一种新的(OP)多项式构造方法及有理模糊含义

Maria N. Rapti, Basil K. Papadopoulos
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摘要

在本文中,我们开发了具有特定条件的新构造方法。第一种方法是利用n个模糊含义对凸组合进行泛化。第二种方法是在排序性质(OP)模糊蕴涵形式中对Lukasiewicz蕴涵进行参数化。本文的创新之处在于提出了三种新的构造(OP)多项式和(OP)有理模糊蕴涵的方法。研究了排序性质(OP)和排序性质(OP)的一些族的理性模糊含义。对于这些方法,给出了满足序性(OP)、单位性(IP)和对正对称性(CP)等基本性质的系数条件。模糊蕴涵函数是模糊逻辑的主要运算之一。他们将经典蕴涵(取集合{0,1}中的值)推广到模糊逻辑,其中真值属于单位区间[0,1]。在过去的30年里,这类手术的研究从理论和应用的角度都得到了广泛的发展。本文提出了五种构造具有特定性质的模糊含义的新方法。本文首先提出了第一个模糊蕴涵构造机,它使用n个具有特定条件的模糊蕴涵。接下来,我们将Lukasiewicz蕴涵参数化,并创建新的(OP)多项式和(OP)有理蕴涵族。对于每种方法,我们研究了哪些条件是满足的,并给出了一些例子。第一个构造的方法在线性积表示中使用n个模糊含义。第二种方法是(OP)多项式蕴涵,即参数化Lukasiewicz蕴涵。第三种方法是具有五个参数的理性暗示。在第四种方法中,我们通过增加函数来改变变量x和y,给出了前一种方法的一般形式。最后,最后一种方法是带有三个参数的另一种(OP)理性暗示。在每种方法中,我们都给出了满足的属性。我们通过用单调函数代替变量或在变量上加幂来推广(OP)多项式和有理。最后,我们对新产生的模糊含义进行了概括和举例。作为未来的工作,我们可以通过改变分子和分母的多项式来创建新的有理蕴涵族,使它们满足更多的性质。最后,在一定条件下,我们提出的新方法可以用于构造一致形和联形。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
A Novel Construction Method of (OP) Polynomial and Rational Fuzzy Implications
In this article, we develop new constructed methods with specific conditions. The first method is a generalization of convex combination using n fuzzy implications. The second method is a parameterization of Lukasiewicz implication in an Ordering Property (OP) fuzzy implication form. The innovation in this work is the presentation of three new constructed methods of (OP) polynomial and (OP) rational fuzzy implications. We investigate some families of Ordering Property (OP) and Ordering Property (OP) Rational fuzzy implications. To these methods, we give some coefficient conditions in order to satisfy basic properties like ordering property (OP), identity property (IP) and contrapositive symmetry (CP). Fuzzy implication functions are one of the main operations in fuzzy logic. They generalize the classical implication, which takes values in the set {0,1}, to fuzzy logic, where the truth values belong to the unit interval [0,1]. The study of this class of operations has been extensively developed in the literature in the last 30 years from both theoretical and applicational points of view. In this paper, we develop five new methods for constructing fuzzy implications with specific properties. The paper starts by presenting the first fuzzy implication construction machine that uses n fuzzy implications with specific conditions. Next, we parameterize Lukasiewicz implication and create new families of (OP) polynomial and (OP) rational implications. For each method we investigate which conditions are satisfied and we give some examples. The first constructed method uses n fuzzy implications in a linear product representation. The second method is an (OP) polynomial implication a parameterized Lukasiewicz implication. The third method is a rational implication with five parameters. In the fourth method we give a general form in the previous method by changing variables x and y with increasing functions. Finally, the last method is another (OP) rational implication with three parameters. In each method we present the properties that are satisfied. We generalize the (OP) polynomial and rational by replacing the variables with monotonic functions or add powers on them. Finally, we generalize and we give examples of new produced fuzzy implications. As a future work, we can create new families of rational implications by changing the polynomials of the numerator and denominator so that they satisfy more properties. Finally, the new methods we presented can contribute in the construction of uninorms and copulas under certain conditions.
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