Rabin fingerprint

The Rabin fingerprinting scheme is a method for implementing fingerprints using polynomials over a finite field. It was proposed by Michael O. Rabin.^[1]

Scheme

Given an n-bit message m₀,...,m_n-1, we view it as a polynomial of degree n-1 over the finite field GF(2).

f(x)=m_{0}+m_{1}x+\ldots +m_{{n-1}}x^{{n-1}}

We then pick a random irreducible polynomial $p(x)$ of degree k over GF(2), and we define the fingerprint of the message m to be the remainder $r(x)$ after division of $f(x)$ by $p(x)$ over GF(2) which can be viewed as a polynomial of degree k-1 or as a k-bit number.

Applications

Many implementations of the Rabin–Karp algorithm internally use Rabin fingerprints.

The Low Bandwidth Network Filesystem (LBFS) from MIT uses Rabin fingerprints to implement variable size shift-resistant blocks. ^[2] The basic idea is that the filesystem computes the cryptographic hash of each block in a file. To save on transfers between the client and server, they compare their checksums and only transfer blocks whose checksums differ. But one problem with this scheme is that a single insertion at the beginning of the file will cause every checksum to change if fixed-sized (e.g. 4 KB) blocks are used. So the idea is to select blocks not based on a specific offset but rather by some property of the block contents. LBFS does this by sliding a 48 byte window over the file and computing the Rabin fingerprint of each window. When the low 13 bits of the fingerprint are zero LBFS calls those 48 bytes a breakpoint and ends the current block and begins a new one. Since the output of Rabin fingerprints are pseudo-random the probability of any given 48 bytes being a breakpoint is $2^{{-13}}$ . This has the effect of shift-resistant variable size blocks. Any hash function could be used to divide a long file into blocks (as long as a cryptographic hash function is then used to find the checksum of each block): but the Rabin fingerprint is an efficient rolling hash, since the computation of the Rabin fingerprint of region B can reuse some of the computation of the Rabin fingerprint of region A when regions A and B overlap.

Note that this is a problem similar to that faced by rsync.

References

↑ Michael O. Rabin (1981). "Fingerprinting by Random Polynomials" (PDF). Center for Research in Computing Technology, Harvard University. Tech Report TR-CSE-03-01. Retrieved 2007-03-22.
↑ Athicha Muthitacharoen, Benjie Chen, and David Mazières "A Low-bandwidth Network File System"

External links

Andrei Z. Broder (1993). "Some applications of Rabin's fingerprinting method". Retrieved 2011-09-12.
David Andersen (2007). "Exploiting Similarity for Multi-Source Downloads using File Handprints". Retrieved 2007-04-12.

This article is issued from Wikipedia - version of the 6/5/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.

Rabin fingerprint

Scheme

Applications

See also

References

External links