T ~ n完成的最大和最小工作

Modern Applied Science Pub Date : 2022-04-22 DOI:10.5539/mas.v16n2p23

Pokalas P. Tal, M. S. Mahmud, M. A. Mbah, R. Ndubuisi

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引用次数: 0

摘要

设Xn和X*n为有限集{1,2,3，…，n}和{±1，±2，±3，…,分别±n}。如果α: Xn→X*n设Tn和T ~ n分别是Xn上的满变换和有符号满变换的集合，则称α为有符号变换。由变换α完成的功w(α)被定义为每个i λ dom(α)的所有距离|i-i - α|的和。在本文中，我们给出了所有α λ Tn的w(α)值的范围。进一步，我们描述了T ~ n中获得最小和最大功的元素，并提供了这些最小和最大值的值的公式。

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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Maximum and Minimum Works Performed by T˜n

Let Xn and X*n be the finite sets {1,2,3,...,n} and {±1,±2,±3,..,±n} respectively. A map α: Xn→Xn is called a transformation on Xn We call α a signed transformation if α: Xn→X*n Let Tn and T˜n be the sets of full and signed full transformations on Xn respectively. The work, w(α) performed by a transformation α is defined as the sum of all the distances |i-iα| for each i ϵ dom(α) In this paper, we present a range for the values of w(α) for all α ϵ Tn. Further, we characterize elements of T˜n that attain minimum and maximum works and provide formulas for the values of these minimum and maximum.

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Modern Applied Science

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