MATRIX METHOD OF RECEIVING THE FULL COMPOSITION OF THE GROUPS OF RELATIVITY OF BOOLEAN FUNCTIONS

Visnik Cherkas''kogo derzhavnogo tekhnologichnogo universitetu Pub Date : 2018-09-26 DOI:10.24025/2306-4412.3.2018.162695

S. Burmistrov, O. M. Panasco, D. Vakulenko

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Abstract

The article describes a matrix method for obtaining the full composition of the groups of relativ-ity of Boolean functions on the basis of a universal permutation matrix. This method makes it possible to obtain the full composition of the group of relativity on the basis of one Boolean function of its composition, the name of the group of relativity (the smallest binary number of Boolean function in the group), to construct the minimal form for any of Boolean functions of the group without the process of minimization if at least one function from the group of relativity is already minimized. The phenomenon of the groups of relativity in symbolic logic is due to the problem of numerology. It is due to the fact that all arguments of Boolean function are absolutely equal, but when constructing a truth table, columns must be put in a certain order. As a result, there are large groups of functions having the same properties, because they have the same internal structure. The advantage of group data is that they completely cover the full range of Boolean functions without overlapping one another. This makes it possible to significantly reduce the number of objects studied within the complete set L(n) of all Boolean functions f(n) by examining only one Boolean function from the whole group. The full composition of the group of relativity based on the truth table of the function can be formed by performing two equivalence operations – by rearranging columns of arguments in places or by replacing the arguments columns with their inverses, without changing in both cases the values in the column of the result. It is these actions that underlie the implementation of the method. To simplify the implementation of the method, recursive procedures are replaced by cyclic ones. This method is developed as a working tool for studying the relationships between the groups of relativity in terms of the decomposition of Boolean functions in order to find new effective methods of minimization.

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矩阵法接收了布尔函数相对性群的完整组成

本文描述了一种在通用置换矩阵的基础上获得布尔函数的关系群的完全组成的矩阵方法。该方法使得可以基于相对论组的组成的一个布尔函数、相对论组名称（该组中布尔函数的最小二进制数）、，如果来自相对论组的至少一个函数已经最小化，则在没有最小化过程的情况下构造该组的任何布尔函数的最小形式。符号逻辑中的相对群现象是由于命理学的问题。这是因为布尔函数的所有参数都是绝对相等的，但在构造真值表时，列必须按一定的顺序排列。因此，有大量具有相同属性的函数，因为它们具有相同的内部结构。分组数据的优点是，它们完全覆盖了布尔函数的全部范围，而不会相互重叠。这使得可以通过只检查整个组中的一个布尔函数来显著减少在所有布尔函数f（n）的全集L（n）内研究的对象的数量。基于函数真值表的相对论组的完整组成可以通过执行两个等价操作来形成——通过在适当的位置重新排列参数列，或者通过用它们的倒数替换参数列，而在这两种情况下都不改变结果列中的值。正是这些行动构成了该方法实施的基础。为了简化该方法的实现，递归过程被循环过程所取代。该方法被开发为一种工作工具，用于根据布尔函数的分解来研究相对论组之间的关系，以便找到新的有效的最小化方法。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Visnik Cherkas''kogo derzhavnogo tekhnologichnogo universitetu

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8 weeks