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Research Report SRR95-042
Interpolation methods for nonlinear wavelet regression with irregularly spaced design
Peter Hall and Berwin A. Turlach
Abstract:
We suggest and discuss interpolation methods
that enable nonlinear wavelet estimators to be employed with
stochastic design, or non-dyadic regular design, in problems of
nonparametric regression. This approach allows relatively rapid
computation, involving dyadic approximations to
wavelet-after-interpolation techniques. New types of interpolation
are described, enabling first-order variance reduction at the expense
of second-order increases in bias. The effect of interpolation on
threshold choice is addressed, and appropriate thresholds are
suggested for error distributions with as few as four finite moments.
A concise account of mean squared error properties is given for
interpolation-based wavelet estimators applied to piecewise-smooth
functions.
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