Abstract :
For a bandwidth-limited, power-limited communication channel corrupted by additive white Gaussian noise, Shannon (1949) showed that, at any information rate below the channel capacity, an arbitrarily low error probability can be obtained when the transmitted signal is selected from a set a of M independent, white-Gaussian-noise-like waveforms having the prescribed power and bandwidth. He utilized a space whose points represent transmitted or received signals. Since for each possible received signal there is a most likely transmitted signal, this space is divided into decision regions {Rt}, one associated with each member st (i=1, 2,..., M) of set st This article investigates some of the geometrical properties of these decision regions: their shape, size and number of faces, distances from st to Rt´s nearest face or edges of various sorts, etc., thus providing insight into how random coding succeeds in achieving arbitrarily good performance
Keywords :
AWGN; bandlimited communication; channel capacity; error statistics; random codes; random processes; AWGN; Shannon; additive white Gaussian noise; bandwidth-limited channel; channel capacity; decision regions; geometric properties; geometrical properties; information rate; low error probability; maximum-likelihood decision regions; power-limited communication channel; random coding; random signals; received signal; transmitted signal; white-Gaussian-noise-like waveforms; Additive white noise; Bandwidth; Channel capacity; Communication channels; Error probability; Geometry; Information rates; Multidimensional systems; Shape; Space exploration;
