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Journal of Computational and Graphical Statistics Volume 2, 1993 - Issue 1
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Article

Smoothing Spline ANOVA with Component-Wise Bayesian “Confidence Intervals”

Chong Gu Department of Statistics, Purdue University, West Lafayette, IN, 47907, USA
&
Grace Wahba Department of Statistics, University of Wisconsin, Madison, WI, 53706, USA
Pages 97-117 | Received 01 Jun 1991, Published online: 21 Feb 2012

References

  • Antoniadis , A. 1984 . “Analysis of Variance on Function Spaces” . Mathematik Operationsforschung und Statistik , 15 : 59 – 71 . Ser. Statistik
  • Aronszajn , N. 1950 . “Theory of Reproducing Kernels” . Transactions of the American Mathematical Society , 68 : 337 – 404 .
  • Breiman , L. 1991 . “The Π-Method for Estimating Multivariate Functions From Noisy Data” . Technometrics , 33 : 125 – 160 .
  • Breiman , L. and Friedman , J. 1985 . “Estimating Optimal Transformations for Multiple Regression and Correlation” . Journal of the American Statistical Association , 80 : 580 – 619 .
  • Breiman , L. , Friedman , J. , Olshen , R. and Stone , C. 1984 . Classification and Regression Trees , Belmont , CA : Wadsworth .
  • Buja , A. , Hastie , T. and Tibshirani , R. 1989 . “Linear Smoothers and Additive Models” . The Annals of Statistics , 17 : 453 – 555 .
  • Chen , Z. , Gu , C. and Wahba , G. 1989 . Discussion of “Linear Smoothers and Additive Models” . The Annals of Statistics , 17 : 515 – 521 . by A. Buja, T. Hastie, and R. Tibshirani
  • Cox , D. D. 1989 . “Coverage Probability of Bayesian Confidence Intervals for Smoothing Splines” , Champaign : University of Illinois . Technical Report 24, Dept. of Statistics
  • 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 : 377 – 403 .
  • deBoor , C. and Lynch , R. E. 1966 . “On Splines and Their Minimum Properties” . Journal of Mathematics and Mechanics , 15 : 953 – 969 .
  • Douglas , A. and Delampady , M. 1990 . “Eastern Lake Survey–Phase i: Documentation for the Data Base and the Derived Data Sets” , University of British Columbia, Dept. of Statistics . SIMS Technical Report 160
  • Friedman , J. 1991 . “Multivariate Adaptive Regression Splines” . The Annals of Statistics , 19 : 1 – 141 .
  • Gu , C. “RKPACK and Its Applications: Fitting Smoothing Spline Models” . Proceedings of the Statistical Computing Section . pp. 42 – 51 . American Statistical Association .
  • Gu , C. 1992 . “Penalized Likelihood Regression: A Bayesian Analysis” . Statistica Sinica , 2 : 255 – 264 .
  • Gu , C. , Bates , D. M. , Chen , Z. and Wahba , G. 1989 . “The Computation of GCV Functions Through Householder Tridiagonalization With Application to the Fitting of Interaction Spline Models” . SIAM Journal of Matrix Analysis Applications , 10 : 457 – 480 .
  • Gu , C. and Wahba , G. 1991a . Discussion of “Multivariate Adaptive Regression Splines” . The Annals of Statistics , 19 : 115 – 123 . by J. Friedman
  • Gu , C. and Wahba , G. 1991b . “Minimizing GCV/GML Scores With Multiple Smoothing Parameters via the Newton Method” . SIAM Journal on Scientific and Statistical Computing , 12 : 383 – 398 .
  • Gu , C. and Wahba , G. 1991c . “Smoothing Spline ANOVA With Component-Wise Bayesian ‘Confidence Intervals’” , Madison : University of Wisconsin . Technical Report 881 (rev.), Dept. of Statistics
  • Gu , C. and Wahba , G. 1993 . “Semiparametric ANOVA With Tensor Product Thin Plate Splines” . Journal of the Royal Statistical Society , : 55 Ser. B
  • Hall , P. and Titterington , D. M. 1987 . “Common Structure of Techniques for Choosing Smoothing Parameters in Regression Problems” . Journal of the Royal Statistical Society , 49 : 184 – 198 . Ser. B
  • Hall , P. and Titterington , D. M. 1988 . “On Confidence Bands in Nonparametric Density Estimation and Regression” . Journal of Multiple Analysis , 27 : 228 – 254 .
  • Hastie , T. and Tibshirani , R. 1990 . Generalized Additive Models , London : Chapman and Hall .
  • Huber , P. 1985 . “Projection Pursuit” . The Annals of Statistics , 13 : 435 – 525 .
  • Kimeldorf , G. and Wahba , G. 1971 . “Some Results on Tchebycheffian Spline Functions” . Journal of Mathematical Analysis and Applications , 33 : 82 – 95 .
  • Li , K.-C. 1989 . “Honest Confidence Intervals for Nonparametric Regression” . The Annals of Statistics , 17 : 1001 – 1008 .
  • Mate , L. 1989 . Hilbert Space Methods in Science and Engineering , New York : Hilger .
  • Moody , J. and Utans , R. 1991 . “Principled Architecture Selection for Neural Networks: Application to Corporate Bond Rating Prediction” . In Advances in Neural Information Processing Systems , Edited by: Moody , J. , Hanson , S. and Lippman , R. Vol. 4 , San Mateo : Kaufmann .
  • Nychka , D. 1988 . “Bayesian Confidence Intervals for Smoothing Splines” . Journal of the American Statistical Association , 83 : 1134 – 1143 .
  • Nychka , D. 1990 . “The Average Posterior Variance of a Smoothing Spline and a Consistent Estimate of the Average Squared Error” . The Annals of Statistics , 18 : 415 – 428 .
  • Speed , T. 1987 . “What is an Analysis of Variance?” . The Annals of Statistics , 15 : 885 – 941 .
  • Stone , C. 1985 . “Additive Regression and Other Nonparametric Models” . The Annals of Statistics , 13 : 689 – 705 .
  • Stone , C. 1991 . “Multivariate Regression Splines” , Berkeley : University of California . Technical Report 317, Dept. of Statistics
  • Wahba , G. 1978 . “Improper Priors, Spline Smoothing and the Problem of Guarding Against Model Errors in Regression” . Journal of the Royal Statistical Society , 40 : 364 – 372 . Ser. B
  • Wahba , G. 1983 . “Bayesian ‘Confidence Intervals’ for the Cross-validated Smoothing Spline” . Journal of the Royal Statistical Society , 45 : 133 – 150 . Ser. B
  • Wahba , G. “Partial and Interaction Splines for the Semiparametric Estimation of Functions of Several Variables” . Computer Science and Statistics: Proceedings of the 18th Symposium . Edited by: Boardman , T. pp. 75 – 80 . Washington , D.C. : American Statistical Association .
  • Wahba , G. Spline Models for Observational Data . CBMS-NSF Regional Conference Series in Applied Mathematics . Vol. 59 , Philadelphia : Society for Industrial and Applied Mathematics .
  • Wahba , G. and Wendelberger , J. 1980 . “Some New Mathematical Methods for Variational Objective Analysis Using Splines and Cross-validation” . Monthly Weather Review , 108 : 1122 – 1145 .
  • Weinert , H. 1982 . Reproducing Kernel Hilbert Spaces: Application in Signal Processing , Stroudsburg , PA : Hutchinson Ross .

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