-log(SNR) does it make any difference?

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Dear All,
please, let me know if you know what happens to Signal to Noise ratio (SNR) of an image after we take -log(SNR)? What happens to Signal and Noise components (please, formulas)?
Thanks!

Accepted Answer

Ahmed A. Selman
Ahmed A. Selman on 4 Apr 2013
Easily decompose the log argument! For any (ratio) R=S/N, then (please note that I highlighted the math formulas like codes, yet they are NOT codes):
A = Log( R) = Log(S/N) = Log(S) - Log(N)
leading simply to
-A = -Log( R) = Log(N) - Log (S) = Log(N/S) = Log(1/R)
Now, the definition of a logarithmic decibel scale for R (RdB) as,
RdB = 10A = 10 Log( R) = 10 Log (.. etc.
Or, converting between Amplitude (Am) and power of signal S (or noise N) using
AmS=S^2 and AmN=N^2 --> R=S/N = (AmS/AmN)^2
AmS (AmN) is the amplitude of signal (noise), again using basic math
RdB = 10 A = 10 Log ( R) = 10 Log ( (AmS / AmN)^2 ) = 2 * 10 * Log(AmS/AmN) = 20 Log (AmS/AmN)
So,
RbD = 10 Log(S) - 10 Log (R) = SdB - NdB
SdB and NdB are the signal and noise, in the logarithmic decibel scale. Equivalent to:
RbB= 20 ( Log (AmS) - Log(AmN) ) = 2 AmSdB - 2 AmNdB
AmSdB and AmNdB are the signal and noise amplitudes, in a logarithmic, decibel scale.
In image processing it's more appropriate to define R as
R=M/D
M is the mean of the image pixels, and D is the standard deviation of the noise (calculated in few different ways, depending on the type of the imaging conditions usually). The rest is straightforward (parallel to the simple relations above).
You'll find that, taking ( -log( R) ) for an image reduces to only subtracting image noise from it's mean. If the noise was a fixed-type, the process means subtracting a constant from the entire image, leading to a homogenous intensity reduction.
  3 Comments
Ahmed A. Selman
Ahmed A. Selman on 5 Apr 2013
Hello, thank you for the nice interpretation of what I said.
First, yes, -Log(S/N) is negative, and it is absolutely possible for true images. No need to derive a thing to prove that, since (S >> N, S/N > 1, Log(S/N) is +ve). But what does that mean?
Now, what does it mean: ((S/N=logS1*ln10*(S1/N1) but wait that means that if one takes -log(image) one actually increases S/N! )) ?
Does it refer to: taking log (X) means increasing X? Or taking Log(X) means increasing (Y), where (Y) is a part or (X)? Both are not logical, sorry. Second,
if S = - Log(S1) then dS = - dS1/(S1*ln(10) ).
Integrating,
let S1 ln(10) = F,
dS1= dF/ln(10),
so integral ( dS = - dS1/(S1 ln(10)) ) gives
S = - integral( dF/ln(10) / F) is that was (1/ln(10)*Log(F) as given, then it will be
S = - 1/ln(10) Log(S1*(ln(10))
= - 1/ln(10) * (Log (S1) + Log(ln(10))
not equaling -Log(S1), where we started.
Finally, taking Log(image) is a thing.. and taking Log(S/N) of an image, is another, entirely different thing, because:
Log(A/B) equals NOT Log(A)/Log(B).
Log(A+B) equals NOT { Log(A/B), Log(A)/Log(B), Log(A)-Log(B)..etc }.
But you are right, it is getting interesting.
Alex
Alex on 5 Apr 2013
Edited: Alex on 5 Apr 2013
Thank you so much for your helping hand. I am quite new to image processing and I do appreciate your time and help. I am writing a software to study SNR propagation through different steps of image processing on X-ray microscope (theoretical approach based on input parameters to compare with the experimentally determined S/N). Image subtraction, then division (normalization) is fine but I got stuck when taking -log(S/N) because the final plot is -log((data-noise)/(data-reference)) as as function of energy. I would have to plot final S/N as a function of energy and the idea of negative S/N did not agree with me. I will try to do simulation today using the information above and keep you updated. Thanks!

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