An apodization function chosen to minimize the height of the highest sidelobe (Hamming and Tukey 1949, Blackman and Tukey 1959). The Hamming function is given by
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(1)
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and its full width at half maximum is 
.
The corresponding instrument function is
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(2)
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This apodization function is close to the one produced by the requirement that the instrument
function goes to 0 at 
. The FWHM is 
, the peak is 1.08, and the peak negative
and positive sidelobes (in units of the peak) are 
and 0.00734934, respectively.
From the apodization function, a general symmetric apodization function 
can be written as a Fourier
series
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(3)
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where the coefficients satisfy
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(4)
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The corresponding instrument function is
![I(t)=2b{a_0sinc(2pikb)+sum_(n=1)^infty[sinc(2pikb+npi)+sinc(2pikb-npi)]}.](/images/equations/HammingFunction/NumberedEquation5.svg) |
(5)
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To obtain an apodization function with zero at 
,
use
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(6)
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so
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(7)
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(8)
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(9)
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(10)
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(11)
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