Algorithms and hardness results for computing cores of Markov chains

Given a Markov chain M = (V,v0,δ), with state space V and a starting state v0, and a probability threshold ϵ, an ϵ-core is a subset C of states that is left with probability at most ϵ. More formally, C ⊆V is an ϵ-core, iff P reach(V\C) ≤ ϵ. Cores have been applied in a wide variety of verification p...

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Bibliographic Details
Main Authors: AHMADI, Ali, CHATTERJEE, Krishnendu, KAFSHDAR GOHARSHADY, Amir, MEGGENDORFER, Tobias, SAFAVI, Roodabeh, ZIKELIC, Dorde
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Language:English
Published: Institutional Knowledge at Singapore Management University 2020
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Online Access:https://ink.library.smu.edu.sg/sis_research/9059
https://ink.library.smu.edu.sg/context/sis_research/article/10062/viewcontent/Algorithms_and_Hardness_Results.pdf
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Institution: Singapore Management University
Language: English
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Summary:Given a Markov chain M = (V,v0,δ), with state space V and a starting state v0, and a probability threshold ϵ, an ϵ-core is a subset C of states that is left with probability at most ϵ. More formally, C ⊆V is an ϵ-core, iff P reach(V\C) ≤ ϵ. Cores have been applied in a wide variety of verification problems over Markov chains, Markov decision processes, and probabilistic programs, as a means of discarding uninteresting and low-probability parts of a probabilistic system and instead being able to focus on the states that are likely to be encountered in a real-world run. In this work, we focus on the problem of computing a minimal ϵ-core in a Markov chain. Our contributions include both negative and positive results: (i) We show that the decision problem on the existence of an ϵ-core of a given size is NP-complete. This solves an open problem posed in [26]. We additionally show that the problem remains NP-complete even when limited to acyclic Markov chains with bounded maximal vertex degree; (ii) We provide a polynomial time algorithm for computing a minimal ϵ-core on Markov chains over control-flow graphs of structured programs. A straightforward combination of our algorithm with standard branch prediction techniques allows one to apply the idea of cores to f ind a subset of program lines that are left with low probability and then focus any desired static analysis on this core subset.