9.2. Convolution Matrix

9.2.1. Overview

Here is a mathematician’s domain. Most of filters are using convolution matrix. With the Convolution Matrix filter, if the fancy takes you, you can build a custom filter.

What is a convolution matrix? It’s possible to get a rough idea of it without using mathematical tools that only a few ones know. Convolution is the treatment of a matrix by another one which is called “kernel”.

The Convolution Matrix filter uses a first matrix which is the Image to be treated. The image is a bi-dimensional collection of pixels in rectangular coordinates. The used kernel depends on the effect you want.

GIMP uses 5x5 or 3x3 matrices. We will consider only 3x3 matrices, they are the most used and they are enough for all effects you want. If all border values of a kernel are set to zero, then system will consider it as a 3x3 matrix.

The filter studies successively every pixel of the image. For each of them, which we will call the “initial pixel”, it multiplies the value of this pixel and values of the 8 surrounding pixels by the kernel corresponding value. Then it adds the results, and the initial pixel is set to this final result value.

A simple example:

9.2. Convolution Matrix - 图1

On the left is the image matrix: each pixel is marked with its value. The initial pixel has a red border. The kernel action area has a green border. In the middle is the kernel and, on the right is the convolution result.

Here is what happened: the filter read successively, from left to right and from top to bottom, all the pixels of the kernel action area. It multiplied the value of each of them by the kernel corresponding value and added results. The initial pixel has become 42: (40*0)+(42*1)+(46*0) + (46*0)+(50*0)+(55*0) + (52*0)+(56*0)+(58*0) = 42. (the filter doesn’t work on the image but on a copy). As a graphical result, the initial pixel moved a pixel downwards.

9.2.2. Activating the filter

This filter is found in the image window menu under Filters → Generic → Convolution Matrix….

9.2.3. Options

Figure 17.175. “Convolution matrix” options

“Convolution matrix” options

Presets, “Input Type”, Clipping, Blending Options, Preview, Split view

[Note]Note

These options are described in Section 2, “Common Features”.

Matrix

This is the 5x5 kernel matrix: you enter wanted values directly into boxes.

  • Divisor

    The result of previous calculation will be divided by this divisor. You will hardly use anything else than 1, which leaves results unchanged, and 9 or 25 according to matrix size, which gives the average of pixel values. The divisor can only be changed when Normalize is unchecked.

    Offset

    This value is added to the division result. This is useful if result may be negative. This offset may be negative. It can only be changed when Normalize is unchecked.

Channels

Here you can select which channels the filter should change.

Normalize

If this option is checked, The Divisor takes the result value of convolution. If this result is equal to zero (it’s not possible to divide by zero), then a 128 offset is applied. If it is negative (a negative color is not possible), a 255 offset is applied (inverts result).

Alpha-weighting

If this option is not checked, the filter doesn’t take in account transparency and this may be cause of some artefacts when blurring.

Border

When the initial pixel is on a border, a part of kernel is out of image. You have to decide what filter must do:

9.2. Convolution Matrix - 图4 9.2. Convolution Matrix - 图5 9.2. Convolution Matrix - 图6 9.2. Convolution Matrix - 图7

From left: source image, None border, Loop border, Clamp border

  • None

    This part of kernel is not taken into account.

    Loop

    This part of kernel will study pixels of the opposite border, so pixels disappearing from one side reappear on the other side.

    Clamp

    Pixels on borders are not modified, but they are cropped.

    Black

    Pixels on borders are changed to black.

    White

    Pixels on borders are changed to white.

9.2.4. Examples

Design of kernels is based on high levels mathematics. You can find ready-made kernels on the Web. Here are a few examples:

Figure 17.176. Sharpen

Sharpen

Sharpen

Figure 17.177. Blur

Blur

Blur

Figure 17.178. Edge enhance

Edge enhance

Edge enhance

Figure 17.179. Edge detect

Edge detect

Edge detect

Figure 17.180. Emboss

Emboss

Emboss