We present an efficient algorithm for computing the minimal trellis for a group code over a finite abelian group, given a generator matrix for the code. We also show how to compute a succinct representation of the minimal trellis for such a code, and present algorithms that use this information to compute efficiently local descriptions of the minimal trellis. This extends the work of Kschischang and Sorokine (see ibid., vol.41, no.6, p.1926-37, 1995), who treated the case of linear codes over fields. An important application of our algorithms is to the construction of minimal trellises for lattices. A key step in our work is handling codes over cyclic groups C/sub p//spl alpha/, where p is a prime. Such a code can be viewed as a module over the ring Z/sub p//spl alpha/. Because of the presence of zero divisors in the ring, modules do not share the useful properties of vector spaces. We get around this difficulty by restricting the notion of linear combination to a p-linear combination, and by introducing the notion of a p-generator sequence, which enjoys properties similar to those of a generator matrix for a vector space.
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机译:给定代码的生成矩阵,我们提出了一种有效的算法,用于计算有限阿贝尔群上组码的最小网格。我们还展示了如何为此类代码计算最小网格的简洁表示,并展示了使用此信息来高效计算最小网格的本地描述的算法。这扩展了Kschischang和Sorokine的工作(同上,第41卷,第6期,p.1926-37,1995年),他们处理了场上线性编码的情况。我们的算法的一个重要应用是构造格子的最小格子。我们工作的关键步骤是处理循环组C / sub p // spl alpha /上的代码,其中p是质数。这样的代码可以看作是环Z / sub p // spl alpha /上的模块。由于环中存在零除数,因此模块不共享矢量空间的有用属性。通过将线性组合的概念限制为p线性组合,并引入p生成器序列的概念来解决此难题,p生成器序列的性质类似于矢量空间的生成器矩阵的性质。
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