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APPENDIX:
MULTIPLE-WINDOW HARMONIC ANALYSIS
We shortly summarise the basic assumptions and formulas of
this multiple-window harmonic analysis technique which was
introduced by Thomson (1982) and extended by Park et al.
(1987), Lindberg and Park (1987).
The purpose of an harmonic analysis is the detection of
spectral harmonic line components and the measurement of
their frequencies and amplitudes. It is assumed that the
spectrum of a time-series x(t) consist of harmonic line
components and a continuous background spectrum. In the
frequency interval (f+W.f-W) with sufficiently small values of
W the record x(t) can be written
i2nft
x(t) =e + e(t) (1)
where |t is a complex amplitude and e(t) is an error term. The
error term e(t) consist of other sinusoids and noise. In practice
we have N measurements of x(t). The time between successive
samples is assumed to be 1 so that the frequency f is defined
on its principal domain (-1/2,1/2].
K different complex eigenspectra yx(f) are produced in the
frequency domain by the discrete Fourier transformations
N-1 :
yp(f)= X ef yy, (p
tz
k=0,1,..,K-1 (2)
where the vi(t) are the discrete prolate spheroidal sequences.
The discrete prolate spheroidal sequences v(t) can be
calculated by taking a singular value decomposition of a sinc
matrix and are optimal windows for concentrating the energy
of sinusoids in the frequency interval (f+W,f-W). They
maximise the functional
f+W
J lye? av
f-—
z
(3)
yi (V) dv
aX
DS
With W chosen to be 4/N the functional (3) has a value close to
one for the first eight discrete prolate spheroidal sequences
vo(t), vi(t), … v7(t), and rapidly drops off thereafter. Since only
vw(t) with good spectral leakage resistance should be
considered in the computations, we set K equal to 8.
749
The absolute squares of yx(f)
Si (f) = yy (f k=0,1,..K-1 (4)
can be regarded as individually direct spectrum estimates.
However, the novelty of the multiple taper method is that is
utilises more data than conventional methods by using all
complex eigenspectra y«(f) with good spectral leakage
resistance. Applying regression techniques to the y(f) an
estimate of the complex amplitude p is obtained
K-1
2 Vox Yi (F)
Bf) » ES —— (5)
X Vi
k=0
where
N-1
Vok = 2 V(t). (6)
t=0
The multiple-window method also provides a statistical F-test
to test the fit of the sinusoid model. The random variable
a Le 2
(K-D|à([ X vj.
F(f) = — pel 5 (7)
X y. (D - if) Vo |
kzl
follows an F-distribution with 2 and 2K-1 degrees of freedom.
For significance level y the hypothesis p=0 is rejected if
F(f)ZF25»x.1:.. In our case (K-8) the 95% confidence level of
the f-test statistic is at 3.74 and the 9996 confidence level is at
6.51.
International Archives of Photogrammetry and Remote Sensing. Vol. XXXI, Part B7. Vienna 1996
