使用精确(0,1)计数器抽象对系统进行参数化验证

Paul Eichler, Swen Jacobs, Chana Weil-Kennedy
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引用次数: 0

摘要

我们引入了一个新框架,用于验证具有参数数量并发运行进程的系统。我们考虑的系统具有特定的良好准序结构。这使我们能够在无穷测试空间的固定有限抽象(称为 01 计数器系统)中决定更广泛的验证问题,包括控制状态可达性、覆盖性和目标。我们的研究表明,参数化验证文献中的几个系统都属于这一类,包括可重新配置的广播网络(或有损广播系统)、互不关联系统、同步系统和具有固定数量共享有限域变量的系统。我们的框架为这些系统的特性提供了一个简单而统一的解释,迄今为止,人们一直在对这些系统进行单独研究。此外,它还扩展和改进了一系列现有结果,并产生了具有类似性质的其他系统。
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Parameterized Verification of Systems with Precise (0,1)-Counter Abstraction
We introduce a new framework for verifying systems with a parametric number of concurrently running processes. The systems we consider are well-structured with respect to a specific well-quasi order. This allows us to decide a wide range of verification problems, including control-state reachability, coverability, and target, in a fixed finite abstraction of the infinite state-space, called a 01-counter system. We show that several systems from the parameterized verification literature fall into this class, including reconfigurable broadcast networks (or systems with lossy broadcast), disjunctive systems, synchronizations and systems with a fixed number of shared finite-domain variables. Our framework provides a simple and unified explanation for the properties of these systems, which have so far been investigated separately. Additionally, it extends and improves on a range of the existing results, and gives rise to other systems with similar properties.
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