On a class of optimal constant weight ternary codes
Abstract
A weighing matrix W of order n=pm+1-1p-1 and weight pm is constructed and shown that the rows of W and -W form optimal constant weight ternary codes of length n, weight pm and minimum distance pm-1(p+32) for each odd prime power p and integer m 1 and thus A3(pm+1-1p-1,pm-1(p+32),pm)=2(pm+1-1p-1).
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