I find on the OpenCV documentation for cvSmooth that sigma can be calculated from the kernel size as follows: sigma = 0.3(n/2 - 1) + 0.8

I would like to know the theoretical background of this equation.

Thank you.


Using such a value for sigma, the ratio between the value at the centre of the kernel and on the edge of the kernel, found for y=0 and x=n/2-1, is:

g_edge / g_center = exp(-(x²+y²)/(2σ²))
                  = exp(-(n/2-1)²/(2*(0.3(n/2-1)+0.8)²))

The limit of this value as n increases is:

exp(-1/(2*0.3²)) = 0.00386592

Note that 1/256 is 0.00390625. Images are often encoded in 256-value ranges. The choice of 0.3 ensures that the kernel considers all pixels that may significantly influence the resulting value.

I am afraid I do not have an explanation for the 0.8 part, but I imagine it is here to ensure reasonable values when n is small.

  • Thank you very much for your answer. Please forgive my ignorance, I cannot see the effect of having exp(-1/(2*0.3²)) = 0.00386592, which corresponds to 1/256. I would be very grateful if you could give an easier explanation. Besides, shouldn't we take the farthest pixel at (x=n/2-1, y=n/2-1) instead of (x=n/2-1, y=0)? Thank you.
    – AimingHigh
    Dec 28 '12 at 8:15
  • Why are you dropping the first part of the gaussian bell equation? 1/(2pi sigma^2)
    – filip
    Feb 19 '20 at 12:29
  • @filip because it gets cancelled in g_edge / g_center, as it appears on both sides of the division. Feb 19 '20 at 22:37
  • Also, could you maybe explain @AimingHigh 's comment too? :)
    – filip
    Feb 19 '20 at 22:59

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