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Gaussian smoothing is a common image processing function, and for an introduction of Gaussian filtering, please refer to here. As we can see, one parameter: standard derivation will determine the shape of Gaussian function. However, when we perform convolution with Gaussian filtering, another parameter: the window size of Gaussian filter should also be determined at the same time. For example, when we use fspecial function provided by MATLAB, not only the standard derivation but also the window size must be provided. Intuitively, the larger the Gaussian standard derivation is the bigger the Gaussian kernel window should. However, there is no general rule about how to set the right window size. Any ideas? Thanks!

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I believe that this post will be helpful: –  fpe Apr 23 '13 at 9:32
I think that you can generally select a size which is at least 3 times the selected standard deviation of your Gaussian bell. –  fpe Apr 23 '13 at 9:38

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up vote 2 down vote accepted

The size of the mask drives the filter amount. A larger size, corresponding to a larger convolution mask, will generally result in a greater degree of fintering. As a kinda trade-off for greater amounts of noise reduction, larger filters also affect the details quality of the image.

That's as milestone. Now coming to the Gaussian filter, the standard deviation is the main parameter. If you use a 2D filter, at the edge of the mask you will probably desire the weights to approximate 0.

To this respect, as I already said, you can choose a mask with a size which is generally three times the standard deviation. This way, almost the whole Gaussian bell is taken into account and at the mask's egdes your weights will asimptotically tend to zero.

I hope this helps.

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If you set the filter size to 3 times the standard deviation, then you're covering the range [-1.5 \sigma, 1.5 \sigma]. I think you mean 6 times the standard deviation. –  Patrick Mineault Apr 23 '13 at 19:43
I meant 3 times the standard deviation for each of the tails. That makes 6 sigma as amplitude, yes. –  fpe Apr 23 '13 at 19:53

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