有限非阿贝尔群谱表示在正则性设计中的适用性

R. Stankovic, J. Astola, C. Moraga
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引用次数: 2

摘要

在一些出版物中,已建议使用非阿贝尔群作为推导逻辑函数的紧表示的方法。在函数表达式的情况下,用乘积项的数量来衡量紧密性,在决策图的情况下,用节点的数量、宽度和互连来衡量紧密性。本文讨论了有限非阿贝尔群在正则性综合中的傅里叶表示。通过对变量进行编码,将逻辑函数(二进制或多值)的初始域组替换为非阿贝尔群。然后将函数分解为矩阵值傅立叶系数,这些系数易于在具有规则结构的技术平台上作为构建块实现。指出非阿贝尔群的谱表示能够捕捉函数中的规律并在谱域内进行传递。在许多情况下,由于傅里叶表达式所基于的幺正不可约群表示的规则结构,原始域的弱规律在谱域转化为更强的规律。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Remarks on Applicability of Spectral Representations on Finite Non-Abelian Groups in the Design for Regularity
In several publications, the use of non-Abelian groups has been suggested as a method to derive compact representations of logic functions. The compactness has been measured in the number of product terms in the case of functional expressions and the number of nodes, the width, and the interconnections in the case of decision diagrams. In this paper, we discuss Fourier representations on finite non-Abelian groups in synthesis for regularity. The initial domain group for a logic function (binary or multiple-valued) is replaced by a non-Abelian group by encoding of variables. The function is then decomposed into matrix-valued Fourier coefficients, that are easy to implement as building blocks over a technological platform with regular structure. We point out that spectral representation of non-Abelian groups is capable of capturing regularities in functions and transferring them in the spectral domain. In many cases, weak regularities in the original domain are converted into much stronger regularities in the spectral domain due to the regular structure of unitary irreducible group representations upon which the Fourier expressions are based.
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