# Accumulator Error Feedback

### From Wikimization

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[http://www.convexoptimization.com/TOOLS/Kahan.pdf Further Remarks on Reducing Truncation Errors, William Kahan, 1964] | [http://www.convexoptimization.com/TOOLS/Kahan.pdf Further Remarks on Reducing Truncation Errors, William Kahan, 1964] | ||

- | For multiplier error feedback, see: | + | For fixed-point multiplier error feedback, see: |

[http://ccrma.stanford.edu/~dattorro/HiFi.pdf Implementation of Recursive Digital Filters for High-Fidelity Audio] | [http://ccrma.stanford.edu/~dattorro/HiFi.pdf Implementation of Recursive Digital Filters for High-Fidelity Audio] | ||

[http://ccrma.stanford.edu/~dattorro/CorrectionsHiFi.pdf Comments on Implementation of Recursive Digital Filters for High-Fidelity Audio] | [http://ccrma.stanford.edu/~dattorro/CorrectionsHiFi.pdf Comments on Implementation of Recursive Digital Filters for High-Fidelity Audio] |

## Revision as of 21:02, 29 January 2018

function s_hat = csum(x) % CSUM Sum of elements using a compensated summation algorithm. % % This Matlab code implements % Kahan's compensated summation algorithm (1964) % which takes about twice as long as sum() but % produces more accurate sums when number of elements is large. % -David Gleich % % Also see SUM. % % Example: % clear all; clc % csumv=0; rsumv=0; % n = 100e6; % t = ones(n,1); % while csumv <= rsumv % v = randn(n,1); % % rsumv = abs((t'*v - t'*v(end:-1:1))/sum(v)); % disp(['rsumv = ' num2str(rsumv,'%1.16f')]); % % csumv = abs((csum(v) - csum(v(end:-1:1)))/sum(v)); % disp(['csumv = ' num2str(csumv,'%1.16e')]); % end s_hat=0; e=0; for i=1:numel(x) s_hat_old = s_hat; y = x(i) + e; s_hat = s_hat_old + y; e = y - (s_hat - s_hat_old); end return

### sorting

Compensated sum accuracy is quite data dependent. Substituting a unit sine wave at arbitrary frequency, instead of a random number sequence input, can make compensated summation fail to produce more accurate results than a simple sum.

In practice, input sorting can sometimes achieve more accurate summation. Sorting became integral to later algorithms, such as those from Knuth and Priest. But the very same accuracy dependence on input data prevails.

### links

Accuracy and Stability of Numerical Algorithms 2e, ch.4.3, Nicholas J. Higham, 2002

Further Remarks on Reducing Truncation Errors, William Kahan, 1964

For fixed-point multiplier error feedback, see:

Implementation of Recursive Digital Filters for High-Fidelity Audio

Comments on Implementation of Recursive Digital Filters for High-Fidelity Audio