Double circulant quadratic residue codes
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We give a lower bound for the minimum distance of double circulant binary quadratic residue codes for primes p/spl equiv//spl plusmn/3(mod8). This bound improves on the square root bound obtained by Calderbank and Beenker, using a completely different technique. The key to our estimates is to apply a result by Helleseth, to which we give a new and shorter proof. Combining this result with the Weil bound leads to the improvement of the Calderbank and Beenker bound. For large primes p, their bound is of order /spl radic/(2p) while our new improved bound is of order 2/spl radic/p. The results can be extended to any prime power q and the modifications of the proofs are briefly indicated.
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