Multiphase-Linear Ranking Functions and Their Relation to Recurrent Sets

Ben-Amram, Amir M.; Doménech, Jesús J.; Genaim, Samir

doi:10.1007/978-3-030-32304-2_22

Cited by 29 publications

(37 citation statements)

References 42 publications

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“…We also tested with our tool AProVE [22], but excluded it as it uses a similar approach like T2, but finds fewer non-termination proofs. The remaining participants of the respective category of TermComp, Ctrl [29] and iRankFinder [2,16], cannot prove non-termination. 7 We used the TermComp '19 version of VeryMax and the TermComp '17 version of T2 (as T2 has not been developed further since 2017).…”

Section: Methodsmentioning

confidence: 99%

“…A term f(n) where n ⊂ Z is a configuration. An integer program T induces a relation → T on configurations: We have s − → T t if there is an α ∈ T and a model σ of guard α such that V(α) ⊆ dom(σ), σ(lhs α ) = s, and σ(rhs α ) = t. 2 Then we say that s evaluates to t. As usual, − → * T is the transitive-reflexive closure of − → T .…”

Section: Definition 2 (Integer Transition Relation)mentioning

confidence: 99%

“…Hence, a non-empty recurrent set that contains an initial configuration witnesses non-termination. There are many techniques to find recurrent sets for simple loops [2], lassos [7,13,26,40], or more complex sub-programs [32]. Essentially, our invariant inference technique of Sect.…”

Section: B Related Workmentioning

confidence: 99%

“…iRankFinder can prove non-termination of simple loops[2], but according to its authors it cannot yet check reachability of diverging configurations 8. Ultimate and AProVE were also the two most powerful tools in the "termination" category for C programs at SV-COMP '19[3].…”

mentioning

confidence: 99%

See 3 more Smart Citations

Proving Non-Termination via Loop Acceleration

Frohn

Giesl

2019

2019 Formal Methods in Computer Aided Design (FMCAD)

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We present the first approach to prove non-termination of integer programs that is based on loop acceleration. If our technique cannot show non-termination of a loop, it tries to accelerate it instead in order to find paths to other non-terminating loops automatically. The prerequisites for our novel loop acceleration technique generalize a simple yet effective non-termination criterion. Thus, we can use the same program transformations to facilitate both non-termination proving and loop acceleration. In particular, we present a novel invariant inference technique that is tailored to our approach. An extensive evaluation of our fully automated tool LoAT shows that it is competitive with the state of the art.

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Section: Methodsmentioning

confidence: 99%

Section: Definition 2 (Integer Transition Relation)mentioning

confidence: 99%

Section: B Related Workmentioning

confidence: 99%

mentioning

confidence: 99%

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Proving Non-Termination via Loop Acceleration

Frohn

Giesl

2019

2019 Formal Methods in Computer Aided Design (FMCAD)

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“…In CEGIS, synthesizers receive a set of individual examples that synthesizers can use in various creative and speculative manners (such as machine learning). In contrast, in other methods such as [5][6][7][8]24,27], synthesizers receive logical constraints that are much more binding.…”

Section: Introductionmentioning

confidence: 99%

Decision Tree Learning in CEGIS-Based Termination Analysis

Kura

Unno

Hasuo

2021

Computer Aided Verification

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We present a novel decision tree-based synthesis algorithm of ranking functions for verifying program termination. Our algorithm is integrated into the workflow of CounterExample Guided Inductive Synthesis (CEGIS). CEGIS is an iterative learning model where, at each iteration, (1) a synthesizer synthesizes a candidate solution from the current examples, and (2) a validator accepts the candidate solution if it is correct, or rejects it providing counterexamples as part of the next examples. Our main novelty is in the design of a synthesizer: building on top of a usual decision tree learning algorithm, our algorithm detects cycles in a set of example transitions and uses them for refining decision trees. We have implemented the proposed method and obtained promising experimental results on existing benchmark sets of (non-)termination verification problems that require synthesis of piecewise-defined lexicographic affine ranking functions.

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A Calculus for Modular Loop Acceleration

Frohn

2020

Tools and Algorithms for the Construction and Analysis of Systems

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Loop acceleration can be used to prove safety, reachability, runtime bounds, and (non-)termination of programs operating on integers. To this end, a variety of acceleration techniques has been proposed. However, all of them are monolithic: Either they accelerate a loop successfully or they fail completely. In contrast, we present a calculus that allows for combining acceleration techniques in a modular way and we show how to integrate many existing acceleration techniques into our calculus. Moreover, we propose two novel acceleration techniques that can be incorporated into our calculus seamlessly. An empirical evaluation demonstrates the applicability of our approach.⋆ This work has been funded by DFG grant 389792660 as part of TRR 248 (see https://perspicuous-computing.science).

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Multiphase-Linear Ranking Functions and Their Relation to Recurrent Sets

Cited by 29 publications

References 42 publications

Proving Non-Termination via Loop Acceleration

Proving Non-Termination via Loop Acceleration

Decision Tree Learning in CEGIS-Based Termination Analysis

A Calculus for Modular Loop Acceleration

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