooth Regression Analysis,” Sankhya A, 26, 359–372.
  • Wood, S. N. (2003), “Thin Plate Regression Splines,” Journal of the Royal Statistical Society, Series B, 65, 95–114.
  • ——— (2006), Generalized Additive Models: An Introduction With R, Boca Raton, FL: Chapman & Hall.
  • ——— (2011), “Fast Stable Restricted Maximum Likelihood and Marginal Likelihood Estimation of Semiparametric Generalized Linear Models,” Journal of the Royal Statistical Society, Series B, 73, 3–36.
  • Wood, S. N., Pya, N., and Säfken, B. ( 2016), “Smoothing Parameter and Model Selection for General Smooth Models,” Journal of the American Statistical Association, 78, 849–867.
  • Zhang, L., Wahba, G., and Yuan, M. ( in press), “Distance Shrinkage and Euclidean Embedding via Regularized Kernel Estimation,” Journal of the Royal Statistical Society, Series B.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.