# Image resizing: what is a “filter”?

I'm trying to understand how image resizing works - please, can someone explain to me what is a "filter" good for?

• does a filter calculates how much a source pixel contributes to a destination pixel?

• there are filters like "box" and "gaussian", but is there a filter called "bicubic"? Do I mix two concepts here, one being "convolution filter" and ...?

• is it possible to use the same filter for both upscaling and downscaling? (it would be really great to see an example code of this)

• is it desirable to first stretch the image in one dimension and then in the other one?

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In image resizing, the filter avoids a phenomenon called aliasing. If you try to resize without a filter, aliasing typically manifests as obnoxious pixellated effects, which are especially visible when animated...

• The filter does calculate how much each source pixel contributes to each destination. For resizing, you want a linear filter, which is pretty simple: the filter can be viewed as a small grayscale image; effectively, you center the filter over a location corresponding to each output pixel, multiply each nearby pixel by the filter value at that location, and add them up to get the output pixel value.

• All such filters are "convolution filters", because convolution is the mathematical name for the operation described above. A "box" filter literally looks like a box -- every pixel within the box is weighted equally, while "gaussian" filters are more roundish blobs, feathering towards zero at the edge.

• The most important thing for upscaling and downscaling is to choose the right size for your filter. Briefly, you want to scale your filter based on whichever of the input and output has the lowest resolution. The second most important thing is to avoid bad filters: the "box" filter is what you usually get when you try to resize without filtering; a "bilinear" filter as provided by computer graphics hardware yields mediocre upscaling, but is supplied at the wrong size for downscaling.

• For performance reasons, it is desirable to scale images in one dimension and then the other one. This means your filter runs much faster: in time proportional to the filter width, instead of proportional to the filter area. All the filters discussed here are "separable", which means you can apply them in this way.

If you choose a high-quality filter, the exact form is less critical than you might think. There are two classes of good filters: all-positive ones like "gaussian" which tend to the blurry side, and negative-lobed ones like "lanczos" which are sharp, but may yield slight ringing effects. Note that "bicubic" filters is a category, which includes "B-spline" which is all-positive, and "Mitchell" and "Catmull-Rom" which have negative lobes.

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Thank you very much! I think I finally understand when Wikipedia says "[a bicubic] interpolator with similar properties can be obtained by applying a convolution". One last thing though, I still don't get how the size for upscaling and downscaling works. I saw many times that a filter has hardcoded the value, says Catmull-Rom is of size 2. Especially what downscaling goes, if I have a picture 1000px big and what to resize it to 10px, should the size be 100? Isn't it slow to "avarage" (?) 100 pixels for every output pixel? –  Ecir Hana Sep 18 '12 at 10:39
Your guess is correct. For upscaling, the filter should be sized according to the input pixel pitch, but for downscaling, the filter should be sized according to the output pixel pitch. That's what I meant when I wrote "you want to scale your filter based on whichever of the input and output has the lowest resolution". –  comingstorm Sep 18 '12 at 17:31
And, yes, it is slow per output pixel, but you can't expect to get away without processing all your input pixels. –  comingstorm Sep 18 '12 at 17:34