Rooted Divergence-Preserving Branching Bisimilarity is a Congruence for Guarded CCS

IF 1.4 4区 计算机科学 Q3 COMPUTER SCIENCE, SOFTWARE ENGINEERING
Quan Sun, David N. Jansen, Xinxin Liu, Wei Zhang
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引用次数: 0

Abstract

Branching bisimilarity is a well-known equivalence relation for labelled transition systems. Based on this equivalence relation, with an additional simple rootedness condition, a congruence relation for CCS processes can be obtained. However, neither branching bisimilarity nor the corresponding congruence relation preserves divergence, and it is still a question whether, based on a divergence-preserving variant of branching bisimilarity, a divergence-preserving congruence relation for CCS processes can be obtained by introducing the same simple rootedness condition. In this paper we present a partial solution by showing that rooted divergence-preserving branching bisimilarity is preserved under the usual CCS operators including prefixing, summation, parallel composition, relabelling, restriction, and (weakly) guarded recursion.
根发散-保持分支双相似是一种有保护的CCS的同余
分支双相似性是已知的标记跃迁系统的等价关系。在此等价关系的基础上,加上一个简单的根条件,可以得到CCS过程的同余关系。然而,分支双相似度和相应的同余关系都不保持散度,并且能否基于分支双相似度的一个保持散度的变体,通过引入相同的简单根条件得到CCS过程的保持散度的同余关系仍然是一个问题。本文给出了在前缀、求和、并行组合、重标记、限制和(弱)保护递归等常用的CCS算子下,保持根发散的分支双相似性的部分解。
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来源期刊
Formal Aspects of Computing
Formal Aspects of Computing 工程技术-计算机:软件工程
CiteScore
3.30
自引率
0.00%
发文量
17
审稿时长
>12 weeks
期刊介绍: This journal aims to publish contributions at the junction of theory and practice. The objective is to disseminate applicable research. Thus new theoretical contributions are welcome where they are motivated by potential application; applications of existing formalisms are of interest if they show something novel about the approach or application. In particular, the scope of Formal Aspects of Computing includes: well-founded notations for the description of systems; verifiable design methods; elucidation of fundamental computational concepts; approaches to fault-tolerant design; theorem-proving support; state-exploration tools; formal underpinning of widely used notations and methods; formal approaches to requirements analysis.
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