# Is it possible to do rudimentary error correction with CRC?

I know the whole intention of using CRC is to do error detection, but I heard someone state that it can be used to do basic error correction in addition to error detection. I was curious if this was the case, and if so, how powerful is it? I mean, we usually refer to CRC as capable of performing x-bit detection, but I'm curious if it is capable of performing x-bit correction. If so, how does this work? Thanks.

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You can't use a CRC to do error correction, only error detection. Something like Reed-Solomon is more suitable for error correction.

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Well, actually, I found a source that says a CRC scheme that detects 2-bit errors can correct a 1-bit error. "Any error checking code that can always detect a two-bit error can always correct any one-bit error". The page is cs.nmsu.edu/~pfeiffer/classes/573/notes/ecc.html. I was curious if this can be extended, and exactly how much correction a CRC scheme can do. –  naivedeveloper Sep 26 '10 at 17:36
This answer is wrong! CRCs can detect bit errors and correct bits, depending on the polynomial being used. For the common CRC16 or CRC32, they can detect 2 random bits (burst performance is better) and correct 1 bit. –  guga Mar 17 '12 at 17:12
I think "You can't.." should just be replaced by "You don't.." in this answer. To be honest and fair CRC is not really intended to do error correction even though it can in some restricted way be used to correct errors. –  damage Jun 24 '13 at 12:29

It is possible to do single-bit error correction with a CRC. Assume one has a CRC "register" and has functions to run the CRC algorithm forward and backward a bit at a time, ignoring incoming data

```int crc_forward(int old_value, int data_bit)
{
if (old_value & 0x8000)
return ((old_value ^ 0x8000) SHL 1) ^ 0x1021 ^ data_bit;
else
return (old_value SHL 1) ^ data_bit;
}

int crc_reverse(int old_value)
{
if (old_value & 1)
return (old_value SHR 1) ^ 0x8810;
else
return old_value SHR 1;
}
```

Suppose one has a packet which is computed so that initializing the crc to some value and running crc_forward for each bit (MSB first) should yield zero. If one gets a CRC value other than zero, one can run the algorithm in reverse (ignoring data bits) until the computed CRC value is 1. That's the location of the incorrect bit.

Note that this approach may be adequate for software error correction in things like NAND flash. To usefully employ it for hardware error correction, one would have to either be able to delay read operations until the ECC could be processed, or else one would need a table of 'syndrome' values and bit positions.

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I recently worked on CRC16 error detection and single bit error correction.

Here's the basic idea:

1. Assume you have a single bit error.
2. If the data+crc includes no error, the CRC will be 0, else it is not.
3. We define the CRC sent as CRCs and CRC received as CRCr.
4. Then the error bits are given by `CRCox = CRCs ^ CRCr`.
5. The result encompasses both CRC errors and data errors.
6. Have look at what relationship between CRCox and the bit error is.

Is this clear? I have a paper about this. If you want to know more, just let me know.

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I think this may be the paper @Wandy is referring to: espace.library.uq.edu.au/… –  Jason Sundram Mar 17 '12 at 15:49
For point 2, it is not the CRC which will be 0. It is the CRC received XORed with the CRC calulated on the received data! –  Étienne Jan 29 at 14:16