Model selection for (auto-)regression with dependent data

Free access article

Issue		ESAIM: PS Volume 5, 2001


Page(s)		33 - 49
DOI		10.1051/ps:2001101

References

1: H. Akaike, Information theory and an extension of the maximum likelihood principle, in Proc. 2nd International Symposium on Information Theory, edited by P.N. Petrov and F. Csaki. Akademia Kiado, Budapest (1973) 267-281.
2: H. Akaike, A new look at the statistical model identification. IEEE Trans. Automat. Control 19 (1984) 716-723.
3: P. Ango Nze, Geometric and subgeometric rates for markovian processes in the neighbourhood of linearity. C. R. Acad. Sci. Paris 326 (1998) 371-376.
4: Y. Baraud, Model selection for regression on a fixed design. Probab. Theory Related Fields 117 (2000) 467-493.
5: Y. Baraud, Model selection for regression on a random design, Preprint 01-10. DMA, École Normale Supérieure (2001).
6: Y. Baraud, F. Comte and G. Viennet, Adaptive estimation in autoregression or $\beta$ -mixing regression via model selection. Ann. Statist. (to appear).
7: A. Barron, L. Birgé and P. Massart, Risks bounds for model selection via penalization. Probab. Theory Related Fields 113 (1999) 301-413.
8: L. Birgé and P. Massart, An adaptive compression algorithm in Besov spaces. Constr. Approx. 16 (2000) 1-36.
9: L. Birgé and Y. Rozenholc, How many bins must be put in a regular histogram. Working paper (2001).
10: A. Cohen, I. Daubechies and P. Vial, Wavelet and fast wavelet transform on an interval. Appl. Comput. Harmon. Anal. 1 (1993) 54-81.
11: I. Daubechies, Ten lectures on wavelets. SIAM: Philadelphia (1992).
12: R.A. Devore and C.G. Lorentz, Constructive Approximation. Springer-Verlag (1993).
13: D.L. Donoho and I.M. Johnstone, Minimax estimation via wavelet shrinkage. Ann. Statist. 26 (1998) 879-921.
14: P. Doukhan, Mixing properties and examples. Springer-Verlag (1994).
15: M. Duflo, Random Iterative Models. Springer, Berlin, New-York (1997).
16: M. Hoffmann, On nonparametric estimation in nonlinear AR(1)-models. Statist. Probab. Lett. 44 (1999) 29-45.
17: I.A. Ibragimov, On the spectrum of stationary Gaussian sequences satisfying the strong mixing condition I: Necessary conditions. Theory Probab. Appl. 10 (1965) 85-106.
18: M. Kohler, On optimal rates of convergence for nonparametric regression with random design, Working Paper. Stuttgart University (1997).
19: A.R. Kolmogorov and Y.A. Rozanov, On the strong mixing conditions for stationary Gaussian sequences. Theory Probab. Appl. 5 (1960) 204-207.
20: K.C. Li, Asymptotic optimality for C_p, C_l cross-validation and generalized cross-validation: Discrete index set. Ann. Statist. 15 (1987) 958-975.
21: G.G. Lorentz, M. von Golitschek and Y. Makokov, Constructive Approximation, Advanced Problems. Springer, Berlin (1996).
22: C.L. Mallows, Some comments on C_p. Technometrics 15 (1973) 661-675.
23: A. Meyer, Quelques inégalités sur les martingales d'après Dubins et Freedman, Séminaire de Probabilités de l'Université de Strasbourg. Vols. 68/69 (1969) 162-169.
24: D.S. Modha and E. Masry, Minimum complexity regression estimation with weakly dependent observations. IEEE Trans. Inform. Theory 42 (1996) 2133-2145.
25: D.S. Modha and E. Masry, Memory-universal prediction of stationary random processes. IEEE Trans. Inform. Theory 44 (1998) 117-133.
26: M. Neumann and J.-P. Kreiss, Regression-type inference in nonparametric autoregression. Ann. Statist. 26 (1998) 1570-1613.
27: B.T. Polyak and A. Tsybakov, A family of asymptotically optimal methods for choosing the order of a projective regression estimate. Theory Probab. Appl. 37 (1992) 471-481.
28: R. Shibata, Selection of the order of an autoregressive model by Akaike's information criterion. Biometrika 63 (1976) 117-126.
29: R. Shibata, An optimal selection of regression variables. Biometrika 68 (1981) 45-54.
30: S. Van de Geer, Exponential inequalities for martingales, with application to maximum likelihood estimation for counting processes. Ann. Statist. 23 (1995) 1779-1801.
31: V.A. Volonskii and Y.A. Rozanov, Some limit theorems for random functions. I. Theory Probab. Appl. 4 (1959) 179-197.

Abstract

What is OpenURL?

The OpenURL standard is a protocol for transmission of metadata describing the resource that you wish to access. An OpenURL link contains article metadata and directs it to the OpenURL server of your choice. The OpenURL server can provide access to the resource and also offer complementary services (specific search engine, export of references...). The OpenURL link can be generated by different means.

If your librarian has set up your subscription with an OpenURL resolver, OpenURL links appear automatically on the abstract pages.
You can define your own OpenURL resolver with your EDPS Account. In this case your choice will be given priority over that of your library.
You can use an add-on for your browser (Firefox or I.E.) to display OpenURL links on a page (see http://www.openly.com/openurlref/). You should disable this module if you wish to use the OpenURL server that you or your library have defined.