The inner product matrix of discrete autocorrelation wavelets: efficient computation and application.
Idris A. Eckley & Guy P. Nason
Discrete autocorrelation (a.c.) wavelets have recently been applied
in the statistical analysis of locally stationary time series for
local spectral modelling and estimation.
This article proposes a fast recursive construction of the inner product
matrix of discrete a.c. wavelets which is required by the statistical
analysis. The recursion connects neighbouring elements on diagonals of
the inner product matrix using a two-scale property of the a.c. wavelets.
The recursive method
is an O(log(N)^3) operation which
compares favourably with the O(N \log N) operations
required by the brute force approach.
We conclude by describing an efficient construction of the inner product matrix
in the (separable) two-dimensional case.
Some keywords: LOCALLY STATIONARY TIME SERIES, EVOLUTIONARY WAVELET SPECTRUM, DISCRETE AUTOCORRELATION WAVELETS, INNER PRODUCT MATRIX, INTERPOLATION SCHEMES.
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