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Research Article

A new wavelet-based estimation of conditional density via block threshold method

Esmaeil Shirazia Faculty of Science, Gonbad Kavous university, Gonbad Kavous, IranCorrespondence[email protected]
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Olivier P. Faugerasb Toulouse School of Economics, University Toulouse 1 Capitole, 1, Esplanade de l’Universite, Office T106, 31080Toulouse Cedex 06, FranceView further author information
Received 08 Feb 2023, Accepted 01 Nov 2023, Published online: 19 Nov 2023

References

  • Ait Sahalia, Y. 1999. Transition densities for interest rate and other nonlinear diffusions. The Journal of Finance 54 (4):1361–95.
  • Akakpo, N., and C. Lacour. 2011. Inhomogeneous and anisotropic conditional density estimation from dependent data. Electronic Journal of Statistics 5:1618–53.
  • Bertin, K., C. Lacour, and V. Rivoirard. 2016. Adaptive pointwise estimation of conditional density function. Annales de l’Institut Henri Poincaré 52 (2):939–80. https://hal.science/hal-00922555.
  • Bouzebda, S., and C. Chesneau. 2020. A note on the nonparametric estimation of the conditional mode by wavelet methods. Stats 3 (4):475–83. doi:10.3390/stats3040030.
  • Chesneau, C., and H. Doosti. 2016. A note on the adaptive estimation of a conditional continuous-discrete multivariate density by wavelet methods. Chinese Journal of Mathematics 2016:1–8. doi:10.1155/2016/6204874.
  • Cirel’Son, B. S., I. A. Ibragimov, and V. N. Sudakov. 1976. Norms of Gaussian sample functions. Proceedings of the Third Japan–USSR Symposium on Probability Theory, ed. by G. Maruyama and J. V. Prokhorov, Vol. 550. Berlin, Heidelberg: Springer. doi:10.1007/BFb0077482
  • Cohen, A., I. Daubechies, and P. Vial. 1993. Wavelets on the interval and fast wavelet transforms. Applied and Computational Harmonic Analysis 1 (1):54–81. doi:10.1006/acha.1993.1005.
  • Daubechies, I. 1992. Ten lectures on wavelets. In CBMS-NSF Regional Conferences Series in Applied Mathematics, SIAM, Philadelphia,
  • Dong, J., and R. Jiang. 2009. Multinomial probability estimation by wavelet thresholding. Communications in Statistics - Theory and Methods 38 (9):1486–507. doi:10.1080/03610920802455043.
  • Donoho, D. L., I. M. Johnstone, G. Kerkyacharian, and D. Picard. 1996. Density estimation by wavelet thresholding. The Annals of Statistics 24 (2):508–39. 10.1214/aos/1032894451.
  • Fan, J., and Q. Yao. 2005. Nonlinear time series, 2nd ed. New York: Springer.
  • Faugeras, O. P. 2009. A quantile-copula approach to conditional density estimation. Journal of Multivariate Analysis 100 (9):2083–99. doi:10.1016/j.jmva.2009.03.006.
  • Ghanbari, B., M. Yarmohammadi, N. Hosseinioun, and E. Shirazi. 2019. Wavelet estimation of copula function based on censored data. Journal of Inequalities and Applications 188. doi:10.1186/s13660-019-2140-5.
  • Hardle, W., G. Kerkyacharian, D. Picard, and A. Tsybakov, 1998. Wavelet, approximation and statistical applications. New York: Springer Verlag.
  • Hyndman, R. J., D. M. Bashtannyk, and G. K. Grunwald. 1996. Estimating and visualizing conditional densities. Journal of Computational and Graphical Statistics 5 (4):315–36. doi:10.1080/10618600.1996.10474715.
  • Li, Q., and J. S. Racine, 2007. Nonparametric econometrics: Theory and practice. Princeton, NJ: Princeton University Press.
  • Liang, H.-Y., and J. De Un̋a-Álvarez. 2011. Wavelet estimation of conditional density with truncated, censored and dependent data. Journal of Multivariate Analysis 102 (3):448–67. doi:10.1016/j.jmva.2010.10.004.
  • Mallat, S. 2009. A wavelet tour of signal processing. The sparse way. With contributions from Gabriel Peyre. Amsterdam: Elsevier/ Academic Press.
  • Meyer, Y. 1992. Wavelets and operators. Cambridge: Cambridge University Press.
  • Picard, D., and K. Tribouley. 2000. Adaptive confidence interval for pointwise curve estimation. Annals of Statistics 28:298–335.
  • Rosenblatt, M. 1996. Conditional probability density and regression estimators. In Multivariate Analysis, II (Proc. Second Internat. Sympos), 25–31. Dayton, Ohio; New York: Academic Press.
  • Rosenthal, H. P. 1970. On the subspaces ofL p (p¿2) spanned by sequences of independent random variables. Israel Journal of Mathematics 8 (3):273–303. doi:10.1007/BF02771562.
  • Shirazi, E., and Y. P. Chaubey. 2019. Non-negative density estimation via wavelet block thresholding for biased data. Journal of Statistical Theory and Practice 13. doi:10.1007/s42519-018-0019-2.
  • Shirazi, E., and H. Doosti. 2008. Estimation of the survival function for m-dependent random variable. Far East Journal of Theoretical Statistics 25 (1):135–44.
  • Shirazi, E., and H. Doosti. 2022. Nonparametric estimation of a quantile density function under L p risk via block thresholding method. Communications in Statistics - Simulation and Computation 51 (2):539–53. doi:10.1080/03610918.2019.1656250.
  • Vidakovic, B. 1999. Statistical modeling by wavelets, Vol. 384. New York: John Wiley and Sons, Inc.

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