Average-energy games

Patricia Bouyer; Nicolas Markey; Mickael Randour; Kim G. Larsen; Simon Laursen

Average-energy games

Patricia Bouyer, Nicolas Markey, Mickael Randour, Kim G. Larsen, Simon Laursen

Research output: Contribution to journal › Conference article in Journal › Research › peer-review

Abstract

Two-player quantitative zero-sum games provide a natural framework to synthesize controllers with performance guarantees for reactive systems within an uncontrollable environment. Classical settings include mean-payoff games, where the objective is to optimize the long-run average gain per action, and energy games, where the system has to avoid running out of energy. We study average-energy games, where the goal is to optimize the long-run average of the accumulated energy. We show that this objective arises naturally in several applications, and that it yields interesting connections with previous concepts in the literature. We prove that deciding the winner in such games is in NP ∩ coNP and at least as hard as solving mean-payoff games, and we establish that memoryless strategies suffice to win. We also consider the case where the system has to minimize the average-energy while maintaining the accumulated energy within predefined bounds at all times: this corresponds to operating with a finite-capacity storage for energy. We give results for one-player and two-player games, and establish complexity bounds and memory requirements.

Original language	English
Journal	Electronic Proceedings in Theoretical Computer Science, EPTCS
Volume	193
Pages (from-to)	1-15
Number of pages	15
ISSN	2075-2180
Publication status	Published - 23 Sept 2015
Event	6th International Symposium on Games, Automata, Logics and Formal Verification, G and ALF 2015 - Genoa, Italy Duration: 21 Sept 2015 → 22 Sept 2015

Conference

Conference	6th International Symposium on Games, Automata, Logics and Formal Verification, G and ALF 2015
Country/Territory	Italy
City	Genoa
Period	21/09/2015 → 22/09/2015

Bibliographical note

Funding Information:
∗Work partially supported by European project CASSTING (FP7-ICT-601148) and ERC project EQualIS (StG-308087).

Publisher Copyright:
© P. Bouyer, N. Markey, M. Randour, K.G. Larsen, S. Laursen.

Copyright:
Copyright 2020 Elsevier B.V., All rights reserved.

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title = "Average-energy games",

abstract = "Two-player quantitative zero-sum games provide a natural framework to synthesize controllers with performance guarantees for reactive systems within an uncontrollable environment. Classical settings include mean-payoff games, where the objective is to optimize the long-run average gain per action, and energy games, where the system has to avoid running out of energy. We study average-energy games, where the goal is to optimize the long-run average of the accumulated energy. We show that this objective arises naturally in several applications, and that it yields interesting connections with previous concepts in the literature. We prove that deciding the winner in such games is in NP ∩ coNP and at least as hard as solving mean-payoff games, and we establish that memoryless strategies suffice to win. We also consider the case where the system has to minimize the average-energy while maintaining the accumulated energy within predefined bounds at all times: this corresponds to operating with a finite-capacity storage for energy. We give results for one-player and two-player games, and establish complexity bounds and memory requirements.",

author = "Patricia Bouyer and Nicolas Markey and Mickael Randour and Larsen, {Kim G.} and Simon Laursen",

note = "Funding Information: ∗Work partially supported by European project CASSTING (FP7-ICT-601148) and ERC project EQualIS (StG-308087). Publisher Copyright: {\textcopyright} P. Bouyer, N. Markey, M. Randour, K.G. Larsen, S. Laursen. Copyright: Copyright 2020 Elsevier B.V., All rights reserved.; 6th International Symposium on Games, Automata, Logics and Formal Verification, G and ALF 2015 ; Conference date: 21-09-2015 Through 22-09-2015",

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AU - Randour, Mickael

AU - Larsen, Kim G.

AU - Laursen, Simon

N1 - Funding Information: ∗Work partially supported by European project CASSTING (FP7-ICT-601148) and ERC project EQualIS (StG-308087). Publisher Copyright: © P. Bouyer, N. Markey, M. Randour, K.G. Larsen, S. Laursen. Copyright: Copyright 2020 Elsevier B.V., All rights reserved.

PY - 2015/9/23

Y1 - 2015/9/23

N2 - Two-player quantitative zero-sum games provide a natural framework to synthesize controllers with performance guarantees for reactive systems within an uncontrollable environment. Classical settings include mean-payoff games, where the objective is to optimize the long-run average gain per action, and energy games, where the system has to avoid running out of energy. We study average-energy games, where the goal is to optimize the long-run average of the accumulated energy. We show that this objective arises naturally in several applications, and that it yields interesting connections with previous concepts in the literature. We prove that deciding the winner in such games is in NP ∩ coNP and at least as hard as solving mean-payoff games, and we establish that memoryless strategies suffice to win. We also consider the case where the system has to minimize the average-energy while maintaining the accumulated energy within predefined bounds at all times: this corresponds to operating with a finite-capacity storage for energy. We give results for one-player and two-player games, and establish complexity bounds and memory requirements.

AB - Two-player quantitative zero-sum games provide a natural framework to synthesize controllers with performance guarantees for reactive systems within an uncontrollable environment. Classical settings include mean-payoff games, where the objective is to optimize the long-run average gain per action, and energy games, where the system has to avoid running out of energy. We study average-energy games, where the goal is to optimize the long-run average of the accumulated energy. We show that this objective arises naturally in several applications, and that it yields interesting connections with previous concepts in the literature. We prove that deciding the winner in such games is in NP ∩ coNP and at least as hard as solving mean-payoff games, and we establish that memoryless strategies suffice to win. We also consider the case where the system has to minimize the average-energy while maintaining the accumulated energy within predefined bounds at all times: this corresponds to operating with a finite-capacity storage for energy. We give results for one-player and two-player games, and establish complexity bounds and memory requirements.

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JO - Electronic Proceedings in Theoretical Computer Science, EPTCS

JF - Electronic Proceedings in Theoretical Computer Science, EPTCS

T2 - 6th International Symposium on Games, Automata, Logics and Formal Verification, G and ALF 2015

Y2 - 21 September 2015 through 22 September 2015

ER -

Average-energy games

Abstract

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