# Any theoretical limit to compression?

Imagine that you had all the supercomputers in the world at your disposal for the next 10 years. Your task was to compress 10 full-length movies losslessly as much as possible. Another criteria was that a normal computer should be able to decompress it on the fly and should not need to spend much of his HD to install the decompressing software.

My question is, how much more compression could you achieve than the best alternatives today? 1%, 5%, 50%? More specifically: is there a theoretical limit to compression, given a fixed dictionary size (if it is called that for video compression as well)?

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typically, decompression is way faster than compression. –  Mark Hosang May 26 '11 at 6:59
My survey on compression goo.gl/2okQWR (see Section 2.2) shows that most practical techniques achieve compression ratio <2X and some upto 4X, although potential for 16X exists. –  user984260 Jul 12 at 12:11

The limits of compression are dictated by the randomness of the source. Welcome to the study of information theory! See data compression.

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+1 for the exact correct answer –  Mark Hosang May 26 '11 at 6:58
So then what dictates the limits of compression for one specific value of randomness? –  psycho brm Feb 4 at 9:07

If you have a fixed catalogue of all the movies you were ever going to compress, you could just send an id for the movie and have the "decompression" lookup up the data with that index. So compression could be to a fixed size of log2(N) bits, where N was the number of movies.

I suspect the practical lower bound is rather higher than this.

Do you really mean lossless? Most of today's video compression is lossy, I thought.

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I said lossless to make it a clear example. Lossy is very undefined. Your trick is good. But given a fixed dictionary size, the problem is harder. –  David Dec 2 '10 at 22:31
Lots of information here en.wikipedia.org/wiki/Lossless_data_compression –  The Archetypal Paul Dec 2 '10 at 22:33

There is a theoretical limit: I suggest reading this article on Information theory and the pigeon hole principle. It seems to sum up the issue in a very easy to understand way.

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+1. Not only is there a theoretical limit, but it it has a name: The theoretical minimum-size limit for those 10 movies is called "the Kolmogorov complexity of those 10 movies". –  David Cary Mar 14 '11 at 1:42