Plotkin bound

In the mathematics of coding theory, the Plotkin bound, named after Morris Plotkin, is a limit (or bound) on the maximum possible number of codewords in binary codes of given length n and given minimum distance d.

Statement of the bound

A code is considered "binary" if the codewords use symbols from the binary alphabet ${\displaystyle \{0,1\}}$ . In particular, if all codewords have a fixed length n, then the binary code has length n. Equivalently, in this case the codewords can be considered elements of vector space ${\displaystyle \mathbb {F} _{2}^{n}}$  over the finite field ${\displaystyle \mathbb {F} _{2}}$ . Let ${\displaystyle d}$  be the minimum distance of ${\displaystyle C}$ , i.e.

${\displaystyle d=\min _{x,y\in C,x\neq y}d(x,y)}$ 

where ${\displaystyle d(x,y)}$  is the Hamming distance between ${\displaystyle x}$  and ${\displaystyle y}$ . The expression ${\displaystyle A_{2}(n,d)}$  represents the maximum number of possible codewords in a binary code of length ${\displaystyle n}$  and minimum distance ${\displaystyle d}$ . The Plotkin bound places a limit on this expression.

Theorem (Plotkin bound):

i) If ${\displaystyle d}$  is even and ${\displaystyle 2d>n}$ , then

${\displaystyle A_{2}(n,d)\leq 2\left\lfloor {\frac {d}{2d-n}}\right\rfloor .}$ 

ii) If ${\displaystyle d}$  is odd and ${\displaystyle 2d+1>n}$ , then

${\displaystyle A_{2}(n,d)\leq 2\left\lfloor {\frac {d+1}{2d+1-n}}\right\rfloor .}$ 

iii) If ${\displaystyle d}$  is even, then

${\displaystyle A_{2}(2d,d)\leq 4d.}$ 

iv) If ${\displaystyle d}$  is odd, then

${\displaystyle A_{2}(2d+1,d)\leq 4d+4}$ 

where ${\displaystyle \left\lfloor ~\right\rfloor }$  denotes the floor function.

Proof of case i

Let ${\displaystyle d(x,y)}$  be the Hamming distance of ${\displaystyle x}$  and ${\displaystyle y}$ , and ${\displaystyle M}$  be the number of elements in ${\displaystyle C}$  (thus, ${\displaystyle M}$  is equal to ${\displaystyle A_{2}(n,d)}$ ). The bound is proved by bounding the quantity ${\displaystyle \sum _{(x,y)\in C^{2},x\neq y}d(x,y)}$  in two different ways.

On the one hand, there are ${\displaystyle M}$  choices for ${\displaystyle x}$  and for each such choice, there are ${\displaystyle M-1}$  choices for ${\displaystyle y}$ . Since by definition ${\displaystyle d(x,y)\geq d}$  for all ${\displaystyle x}$  and ${\displaystyle y}$  (${\displaystyle x\neq y}$ ), it follows that

${\displaystyle \sum _{(x,y)\in C^{2},x\neq y}d(x,y)\geq M(M-1)d.}$ 

On the other hand, let ${\displaystyle A}$  be an ${\displaystyle M\times n}$  matrix whose rows are the elements of ${\displaystyle C}$ . Let ${\displaystyle s_{i}}$  be the number of zeros contained in the ${\displaystyle i}$ 'th column of ${\displaystyle A}$ . This means that the ${\displaystyle i}$ 'th column contains ${\displaystyle M-s_{i}}$  ones. Each choice of a zero and a one in the same column contributes exactly ${\displaystyle 2}$  (because ${\displaystyle d(x,y)=d(y,x)}$ ) to the sum ${\displaystyle \sum _{(x,y)\in C,x\neq y}d(x,y)}$  and therefore

${\displaystyle \sum _{(x,y)\in C,x\neq y}d(x,y)=\sum _{i=1}^{n}2s_{i}(M-s_{i}).}$ 

The quantity on the right is maximized if and only if ${\displaystyle s_{i}=M/2}$  holds for all ${\displaystyle i}$  (at this point of the proof we ignore the fact, that the ${\displaystyle s_{i}}$  are integers), then

${\displaystyle \sum _{(x,y)\in C,x\neq y}d(x,y)\leq {\frac {1}{2}}nM^{2}.}$ 

Combining the upper and lower bounds for ${\displaystyle \sum _{(x,y)\in C,x\neq y}d(x,y)}$  that we have just derived,

${\displaystyle M(M-1)d\leq {\frac {1}{2}}nM^{2}}$ 

which given that ${\displaystyle 2d>n}$  is equivalent to

${\displaystyle M\leq {\frac {2d}{2d-n}}.}$ 

Since ${\displaystyle M}$  is even, it follows that

${\displaystyle M\leq 2\left\lfloor {\frac {d}{2d-n}}\right\rfloor .}$ 

This completes the proof of the bound.

See also

• Diamond code
• Elias Bassalygo bound
• Gilbert–Varshamov bound
• Griesmer bound
• Hamming bound
• Johnson bound
• Singleton bound

References

• Plotkin, Morris (1960). "Binary codes with specified minimum distance". IRE Transactions on Information Theory. 6 (4): 445–450. doi:10.1109/TIT.1960.1057584.