The
Shannon-Hartley law states that for a communication channel with bandwidth W, and a signal to noise ratio S/N, that the channel capacity C is expressed by the equation
- C = W log _{2} (1 + S/N)
where S/N is a pure ratio (i.e not expressed using the decibel scale).
Examples:
- If the SNR is 20 dB, and the bandwidth available is 4kHz, which is appropriate for telephone communications, then C = 4 log _{2} (1 + 100) = 4 log _{2} (101) = 26.63kbps. Note that the value of 100 is appropriate for an SNR of 20 dB.
- If it is required to transmit at 50 kbps, and a bandwidth of 1 MHz is used, then the minimum SNR required is given by 50=1000 log _{2}(1+S/N) so S/N = 2^{C/W} -1 = 0.035 corresponding to an SNR of -14.5dB. This shows that in some sense it may be possible to transmit using signals below the noise level, using wide bandwidth communication, as in spread spectrum communications.
The law is named after Claude Shannon and Ralph Hartley.
See also Shannon's theorem
All Wikipedia text
is available under the
terms of the GNU Free Documentation License