.(P)AD INPUT FILE: P
[Answer P if you want to pad the input file.]
If P was answered:
.PADDING DIMENSION: 140
ENTER * IF NO REAL SPACE OUTPUT DESIRED:
.RADON OUTPUT FILE: RADOUT001
[Enter a file name if you desire a back transformed output
file, e.g. for Fourier filtration.]
.RADON FOURIER OUTPUT FILE: RADFOUR001
[Enter name of Fourier output file. Enter * if no such file
is desired.]
.FOURIER FILTER Y/N: Y
[Enter Y if you want to Fourier filter the transform.]
.(A)DDITIVE (=DEF),(M)ULTIPLICATIVE: M
[Combine the chosen filters either additive or multiplicative.
For a band pass filter M is the ususal option.]
.(1)L.P./(2)H.P./(3)G.L.P./(4)G.H.P./(5)F.L.P./(6)F.H.P.,(7) R*: 5
[Enter desired filter. Similar to SPIDER opreation FF.
1: cutoff low pass filter, 2: cutoff high pass filter
3: Gaussian low pass filter, 4: Gaussian high pass filter.
5: Fermi low-pass filter, 6: Fermi high pass filter.
7: Multiplication with r* (the Fourier radius).
8: Multiplication with sqrt(r*).
.FILTER RADIUS: 0.123
[Enter filter radius. also otion 7 currently asks for a radius,
but the value is ignored.]
[End of question concerning filtrations.]
.(A)MPLITUDE NORMALISATION FOR PHASE CORRELATION: A
[Answer A if the the Fourier coefficients should be normalized
by their value. A Wiener style filter is applied. If NF is the n
new Fourier coefficient and OF is the old value the normalization
formula is:
NF = OF / (|OF| + epsilon).
.(S)IGMA NORMALIZATION: N
[Enter S if each line in the Fourier transform is to be
normailzed by its own sigma. Otherwise enter N. Sigma
for each line is stored with the Fourier transform for
later usage in this case.]
NOTES