Nonparametric estimation of a multivariate probability density for mixing sequences by the method of wavelets

Authors

  • Narges Hosseinioun Payame Noor University - Statistics Departement
  • Hassan Doosti Tarbiat Moallem University - Department of Mathematics
  • Hossein Ali Niroumand Ferdowsi University of Mashhad - Department of Statistics

Keywords:

nonparametric estimation of partial derivatives, multivariate density, wavelet, mixing process

Abstract

The mathematical theory of wavelet and their applications in statistics have become a well-known technique for non-parametric curve estimation: see e.g. Meyer (1990), Daubachies (1992), Chui (1992), Donoho and Johnstone (1995) and Vidakovic (1999). We consider the problem of estimation of the partial derivatives of a multivariate probability density f of mixing sequences, using wavelet-based method.  Many stochastic processes and time series are known to be mixing. Under certain weak assumptions autoregressive and more generally bilinear time series models are strongly mixing with exponential mixing coeffcients.  The problem of density estimation from dependent samples is often considered.  For instance quadratic losses were considered by Ango Nze and Doukhan (1993). Bosq (1995) and Doukhan and Loen (1990). We investigate the variance and the rate of the almost convergence of wavelet-based estimators. Rate of convergence of estimators when f belongs to the Besov space is also established.

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Published

2011-07-19

How to Cite

Hosseinioun, N., Doosti, H., & Ali Niroumand, H. (2011). Nonparametric estimation of a multivariate probability density for mixing sequences by the method of wavelets. Italian Journal of Pure and Applied Mathematics, 28, 31–40. Retrieved from https://journals.uniurb.it/index.php/ijpam/article/view/6019

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Section

Articoli - Forum Editrice