Abstract
Fractal image compression is a comparatively new technique which has gained considerable
attention in the popular technical press, and inore recently in the research literature.
The most significant advantages claimed are high reconstruction quality at low coding
rates, rapid decoding, and "resolution independence" in the sense that an encoded image
may be decoded at a higher resolution than the original. While many of the claims published
in the popular technical press are clearly extravagant, it appears from the rapidly
growing body of published research that fractal image compression is capable of performance
comparable with that of other techniques enjoying the benefit of a considerably
more robust theoretical foundation. .
So called because of the similarities between the form of image representation and a
mechanism widely used in generating deterministic fractal images, fractal compression
represents an image by the parameters of a set of affine transforms on image blocks
under which the image is approximately invariant. Although the conditions imposed
on these transforms may be shown to be sufficient to guarantee that an approximation
of the original image can be reconstructed, there is no obvious theoretical reason to
expect this to represent an efficient representation for image coding purposes. The usual
analogy with vector quantisation, in which each image is considered to be represented
in terms of code vectors extracted from the image itself is instructive, but transforms
the fundamental problem into one of understanding why this construction results in an
efficient codebook.
The signal property required for such a codebook to be effective, termed "self-affinity",
is poorly understood. A stochastic signal model based examination of this property is
the primary contribution of this dissertation. The most significant findings (subject
to some important restrictions} are that "self-affinity" is not a natural consequence
of common statistical assumptions but requires particular conditions which are inadequately
characterised by second order statistics, and that "natural" images are only
marginally "self-affine", to the extent that fractal image compression is effective, but
not more so than comparable standard vector quantisation techniques.
WOHLBERG, B (2021). Fractal Image Compression and the Self-Affinity Assumption: A Stochastic Signal Modelling Perspective. Afribary. Retrieved from https://track.afribary.com/works/fractal-image-compression-and-the-self-affinity-assumption-a-stochastic-signal-modelling-perspective
WOHLBERG, BRENDT "Fractal Image Compression and the Self-Affinity Assumption: A Stochastic Signal Modelling Perspective" Afribary. Afribary, 15 May. 2021, https://track.afribary.com/works/fractal-image-compression-and-the-self-affinity-assumption-a-stochastic-signal-modelling-perspective. Accessed 23 Nov. 2024.
WOHLBERG, BRENDT . "Fractal Image Compression and the Self-Affinity Assumption: A Stochastic Signal Modelling Perspective". Afribary, Afribary, 15 May. 2021. Web. 23 Nov. 2024. < https://track.afribary.com/works/fractal-image-compression-and-the-self-affinity-assumption-a-stochastic-signal-modelling-perspective >.
WOHLBERG, BRENDT . "Fractal Image Compression and the Self-Affinity Assumption: A Stochastic Signal Modelling Perspective" Afribary (2021). Accessed November 23, 2024. https://track.afribary.com/works/fractal-image-compression-and-the-self-affinity-assumption-a-stochastic-signal-modelling-perspective