Title :
Polar coordinate quantizers that minimize mean-squared error
Author :
Voran, Stephen D. ; Scharf, Louis L.
Author_Institution :
Dept. of Electr. & Comput. Eng., Colorado Univ., Boulder, CO, USA
fDate :
6/1/1994 12:00:00 AM
Abstract :
A quantizer for complex data is defined by a partition of the complex plane and a representation point associated with each cell of the partition. A polar coordinate quantizer independently quantizes the magnitude and phase angle of complex data. The authors derive design equations for minimum mean-squared error polar coordinate quantizers and report some interesting theoretical results on their performance, including performance limits for “ phase-only” representations. The results provide a concrete example of a biased estimator whose mean-squared error is smaller than that of any unbiased estimator. Quantizer design examples show the relative importance of magnitude and phase encoding
Keywords :
analogue-digital conversion; approximation theory; encoding; biased estimator; complex plane partition; design equations; magnitude encoding; minimum mean-squared error; performance limits; phase angle; phase encoding; phase-only representations; polar coordinate quantizers; representation point; Baseband; Concrete; Density functional theory; Encoding; Equations; Frequency; Nearest neighbor searches; Quantization; Sampling methods; Sufficient conditions;
Journal_Title :
Signal Processing, IEEE Transactions on
