Contents

Compute Quantization Error

This example shows how to compute and compare the statistics of the signal quantization error when using various rounding methods.

First, a random signal is created that spans the range of the quantizer.

Next, the signal is quantized, respectively, with rounding methods 'fix', 'floor', 'ceil', 'nearest', and 'convergent', and the statistics of the signal are estimated.

The theoretical probability density function of the quantization error will be computed with ERRPDF, the theoretical mean of the quantization error will be computed with ERRMEAN, and the theoretical variance of the quantization error will be computed with ERRVAR.

Uniformly Distributed Random Signal

First we create a uniformly distributed random signal that spans the domain -1 to 1 of the fixed-point quantizers that we will look at.

q = quantizer([8 7]);
r = realmax(q);
u = r*(2*rand(50000,1) - 1);        % Uniformly distributed (-1,1)
xi=linspace(-2*eps(q),2*eps(q),256);

Fix: Round Towards Zero.

Notice that with 'fix' rounding, the probability density function is twice as wide as the others. For this reason, the variance is four times that of the others.

q = quantizer('fix',[8 7]);
err = quantize(q,u) - u;
f_t = errpdf(q,xi);
mu_t = errmean(q);
v_t  = errvar(q);
% Theoretical variance = eps(q)^2 / 3
% Theoretical mean     = 0
fidemo.qerrordemoplot(q,f_t,xi,mu_t,v_t,err)
Estimated   error variance (dB) = -46.8586
Theoretical error variance (dB) = -46.9154
Estimated   mean = 7.788e-06
Theoretical mean = 0

Floor: Round Towards Minus Infinity.

Floor rounding is often called truncation when used with integers and fixed-point numbers that are represented in two's complement. It is the most common rounding mode of DSP processors because it requires no hardware to implement. Floor does not produce quantized values that are as close to the true values as ROUND will, but it has the same variance, and small signals that vary in sign will be detected, whereas in ROUND they will be lost.

q = quantizer('floor',[8 7]);
err = quantize(q,u) - u;
f_t = errpdf(q,xi);
mu_t = errmean(q);
v_t  = errvar(q);
% Theoretical variance =  eps(q)^2 / 12
% Theoretical mean     = -eps(q)/2
fidemo.qerrordemoplot(q,f_t,xi,mu_t,v_t,err)
Estimated   error variance (dB) = -52.9148
Theoretical error variance (dB) = -52.936
Estimated   mean = -0.0038956
Theoretical mean = -0.0039062

Ceil: Round Towards Plus Infinity.

q = quantizer('ceil',[8 7]);
err = quantize(q,u) - u;
f_t = errpdf(q,xi);
mu_t = errmean(q);
v_t  = errvar(q);
% Theoretical variance = eps(q)^2 / 12
% Theoretical mean     = eps(q)/2
fidemo.qerrordemoplot(q,f_t,xi,mu_t,v_t,err)
Estimated   error variance (dB) = -52.9148
Theoretical error variance (dB) = -52.936
Estimated   mean = 0.0039169
Theoretical mean = 0.0039062

Round: Round to Nearest. In a Tie, Round to Largest Magnitude.

Round is more accurate than floor, but all values smaller than eps(q) get rounded to zero and so are lost.

q = quantizer('nearest',[8 7]);
err = quantize(q,u) - u;
f_t = errpdf(q,xi);
mu_t = errmean(q);
v_t  = errvar(q);
% Theoretical variance = eps(q)^2 / 12
% Theoretical mean     = 0
fidemo.qerrordemoplot(q,f_t,xi,mu_t,v_t,err)
Estimated   error variance (dB) = -52.9579
Theoretical error variance (dB) = -52.936
Estimated   mean = -2.212e-06
Theoretical mean = 0

Convergent: Round to Nearest. In a Tie, Round to Even.

Convergent rounding eliminates the bias introduced by ordinary "round" caused by always rounding the tie in the same direction.

q = quantizer('convergent',[8 7]);
err = quantize(q,u) - u;
f_t = errpdf(q,xi);
mu_t = errmean(q);
v_t  = errvar(q);
% Theoretical variance = eps(q)^2 / 12
% Theoretical mean     = 0
fidemo.qerrordemoplot(q,f_t,xi,mu_t,v_t,err)
Estimated   error variance (dB) = -52.9579
Theoretical error variance (dB) = -52.936
Estimated   mean = -2.212e-06
Theoretical mean = 0

Comparison of Nearest vs. Convergent

The error probability density function for convergent rounding is difficult to distinguish from that of round-to-nearest by looking at the plot.

The error p.d.f. of convergent is

f(err) = 1/eps(q),  for -eps(q)/2 <= err <= eps(q)/2, and 0 otherwise

while the error p.d.f. of round is

f(err) = 1/eps(q),  for -eps(q)/2 <  err <= eps(q)/2, and 0 otherwise

Note that the error p.d.f. of convergent is symmetric, while round is slightly biased towards the positive.

The only difference is the direction of rounding in a tie.

x=[-3.5:3.5]';
[x convergent(x) nearest(x)]
ans =

   -3.5000   -4.0000   -3.0000
   -2.5000   -2.0000   -2.0000
   -1.5000   -2.0000   -1.0000
   -0.5000         0         0
    0.5000         0    1.0000
    1.5000    2.0000    2.0000
    2.5000    2.0000    3.0000
    3.5000    4.0000    4.0000

Plot Helper Function

The helper function that was used to generate the plots in this example is listed below.

type(fullfile(matlabroot,'toolbox','fixedpoint','fidemos','+fidemo','qerrordemoplot.m'))
function qerrordemoplot(q,f_t,xi,mu_t,v_t,err)
%QERRORDEMOPLOT  Plot function for QERRORDEMO.
%    QERRORDEMOPLOT(Q,F_T,XI,MU_T,V_T,ERR) produces the plot and display used by
%    the example function QERRORDEMO, where Q is the quantizer whos attributes are
%    being analyzed; F_T is the theoretical quantization error probability
%    density function for quantizer Q computed by ERRPDF; XI is the domain of
%    values being evaluated by ERRPDF; MU_T is the theoretical quantization
%    error mean of quantizer Q computed by ERRMEAN; V_T is the theoretical
%    quantization error variance of quantizer Q computed by ERRVAR; and ERR
%    is the error generated by quantizing a random signal by quantizer Q.
%
%    See QERRORDEMO for examples of use.

%    Copyright 1999-2012 The MathWorks, Inc.

v=10*log10(var(err));
disp(['Estimated   error variance (dB) = ',num2str(v)]);
disp(['Theoretical error variance (dB) = ',num2str(10*log10(v_t))]);
disp(['Estimated   mean = ',num2str(mean(err))]);
disp(['Theoretical mean = ',num2str(mu_t)]);
[n,c]=hist(err);
figure(gcf)
bar(c,n/(length(err)*(c(2)-c(1))),'hist');
line(xi,f_t,'linewidth',2,'color','r');
% Set the ylim uniformly on all plots
set(gca,'ylim',[0 max(errpdf(quantizer(q.format,'nearest'),xi)*1.1)])
legend('Estimated','Theoretical')
xlabel('err'); ylabel('errpdf')
Was this topic helpful?