Yes. You can see how in zlib's
crc32_combine(). If you have two sequences A and B, then the pure CRC of AB is the exclusive-or of the CRC of A0 and the CRC of 0B, where the 0's represent a series of zero bytes with the length of the corresponding sequence, i.e. B and A respectively.
For your application, you can pre-compute a single operator that applies 1020 zeros to the CRC of your first four bytes very rapidly. Then you can exclusive-or that with the pre-computed CRC of the 1020 bytes.
Here is a post of mine from 2008 with a detailed explanation that @ArtemB discovered (that I had forgotten about):
crc32_combine() in zlib is based on two key tricks. For what follows,
we set aside the fact that the standard 32-bit CRC is pre and post-
conditioned. We can deal with that later. Assume for now a CRC that
has no such conditioning, and so starts with the register filled with
Trick #1: CRCs are linear. So if you have stream X and stream Y of
the same length and exclusive-or the two streams bit-by-bit to get Z,
i.e. Z = X ^ Y (using the C notation for exclusive-or), then CRC(Z) =
CRC(X) ^ CRC(Y). For the problem at hand we have two streams A and B
of differing length that we want to concatenate into stream Z. What
we have available are CRC(A) and CRC(B). What we want is a quick way
to compute CRC(Z). The trick is to construct X = A concatenated with
length(B) zero bits, and Y = length(A) zero bits concatenated with B.
So if we represent concatenation simply by juxtaposition of the
symbols, X = A0, Y = 0B, then X^Y = Z = AB. Then we have CRC(Z) =
CRC(A0) ^ CRC(0B).
Now we need to know CRC(A0) and CRC(0B). CRC(0B) is easy. If we feed
a bunch of zeros to the CRC machine starting with zero, the register
is still filled with zeros. So it's as if we did nothing at all.
Therefore CRC(0B) = CRC(B).
CRC(A0) requires more work however. Taking a non-zero CRC and feeding
zeros to the CRC machine doesn't leave it alone. Every zero changes
the register contents. So to get CRC(A0), we need to set the register
to CRC(A), and then run length(B) zeros through it. Then we can
exclusive-or the result of that with CRC(B) = CRC(0B), and we get what
we want, which is CRC(Z) = CRC(AB). Voila!
Well, actually the voila is premature. I wasn't at all satisfied with
that answer. I didn't want a calculation that took a time
proportional to the length of B. That wouldn't save any time compared
to simply setting the register to CRC(A) and running the B stream
through. I figured there must be a faster way to compute the effect
of feeding n zeros into the CRC machine (where n = length(B)). So
that leads us to:
Trick #2: The CRC machine is a linear state machine. If we know the
linear transformation that occurs when we feed a zero to the machine,
then we can do operations on that transformation to more efficiently
find the transformation that results from feeding n zeros into the
The transformation of feeding a single zero bit into the CRC machine
is completely represented by a 32x32 binary matrix. To apply the
transformation we multiply the matrix by the register, taking the
register as a 32 bit column vector. For the matrix multiplication in
binary (i.e. over the Galois Field of 2), the role of multiplication
is played by and'ing, and the role of addition is played by exclusive-
There are a few different ways to construct the magic matrix that
represents the transformation caused by feeding the CRC machine a
single zero bit. One way is to observe that each column of the matrix
is what you get when your register starts off with a single one in
it. So the first column is what you get when the register is 100...
and then feed a zero, the second column comes from starting with
0100..., etc. (Those are referred to as basis vectors.) You can see
this simply by doing the matrix multiplication with those vectors.
The matrix multiplication selects the column of the matrix
corresponding to the location of the single one.
Now for the trick. Once we have the magic matrix, we can set aside
the initial register contents for a while, and instead use the
transformation for one zero to compute the transformation for n
zeros. We could just multiply n copies of the matrix together to get
the matrix for n zeros. But that's even worse than just running the n
zeros through the machine. However there's an easy way to avoid most
of those matrix multiplications to get the same answer. Suppose we
want to know the transformation for running eight zero bits, or one
byte through. Let's call the magic matrix that represents running one
zero through: M. We could do seven matrix multiplications to get R =
MxMxMxMxMxMxMxM. Instead, let's start with MxM and call that P. Then
PxP is MxMxMxM. Let's call that Q. Then QxQ is R. So now we've
reduced the seven multiplications to three. P = MxM, Q = PxP, and R =
Now I'm sure you get the idea for an arbitrary n number of zeros. We
can very rapidly generate transformation matrices Mk, where Mk is the
transformation for running 2k zeros through. (In the
paragraph above M3 is R.) We can make M1 through Mk with only k
matrix multiplications, starting with M0 = M. k only has to be as
large as the number of bits in the binary representation of n. We can
then pick those matrices where there are ones in the binary
representation of n and multiply them together to get the
transformation of running n zeros through the CRC machine. So if n =
13, compute M0 x M2 x M3.
If j is the number of one's in the binary representation of n, then we
just have j - 1 more matrix multiplications. So we have a total of k
+ j - 1 matrix multiplications, where j <= k = floor(logbase2(n)).
Now we take our rapidly constructed matrix for n zeros, and multiply
that by CRC(A) to get CRC(A0). We can compute CRC(A0) in O(log(n))
time, instead of O(n) time. We exclusive or that with CRC(B) and
Voila! (really this time), we have CRC(Z).
That's what zlib's
I will leave it as an exercise for the reader as to how to deal with
the pre and post conditioning of the CRC register. You just need to
apply the linearity observations above. Hint: You don't need to know
length(A). In fact
crc32_combine() only takes three arguments:
CRC(A), CRC(B), and length(B) (in bytes).