Codes for High Speed Arithmetic and Burst Correction.
ILLINOIS UNIV URBANA COORDINATED SCIENCE LAB
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An analytic technique for analyzing the burst-error correcting and detecting capabilities of codes with a generator factor x sup p - 1x sup q - 1 have been developed. The Gilbert algebraic code and Gilbert AN code have been shown to have near optimal burst-error correcting and detecting capabilities. Several examples have been shown using this technique to investigate codes with any generator polynomial. Three kinds of errors which occur very often in high speed arithmetic have been analyzed. Three classes of arithmetic codes have been constructed to correct those three kinds of errors. Those codes have very simple encoding circuits, hence they are highly feasible for implementation. Author