On the MacWilliams identities for linear codes

For a linear code over GF (q) we consider two kinds of ''subcodes'' called residuals and punctures. When does the collection of residuals or punctures determine the isomorphism class of the code? We call such a code residually or puncture reconstructible. We investigate these notions of reconstructi

Symposium on Inform. Theory, Whistler, Canada,'' pp. 345) proved that every [n, k, d] O code with gcd(d, q)"1 and with all weights congruent to 0 or d (modulo q) is extendable to an O code with all weights congruent to 0 or d#1 (modulo q). We give another elementary geometrical proof of this theor

The weight distribution is an indispensable parameter in the performance evaluation of a code because of its importance in the analysis of the codes characteristics. Since the amount of computation needed to determine the overall weight distribution of a code usually depends on the number of data po

We construct a canonical generating set for the polynomial invariants of the simultaneous diagonal action (of arbitrary number of l factors) of the two-dimensional finite unitary reflection group G of order 192, which is called the group No. 9 in the list of Shephard and Todd, and is also called the