I am looking for a checksum algorithm where for a large block of data the checksum is equal to the sum of checksums from all the smaller component blocks. Most of what I have found is from RFCs 1624/1141 which do provide this functionality. Does anyone have any experience with these checksumming techniques or a similar one?
I have only used Adler/Fletcher checksums which work as you describe.
There is a nice comparison of crypto++ hash/checksum implementations here.
To answer Amigable Clark Kent's bounty question, for file identity purposes you probably want a cryptographic hash function, which tries to guarantee that any two given files have an extremely low probability of producing the same value, as opposed to a checksum which is generally used for error detection only and may provide the same value for two very different files.
Many cryptographic hash functions, such as MD5 and SHA-1, use the Merkle–Damgård construction, in which there is a computation to compress a block of data into a fixed size, and then combine that with a fixed size value from the previous block (or an initialization vector for the first block). Thus, they are able to work in a streaming mode, incrementally computing as they go along.
If it's just a matter of quickly combining the checksums of the smaller blocks to get to the checksums of the larger message (not necessarily by a plain summation) you can do this with a CRC-type (or similar) algorithm.
The CRC-32 algorithm is as simple as this:
Mathematically, the state represents a polynomial over the field GF2 that is always reduced modulo the generator polynomial. Given a new bit
where G is the generator polynomial and addition is done in GF2 (xor). This checksum is linear in the sense that you can write the message
with the following properties
Again, I mean the
Finally, it's possible to compute
So, getting the checksum of a zero-padded message is just a matter of multiplying the "checksum polynomial" of the non-padded message with some other polynomial (
Suggested reading: Painless Guide to CRC Error Detection Algorithms