A fractal flame is a special type of fractal that can be generated by an iterated function system. Fractal flames are commonly used as background images or as textures.
An iterated function system (IFS) is a method of generating fractal images. In an IFS, a set of equations is used to define the transformation of a point in the plane. This transformation is then applied iteratively to create a fractal image. There are many different ways to create an IFS. The most popular method is to use a set of linear equations, but non-linear equations can also be used. The choice of equations will determine the kind of image that is generated.
IFSs were first used to generate fractal images in the early 1980s. They were popularised by the work of Michael Barnsley, who used them to create a wide range of images, including the now-famous Mandelbrot set. IFS’s have many uses in computer graphics. They can be used to make landscapes, artificial life forms, and abstract art, among other things.
Fractal flames were first discovered by Scott Draves in 1992. He found that he could create strikingly beautiful images by iterating a simple set of functions. Fractal flames are created by iterating a set of equations. For each point in an image, a set of numbers is generated. These numbers are then used to create a colour. The process is then repeated for each point in the image.
Flames are a relatively new type of fractal, but they have already become very popular. Thanks to the ease with which they can be generated and the wide range of images that they can create, they are sure to become even more popular in the future.