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Communications in Statistics - Simulation and Computation Volume 35, 2006 - Issue 1
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Bayesian Inference

Pointwise Bayesian Credible Intervals for Regularized Linear Wavelet Estimators

Daniela De Canditiis Istituto per le Applicazioni del Calcolo “Mauro Picone” – Sezione di Roma, Consiglio Nazionale delle Ricerche, ItalyCorrespondence[email protected]
Pages 61-77 | Received 15 Oct 2003, Accepted 20 Aug 2005, Published online: 15 Feb 2007

References

  • Abramovich , F. , Sapatinas , T. , Silverman , B. W. ( 1998 ). Wavelet thresholding via Bayesian approach . J. Royal Statist. Soc. Series B 60 : 725 – 749 . [CSA]
  • Abramovich , F. , Bailey , T. C. , Sapatinas , T. ( 2000 ). Wavelet analysis and its statistical applications . The Statistician 49 : 1 – 29 . [CSA]
  • Amato , U. , Vuza , D. T. ( 1997 ). Wavelet approximation of a function from samples affected by noise . Rev. Roumaine Math. Pures Appl. 42 : 481 – 493 . [CSA]
  • Amato , U. , Vuza , D. T. ( 1998 ). Smoothing data with correlated noise by wavelet regularization . Rev. Roumaine Math. Pures Appl. 43 : 207 – 222 . [CSA]
  • Amato , U. , De Canditiis , D. ( 2001 ). Convergence in probability of the Mallows and GCV wavelet and Fourier regularization methods . Statist. Probab. Lett. 54 : 325 – 329 . [CSA] [CROSSREF]
  • Angelini , C. , De Canditiis , D. ( 2002 ). Pointwise convergence of the wavelet regularized estimators . Commun. Statist. Theor. Meth. 31 : 1561 – 1578 . [CSA] [CROSSREF]
  • Angelini , C. , De Canditiis , D. , Leblanc , F. ( 2003 ). Wavelet regression estimation in nonparametric mixed effect models . J. Multivariate Anal. (to appear). [CSA]
  • Antoniadis , A. ( 1996 ). Smoothing noisy data with tapered coiflets series . Scand. J. Statist. 23 : 313 – 330 . [CSA]
  • Antoniadis , A. , Grégoire , G. , McKeague , I. W. ( 1994 ). Wavelet methods for curve estimation . J. Amer. Statist. Assoc. 89 : 1340 – 1353 . [CSA]
  • Barber , S. ( 2001 ). Simulating from the posterior density of Bayesian wavelet regression estimates . Technical Report , 01:29, Department of Mathematics , UK : University of Bristol .
  • Barber , S. , Nason , G. P. , Silverman , B. W. ( 2002 ). Posterior probability intervals for wavelet thresholding . J. R. Statist. Soc. Series B 64 : 189 – 206 . [CSA] [CROSSREF]
  • Chipman , H. A. , Kolaczyk , E. D. , McCulloch , R. E. ( 1997 ). Adaptive Bayesian wavelet shrinkage . J. Amer. Statist. Assoc. 92 : 1413 – 1421 . [CSA]
  • Daubechies , I. ( 1992 ). Ten Lectures on Wavelets . Philadelphia : SIAM .
  • De Hoog , F. R. , Hutchinson , M. F. ( 1987 ). An efficient method for calculating smoothing splines using orthogonal transformations . Numer. Math. 50 : 311 – 319 . [CSA] [CROSSREF]
  • Green , P. J. ( 2000 ). Comment on “Bayesian backfitting” by T. Hastie & R. Tibshirani . Statistical Sci. 15 : 218 – 221 . [CSA]
  • Green , P. J. , Silverman , B. W. ( 1994 ). Nonparametric Regression and Generalized Linear Models: A Roughness Penalty Approach . London : Chapman & Hall .
  • Hall , P. ( 1992 ). On bootstrap confidence intervals in nonparametric regression . Ann. Statist. 20 : 695 – 711 . [CSA]
  • Härdle , W. , Marron , J. S. ( 1991 ). Bootstrap simultaneous error bars for nonparametric regression . Ann. Statist. 19 : 778 – 796 . [CSA]
  • Huang , S. Y. , Lu , H. H.-S . ( 2000 ). Bayesian wavelet shrinkage for nonparametric mixed-effects models . Statist. Sinica 10 : 1021 – 1040 . [CSA]
  • Hutchinson , M. F. , De Hoog , F. R. ( 1985 ). Smoothing noisy data with spline functions . Numer. Math. 47 : 99 – 106 . [CSA] [CROSSREF]
  • Johnson , N. L. (1949). Systems of frequency curves generated by methods of translation. Biometrika 36:149–176. [CSA]
  • Mallat , S. G. ( 1989 ). A theory for multiresolution signal decomposition: the wavelet representation . IEEE Trans. Pat. Anal. Mach. Intel. 11 : 674 – 693 . [CSA] [CROSSREF]
  • O'Hagan , A. ( 1994 ). Bayesian Inference . Kendall's Advanced Theory of Statistics , Vol. 2b , London : Arnold .
  • Picard , D. , Tribouley , K. ( 2000 ). Adaptive confidence interval for pointwise curve estimation . Ann. Statist. 28 : 298 – 335 . [CSA] [CROSSREF]
  • Reinsch , C. H. ( 1967 ). Smoothing by spline functions . Numer. Math. 10 : 177 – 183 . [CSA] [CROSSREF]
  • Reinsch , C. H. ( 1971 ). Smoothing by spline functions II . Numer. Math. 16 : 451 – 454 . [CSA] [CROSSREF]
  • Wahba , G. ( 1975 ). Smoothing noisy data with spline functions . Numer. Math. 24 : 383 – 393 . [CSA] [CROSSREF]
  • Wahba , G. ( 1978 ). Improper priors, splines smoothing and the problem of guarding against model errors in regression . J. R. Statist. Soc. Series B 40 : 364 – 372 . [CSA]
  • Wahba , G. ( 1983 ). “Confidence intervals” for the cross-validated smoothing spline . J. R. Statist. Soc. Series B 45 : 133 – 150 . [CSA]
  • Wahba , G. ( 1990 ). Spline Models for Observational Data . Philadelphia : SIAM .

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