# Can Kullback-Leibler be applied to compare two images?

I know that KL is not a metric, and cannot be considered one. However, is it possible to use KL to measure how one image varies from another? I am trying to make an intuitive sense out of this. Thanks in advance for all responses.

• While the answer by Amitay is a very good one, you might try to explain a bit why you are asking this. Maybe you got some use-case in mind which has some more specialized approach available. – sascha Oct 9 '16 at 0:45

The KL measures the difference between two probability distributions.

In order to apply it in images you will need to transform the image to a probability distribution.

A simple example will be the take the histogram of the image(in gray scale) and than divide the histogram values by the total number of pixels in the image. This will result in the probability to find a gray value in the image.

Apply this to both images and than use the KL to measure the difference between the images.

This is not a real good way to measure the difference between the images because it doesn't take into consideration the spatial information of the images only the gray values information.

Therefor you will need to find a better transformation that will take into account the spatial distribution of the pixel color values. Look at this to get some ideas https://mathematica.stackexchange.com/questions/91627/how-to-transform-an-image-into-a-probability-density-function

• Thanks for the explanation Amitay! – troymyname00 Oct 11 '16 at 0:09