Ranks of functions specified by minimal reaction systems and induced by images of singletons

IF 1.7 4区 计算机科学 Q3 COMPUTER SCIENCE, ARTIFICIAL INTELLIGENCE
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引用次数: 0

Abstract

This paper studies mathematical properties of reaction systems, which is a formal model introduced by Ehrenfeucht and Rozenberg and inspired by biochemical reactions that occur in living cells. Numerous studies have focused on reaction system ranks of functions specified by minimal reaction systems, where the rank refers to the smallest size among the specifying reaction systems. We particularly study the reaction system ranks for a class of union-additive functions specified by minimal reaction systems introduced by Salomaa, which is closed under taking composition. More precisely, when the signature size is two, we obtain a general formula for the reaction system ranks that shows the reaction system rank of each function from this subclass depends on the characteristic of the function. Then, we study the reaction system ranks of such functions with signature size three, as well as establishing a general upper bound for reaction system ranks of such functions with one-to-one signatures for any background set.

由最小反应系统指定并由单子图像诱导的函数秩
摘要 本文研究反应系统的数学性质。反应系统是艾伦福赫特和罗森伯格提出的一种形式模型,其灵感来自活细胞中发生的生化反应。许多研究都集中在最小反应系统指定函数的反应系统等级上,其中等级指的是指定反应系统中最小的大小。我们特别研究了萨洛玛(Salomaa)提出的一类由最小反应系统指定的联合-相加函数的反应系统秩,该类函数在取组成条件下是封闭的。更确切地说,当签名大小为 2 时,我们得到了反应系统秩的一般公式,表明该子类中每个函数的反应系统秩取决于函数的特征。然后,我们研究了签名大小为三的此类函数的反应系统秩,并为任何背景集的一一对应签名的此类函数的反应系统秩建立了一般上界。
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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来源期刊
Natural Computing
Natural Computing Computer Science-Computer Science Applications
CiteScore
4.40
自引率
4.80%
发文量
49
审稿时长
3 months
期刊介绍: The journal is soliciting papers on all aspects of natural computing. Because of the interdisciplinary character of the journal a special effort will be made to solicit survey, review, and tutorial papers which would make research trends in a given subarea more accessible to the broad audience of the journal.
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