Title :
Error analysis of approximate Chinese-remainder-theorem decoding
Author :
Hung, Ching Yu ; Parhami, Behrooz
Author_Institution :
Integrated Syst. Lab., Texas Instrum. Inc., Dallas, TX, USA
fDate :
11/1/1995 12:00:00 AM
Abstract :
Approximate Chinese-remainder-theorem decoding of residue numbers is a useful operation in residue arithmetic. The decoding yields an approximation to (X mod M)M, in the range [0, 1), where X is the input number and M is the product of all moduli. We show the error distribution and worst-case errors for both the truncation and rounding versions of the approximate decoding procedure. We also prove that, contrary to some published accounts, limiting the dynamic range is ineffective in reducing the maximal error
Keywords :
error analysis; residue number systems; RNS representation; approximate Chinese-remainder-theorem decoding; computer arithmetic; error distribution; residue arithmetic; residue numbers; rounding version; scaled decoding; truncation version; worst-case errors; Arithmetic; Cathode ray tubes; Computer errors; Computer networks; Decoding; Dynamic range; Error analysis; Hypercubes; Routing; Table lookup;
Journal_Title :
Computers, IEEE Transactions on
