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Say you have a four byte integer and you want to compress it to fewer bytes. You are able to compress it because smaller values are more probable than larger values (i.e., the probability of a value decreases with its magnitude). You apply the following scheme, to produce a 1, 2, 3 or 4 byte result:

Note that in the description below (the bits are one-based and go from most significant to least significant), i.e., the first bit refers to most significant bit, the second bit to the next most significant bit, etc...)

  1. If n<128, you encode it as a single byte with the first bit set to zero
  2. If n>=128 and n<16,384 , you use a two byte integer. You set the first bit to one, to indicate and the second bit to zero. Then you use the remaining 14 bits to encode the number n.
  3. If n>16,384 and n<2,097,152 , you use a three byte integer. You set the first bit to one, the second bit to one, and the third bit to zero. You use the remaining 21 bits, to encode n.
  4. If n>2,097,152 and n<268,435,456 , you use a four byte integer. You set the first three bits to one and the fourth bit to zero. You use the remaining 28 bits to encode n.
  5. If n>=268,435,456 and n<4,294,967,296, you use a five byte integer. You set the first four bits to one and use the following 32-bits to set the exact value of n, as a four byte integer. The remainder of the bits is unused.

Is there a name for this algorithm?

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I like this! But this will break the functionality of pointers... The pointer will have to read the first bits of the value pointed to to know where the next value will be.. But it certainly sounds nice, haven't heard of it. – rsplak Apr 11 '11 at 18:45
This scheme is very similar to UTF-8. – Jeffrey L Whitledge Apr 11 '11 at 18:48
I believe I've seen a draft RFC that proposed this scheme for transmitting arbitrary precision integers, but my Google-fu fails me. In any case, you won't get it patented :) – Fred Foo Apr 11 '11 at 18:49
The difference between Michael Goldshteyn's algorithm and UTF-8 is that the latter "wastes" bits to make it possible to efficiently find the beginning of a character that uses any given byte of the string. Specifically, each byte after the first is of the form 10xxxxxx. – ikegami Apr 11 '11 at 18:54
up vote 3 down vote accepted

This is quite close to variable-length quantity encoding or base-128. The latter name stems from the fact that each 7-bit unit in your encoding can be considered a base-128 digit.

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As previously mentioned, that's not true. Wikipedia says the VLQ of 3FFF is FF 7F. Using @Michael Goldshteyn's algorithm, 3FFF is C0 3F FF. – ikegami Apr 11 '11 at 20:38
@ikegami: reread the description and you're right: I missed some of the details, including that the length is prepended in base-1, rather than "threaded through" the representation of the integer. – Fred Foo Apr 11 '11 at 20:49
Although larsmans answer is not identical to my proposed algorithm, it is in the spirit of the question and the closest (actual existing) algorithm. Therefore he got the check mark. – Michael Goldshteyn Apr 12 '11 at 1:14

it sounds very similar to Dlugosz' Variable-Length Integer Encoding

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This is what I was looking for, but it was not invented by Dlugosz. larsmans has posted a link to the code in the comments. – Michael Goldshteyn Apr 11 '11 at 18:54

Huffman coding refers to using fewer bits to store more common data in exchange for using more bits to store less common data.

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No, this is not huffman coding. From that Wiki page: Huffman coding uses a specific method for choosing the representation for each symbol, resulting in a prefix code (sometimes called "prefix-free codes", that is, ''the bit string representing some particular symbol is never a prefix of the bit string representing any other symbol'') that expresses the most common source symbols using shorter strings of bits than are used for less common source symbols. – Michael Goldshteyn Apr 11 '11 at 18:51
@Michael Goldshteyn, you specified the probability of a value being used is the inverse of its magnitude (the smaller, the more probable). Based on your assumption, the algorithm is a form of huffman coding. Mind you, that's the general class of algorithm, and not the name of your specific implementation. – ikegami Apr 11 '11 at 20:32
No, the algorithm I presented is in the class of entropy encoding, but it is not a form of Huffman Coding based on any definition / implementation of Huffman coding in Wikipedia. And by the way, your definition of Huffman coding (from the answer) applies to any entropy coding scheme. – Michael Goldshteyn Apr 12 '11 at 1:12

Your scheme is similar to UTF-8, which is an encoding scheme used for Unicode text data.

The chief difference is that every byte in a UTF-8 stream indicates whether it is a lead or trailing byte, therefore a sequence can be read starting in the middle. With your scheme a missing lead byte will make the rest of the file completely unreadable if a series of such values are stored. And reading such a sequence must start at the beginning, rather than an arbitrary location.

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Using the high bit of each byte to indicate "continue" or "stop", and the remaining bits (7 bits of each byte in the sequence) interpreted as plain binary that encodes the actual value:

This sounds like the "Base 128 Varint" as used in Google Protocol Buffers.

related ways of compressing integers

In summary: this code represents an integer in 2 parts: A first part in a unary code that indicates how many bits will be needed to read in the rest of the value, and a second part (of the indicated width in bits) in more-or-less plain binary that encodes the actual value.

This particular code "threads" the unary code with the binary code, but other, similar codes pack the complete unary code first, and then the binary code afterwards, such as Elias gamma coding.

I suspect this code is one of the family of "Start/Stop Codes" as described in:

Steven Pigeon — Start/Stop Codes — Procs. Data Compression Conference 2001, IEEE Computer Society Press, 2001.

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