# Algorithm to check similarity of colors based on RGB values (or maybe HSV)

I'm looking for an algorithm that compares to RGB-colors and generates a value of their similarity (where similarity means "similar with respect to avarage human perception").

Any ideas?

EDIT:

Since I cannot answer anymore I decided to put my "solution" as an edit to the question.

I decided to go with a (very) small subset of true-color in my app, so that I can handle comparison of colors by my own. I work with about 30 colors and use hard-coded distances between them.

Since it was an iPhone app I worked with objective-C and the implementation is more or less a matrix representing the table below, which shows the distances between the colors.

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Comparing R, G and B values isn't enough? –  BlackBear Mar 22 '11 at 13:32
I don't think so, e.g. 30/30/30 is much closer to black than 90/0/0 –  Kai Huppmann Mar 22 '11 at 13:36
@Kai: i am trying to implement the same thing. did you go with the YUV approch or did you choose another kind of color space and space distance? –  Thariama Sep 18 '12 at 14:18
@Thariama I decided to go with a (very) small subset of true-color in my app, so that I can handle comparison of colors by my own. I work with about 50 colors and use hard-coded distances between them. However from all I read and tried and tested when using 2^24 colors YUV did the best job. –  Kai Huppmann Sep 18 '12 at 15:15
@Kai: thanks very much for letting me know about your decision and its reasons. that means you are using RGB and create a histogram using 50 colors and speed up your alogithm using predefined distances, correct? what language did you use to implement your algorithm? –  Thariama Sep 19 '12 at 6:43

RGB distance in the euclidean space is not very "similar to avarage human perception"

You can use YUV color space, it takes into account this factor :

You can also use the CIE color space for this purpose.

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Thank you! Can I then go with the euclidian space distance of the Y'UV values? –  Kai Huppmann Mar 22 '11 at 14:45
Sure, but you could also use other distances. –  Ghassen Hamrouni Mar 22 '11 at 15:25
Most probably you want to calculate euclidean distance between UV components only because Y' is the luma component. –  Ross Mar 25 '11 at 9:14
Can anyone cite a source for the claim that Euclidean distance in YUV mirrors human perception of differences? –  Bill Oct 11 '11 at 2:23
@Bill it doesn't. see the "results" section here: compuphase.com/cmetric.htm –  kritzikratzi Nov 13 '13 at 14:43

Human perception is weaker in chroma than intensity.

For example, in commercial video, the YCbCr/YPbPr color spaces (also called Y'UV) reduces the resolution of the chroma info but preserves the luma (Y). In digital video compression such as 4:2:0 and 4:2:2 reduces the chroma bitrate due to relatively weaker perception.

I believe that you can calculate a distance function giving higher priority over luma (Y) and less priority over chroma.

Also, under low intensity, human vision is practically black-and-white. Therefore, the priority function is non-linear in that for low luma (Y) you put less and less weight on chroma.

More scientific formulas: http://en.wikipedia.org/wiki/Color_difference

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Color perception is not Euclidean. Any distance formula will be both good enough and terrible at the same time. Any measure based on Euclidean distance (RGB, HSV, Luv, Lab, ...) will be good enough for similar colors, showing aqua being close to teal. But for non-close values it gets to be arbitrary. For instance, is red closer to green or to blue?

From Charles Poynton's Color FAQ:

The XYZ and RGB systems are far from exhibiting perceptual uniformity. Finding a transformation of XYZ into a reasonably perceptually-uniform space consumed a decade or more at the CIE and in the end no single system could be agreed.

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Thank you. And it's a great, interesting link. For my purpose it's not that important to tell if red is closer to green or blue, but that a light grey is closer to white then a light red and I hope (but not sure yet) that YUV will make it. –  Kai Huppmann Mar 23 '11 at 6:43