LTL Path Checking Is Efficiently Parallelizable

Kuhtz, Lars; Finkbeiner, Bernd

doi:10.1007/978-3-642-02930-1_20

Cited by 22 publications

(27 citation statements)

References 20 publications

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“…Solutions to these research efforts exist (see for instance [66,85,106,149,152,220,221]). We refer to [164] for a recent survey on this topic.…”

Section: Distributed and Decentralized Runtime Verificationmentioning

confidence: 99%

“…Impact of utility on monitoring complexity. The existing work on the complexity of monitoring [85,152,220] (called path checking in this context) only considers the problem of providing a single Boolean verdict in an offline manner. Tight complexity bounds for the online monitoring problem or other variants of the problem with different output utility (e.g., a verdict stream) have not yet been established.…”

Section: Challengesmentioning

confidence: 99%

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A survey of challenges for runtime verification from advanced application domains (beyond software)

Sánchez

Schneider

Ahrendt

et al. 2019

Form Methods Syst Des

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Runtime verification is an area of formal methods that studies the dynamic analysis of execution traces against formal specifications. Typically, the two main activities in runtime verification efforts are the process of creating monitors from specifications, and the algorithms for the evaluation of traces against the generated monitors. Other activities involve the instrumentation of the system to generate the trace and the communication between the system under analysis and the monitor.Most of the applications in runtime verification have been focused on the dynamic analysis of software, even though there are many more potential applications to other computational devices and target systems. In this paper we present a collection of challenges for runtime verification extracted from concrete application domains, focusing on the difficulties that must be overcome to tackle these specific challenges. The computational models that characterize these domains require to devise new techniques beyond the current state of the art in runtime verification.

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“…Solutions to these research efforts exist (see for instance [66,85,106,149,152,220,221]). We refer to [164] for a recent survey on this topic.…”

Section: Distributed and Decentralized Runtime Verificationmentioning

confidence: 99%

Section: Challengesmentioning

confidence: 99%

A survey of challenges for runtime verification from advanced application domains (beyond software)

Sánchez

Schneider

Ahrendt

et al. 2019

Form Methods Syst Des

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“…For LTL and periodic words without data values, it was shown in [21] that the pathchecking problem can be solved using an efficient parallel algorithm. More precisely, the problem belongs to AC 1 (LogDCFL), a subclass of NC.…”

Section: Satisfiabilitymentioning

confidence: 99%

“…By Theorem 3.6 in [24], infinite path checking for LTL can be reduced in logspace to finite path checking for LTL. Finite path checking for LTL is in AC 1 (LogDCFL) ⊆ P [21]. Proof.…”

Section: By Lemmas 43 and 45 For Every Hmentioning

confidence: 99%

Path Checking for MTL and TPTL over Data Words

Feng

Lohrey

Quaas

2015

Developments in Language Theory

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Metric temporal logic (MTL) and timed propositional temporal logic (TPTL) are quantitative extensions of linear temporal logic, which are prominent and widely used in the verification of real-timed systems. It was recently shown that the path-checking problem for MTL, when evaluated over finite timed words, is in the parallel complexity class NC. In this paper, we derive precise complexity results for the path-checking problem for MTL and TPTL when evaluated over infinite data words over the non-negative integers. Such words may be seen as the behaviours of one-counter machines. For this setting, we give a complete analysis of the complexity of the path-checking problem depending on the number of register variables and the encoding of constraint numbers (unary or binary). As the two main results, we prove that the path-checking problem for MTL is P-complete, whereas the path-checking problem for TPTL is PSPACE-complete. The results yield the precise complexity of model checking deterministic one-counter machines against formulas of MTL and TPTL.

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“…Kuhtz and Finkbeiner showed in 2009 that LTL path checking belongs to the complexity class AC 1 (logDCFL) [29]; this result entails that the process can be efficiently split by evaluating entire blocks of events in parallel. Rather than sequentially traversing the trace, their work considers the circuit that results from "unrolling" the formula over the trace.…”

Section: Ltl Trace Validation With Mapreducementioning

confidence: 99%

MapReduce for parallel trace validation of LTL properties

Hallé

Soucy-Boivin

2015

J Cloud Comp

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We present an algorithm for the automated verification of Linear Temporal Logic formulae on event traces using an increasingly popular cloud computing framework called MapReduce. The algorithm can process multiple, arbitrary fragments of the trace in parallel, and compute its final result through a cycle of runs of MapReduce instances. Experimentation on a variety of cloud-based MapReduce frameworks, including Apache Hadoop, show how complex LTL properties can be validated in reasonable time in a completely distributed fashion. Compared to the classical LTL evaluation algorithm, results show how the use of a MapReduce framework can provide an interesting alternative to existing trace analysis techniques, performance-wise, under favourable conditions.

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LTL Path Checking Is Efficiently Parallelizable

Cited by 22 publications

References 20 publications

A survey of challenges for runtime verification from advanced application domains (beyond software)

A survey of challenges for runtime verification from advanced application domains (beyond software)

Path Checking for MTL and TPTL over Data Words

MapReduce for parallel trace validation of LTL properties

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