Nonparametric Regression with Singular Design

Theories of nonparametric regression are usually based on the assumption that the design density exists. However, in some applications such as those involving high-dimensional or chaotic time series data, the design measure may be singular and may be likely to have a fractal (nonintegral) dimension. In this paper, the popular Nadaraya?Watson estimator is studied under the general setup that the continuity of the design measure is governed by the local or pointwise dimension. It will be shown in the iid setup that the nonparametric regression estimator achieves a convergence rate which is dependent only on the pointwise dimension. The case of time series data is also studied. For the latter case, a new mixing condition is introduced, and an assumption of marginal or joint density is completely avoided. Three examples, a fractal regression and two applications for predicting chaotic time series, are used to illustrate the implications of the obtained results.

[1]  E. Nadaraya On Estimating Regression , 1964 .

[2]  G. S. Watson,et al.  Smooth regression analysis , 1964 .

[3]  Benoit B. Mandelbrot,et al.  Fractal Geometry of Nature , 1984 .

[4]  Ing Rj Ser Approximation Theorems of Mathematical Statistics , 1980 .

[5]  C. J. Stone,et al.  Optimal Rates of Convergence for Nonparametric Estimators , 1980 .

[6]  J. Friedman,et al.  Projection Pursuit Regression , 1981 .

[7]  R. C. Bradley Basic Properties of Strong Mixing Conditions , 1985 .

[8]  J. Doyne Farmer,et al.  Exploiting Chaos to Predict the Future and Reduce Noise , 1989 .

[9]  Chaos In Systems With Noise: (2nd Edition) , 1990 .

[10]  Kenneth Falconer,et al.  Fractal Geometry: Mathematical Foundations and Applications , 1990 .

[11]  H. Herzel Chaotic Evolution and Strange Attractors , 1991 .

[12]  P. Read,et al.  Quasi-periodic and chaotic flow regimes in a thermally driven, rotating fluid annulus , 1992, Journal of Fluid Mechanics.

[13]  Royal-statistical-society meeting on chaos , 1992 .

[14]  R. Smith,et al.  Estimating Dimension in Noisy Chaotic Time Series , 1992 .

[15]  C. D. Cutler,et al.  A REVIEW OF THE THEORY AND ESTIMATION OF FRACTAL DIMENSION , 1993 .

[16]  Kung-Sik Chan,et al.  A Note on Noisy Chaos , 1994 .

[17]  Jianqing Fan,et al.  Local polynomial modelling and its applications , 1994 .

[18]  R. Bhattacharya,et al.  On geometric ergodicity of nonlinear autoregressive models , 1995 .

[19]  D. Guégan,et al.  Nonparametric estimation of the chaotic function and the invariant measure of a dynamical system , 1995 .

[20]  Ker-Chau Li,et al.  Nonlinear confounding in high-dimensional regression , 1997 .

[21]  Jianqing Fan,et al.  Efficient Estimation of Conditional Variance Functions in Stochastic Regression , 1998 .