Detailed Information on Publication Record
2018
Efficient Algorithms for Asymptotic Bounds on Termination Time in VASS
BRÁZDIL, Tomáš, Krishnendu CHATTERJEE, Antonín KUČERA, Petr NOVOTNÝ, Dominik VELAN et. al.Basic information
Original name
Efficient Algorithms for Asymptotic Bounds on Termination Time in VASS
Authors
BRÁZDIL, Tomáš (203 Czech Republic, belonging to the institution), Krishnendu CHATTERJEE (356 India), Antonín KUČERA (203 Czech Republic, belonging to the institution), Petr NOVOTNÝ (203 Czech Republic), Dominik VELAN (203 Czech Republic, guarantor, belonging to the institution) and Florian ZULEGER (40 Austria)
Edition
Oxford, England, 2018 33rd Annual ACM/IEEE Symposium on Logic in Computer Science (LICS), p. 185-194, 10 pp. 2018
Publisher
ACM
Other information
Language
English
Type of outcome
Stať ve sborníku
Field of Study
10200 1.2 Computer and information sciences
Country of publisher
United Kingdom of Great Britain and Northern Ireland
Confidentiality degree
není předmětem státního či obchodního tajemství
Publication form
printed version "print"
References:
RIV identification code
RIV/00216224:14330/18:00100882
Organization unit
Faculty of Informatics
ISBN
978-1-4503-5583-4
ISSN
UT WoS
000545262800020
Keywords in English
vector addition systems with states; termination
Tags
Tags
International impact, Reviewed
Změněno: 30/4/2019 04:27, RNDr. Pavel Šmerk, Ph.D.
V originále
Vector Addition Systems with States (VASS) provide a well-known and fundamental model for the analysis of concurrent processes, parametrized systems, and are also used as abstract models of programs in resource bound analysis. In this paper we study the problem of obtaining asymptotic bounds on the termination time of a given VASS. In particular, we focus on the practically important case of obtaining polynomial bounds on termination time. Our main contributions are as follows: First, we present a polynomial-time algorithm for deciding whether a given VASS has a linear asymptotic complexity. We also show that if the complexity of a VASS is not linear, it is at least quadratic. Second, we classify VASS according to quantitative properties of their cycles. We show that certain singularities in these properties are the key reason for non-polynomial asymptotic complexity of VASS. In absence of singularities, we show that the asymptotic complexity is always polynomial and of the form Theta(n^k), for some integer k\leq d, where $d$ is the dimension of the VASS. We present a polynomial-time algorithm computing the optimal $k$. For general VASS, the same algorithm, which is based on a complete technique for the construction of ranking functions in VASS, produces a valid lower bound, i.e. a k such that the termination complexity is Omega(n^k). Our results are based on new insights into the geometry of VASS dynamics, which hold the potential for further applicability to VASS analysis.
In Czech
V článku je studován problém asymptotického odhadu maximální délky výpočtu daného VASS systému.
Links
| GA18-11193S, research and development project |
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| MUNI/A/0854/2017, interní kód MU |
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| MUNI/A/1038/2017, interní kód MU |
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