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Error Correction and the Hamming Distance

Module by: Don Johnson. E-mail the author

Summary: So-called linear codes create error-correction bits by combining the data bits linearly. Topics discussed include generator matrices and the Hamming distance.

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So-called linear codes create error-correction bits by combining the data bits linearly. The phrase "linear combination" means here single-bit binary arithmetic.

Figure 1
Table 1
00=0 0 0 0 11=0 1 1 0 01=1 0 1 1 10=1 1 0 1
0and0=0 and 0 0 0 1and1=1 and 1 1 1 0and1=0 and 0 1 0 1and0=0 and 1 0 0

For example, let's consider the specific (3,1) ( 3 , 1 ) error correction code described by the following coding table and, more concisely, by the succeeding matrix expression.

Figure 2
Table 2
c1=b1 c2=b1 c3=b1 c 1 b 1 c 2 b 1 c 3 b 1
c=Gb , G=( 1 1 1 ) c=c1c2c3 b=b1 c G b , G 1 1 1 c c 1 c 2 c 3 b b 1

The length-KK (in this simple example K=1K1) block of data bits is represented by the vector bb, and the length- NN output block of the channel coder, known as a codeword, by cc. The generator matrix GG defines all block-oriented linear channel coders.

Error-Correcting Codes Channel Decoding

As we consider other block codes, the simple idea of the decoder amounting to a simple majority count of the bits in the received data block won't generalize easily. We nees a broader biew that takes into acount the distance between codewords. A length-N codeword means that the receiver must decide among the 2N 2N possible datawords to select which of the 2K 2K codewords was actually transmitted. As shown in Figure 3, we can think of the datawords geometrically. We define the Hamming distance between binary datawords c 1 c 1 and c 2 c 2 , denoted by d c 1 c 2 d c 1 c 2 to be the minimum number of bits that must be "flipped" to go from one word to the other. For example, the distance between codewords is 3 bits. In our table of binary arithmetic, we see that adding a 1 corresponds to flipping a bit. Furthermore, subtraction and addition are equivalent. We can express the Hamming distance as

d c 1 c 2 = sum c 1 c 2 d c 1 c 2 sum c 1 c 2

Exercise 1

Show that adding the error vector col[1,0,...,0] to a codeword flips the codeword's leading bit and leaves the rest unaffected.


In binary arithmetic (see Figure 1), adding 0 to a binary value results in that binary value while adding 1 results in the opposite binary value.

The probability of one bit being flipped anywhere in a codeword is N pe 1 pe N1 N pe 1 pe N1 . The number of errors the channel introduces equals the number of ones in e; the probability of any particular error vector decreases with the number of errors.

Figure 3: In a (3,1) repetition code, only 2 of the possible 83-bit data blocks are codewords. We can represent these bit patterns geometrically with the axes being bit positions in the data block. In the left plot, the filled circles represent the codewords [0 0 0] and [1 1 1], the only possible codewords. The unfilled ones correspond to the transmission. The center plot shows that the distance between codewords is 3. Because distance corredponds to flipping a bit, calculating the Hamming distance geometrically means following the axes rather than going "as the crow flies". The righr plot shows the datawords that result when one error occurs as the codeword goes through the channel. The three datawords are unit distance from the original codeword. Note that the received dataword groups do not overlap, which means the code can correct all single-bit errors.
Figure 3
Figure 3 (sys33.png)

To perform decoding when wrrors occur, we want to find the codeword (one of the filled circles in Fig.3) that has the highest probability of occurring: the one closest to the one received. Note that if a dataword lies a distance of 1 from two codewords , it is impossible to determine whic codeword was actually sent. This criterion means that if any two codewords two bits apart, then the code cannot correct the channel-induced error. Thus, to have a code that can correct all single-bit errors, codewords must have a minimum separation of three. Our repetition code has this property.

Does any error-correcting code reduce communication errors when introducing code bits increase the probability that bits will arrive in error? The answer is yes. To understand channel coding, we need to develop first a general framework for channel coding, and discover what it takes for a code to be maximally efficient: Correct as many errors as possible using the fewest error correction bits as possible (making the efficiency KNKN as large as possible.) We also nees a systematic way of finding the codeword closest to any received dataword. A much better code than our (3,1) repetition code is the following (7,4) code.

Figure 4
(7,4) Code Table
c1=b1 c2=b2 c3=b3 c4=b4 c5=b1b2b3 c6=b1b3b4 c6=b1b2b4 c 1 b 1 c 2 b 2 c 3 b 3 c 4 b 4 c 5 b 1 b 2 b 3 c 6 b 1 b 3 b 4 c 6 b 1 b 2 b 4
G=( 1000 0100 0010 0001 1110 0111 1101 ) G 1 0 0 0 0 1 0 0 0 0 1 0 0 0 0 1 1 1 1 0 0 1 1 1 1 1 0 1

In this (7,4) code, 24=16 24 16 of the 27=128 27 128 possible blocks at the channel decoder corredpond to error-free transmission and reception.

Error correction amounts to searching for the codeword cc closest to the received block cc in terms of the Hamming distance between the two. The error correction capability of a channel code is limited by how close together any two error-free blocks are. Bad codes would produce blocks close together, which would result in ambiguity when assigning a block of data bits to a received block. The quantity to examine, therefore, in designing code error correction codes is the minimum distance between codewords.

d min =mind c i c j           with           c i c j d min min d c i c j           with           c i c j
To have a channel code that can correct all single-bit errors, dmin 3 dmin 3 .

Exercise 2

Suppose we want a channel code to have an error-correction capability of nn bits. What must the minimum Hamming distance between codewords d min d min be?


d min =2n+1 d min 2 n 1

How do we calculate the minimum distance between codewords? Because we have 2K 2 K codewords, the number of possible unique pairs equals 2K1(2K1) 2 K 1 2 K 1 , which can be a large number. Recall that our channel coding procedure is linear, with c=Gb c G b . Therefore c i c j =G b i b j G c i c j G b i b j . Because b i b j b i b j always yields another block of data bits, we find that the difference between any two codewords is another codeword! Thus, to find d min d min we need only compute the number of ones that comprise all non-zero codewords. Finding these codewords is easy once we examine the coder's generator matrix. Note that the columns of GG are codewords (why is this?), and that all codewords can be found by all possible pairwise sums of the columns. To find d min d min , we need only count the number of bits in each column and sums of columns. For our example (7,4) ( 7 , 4 ) , GG's first column has three ones, the next one four, and the last two three. Considering sums of column pairs next, note theat because the upper portion of GG is an identity matrix, the corresponding upper portion of all column sums must habe exactly two bits. Because the bottom portion of each column differd from the other columns in at least one place, the bottom portion of a sum must have at least one bit. Triple sums will have at least three bits because the upper portion of GG being three. Thus, no sum of columns has fewer than three bits, meaning d min =3 d min 3 , and we have a channel coder that can correct all occurrences of one error within a received 77-bit block.

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