Constrained expected average stochastic games for continuous-time jump processes
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Publication:2041002
DOI10.1007/s00245-019-09588-9zbMath1468.91015OpenAlexW2950809927WikidataQ127668304 ScholiaQ127668304MaRDI QIDQ2041002
Publication date: 15 July 2021
Published in: Applied Mathematics and Optimization (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00245-019-09588-9
nonzero-sum gamesexpected average payoff criterionconstrained Nash equilibriumcontinuous-time jump process
Applications of branching processes (60J85) Stochastic games, stochastic differential games (91A15) Jump processes on general state spaces (60J76)
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Cites Work
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- Nonzero-sum constrained discrete-time Markov games: the case of unbounded costs
- Stochastic games for continuous-time jump processes under finite-horizon payoff criterion
- Discounted continuous-time constrained Markov decision processes in Polish spaces
- Existence of Nash equilibria for constrained stochastic games
- Continuous-time Markov decision processes. Theory and applications
- Stochastic optimal control. The discrete time case
- Convergence of the optimal values of constrained Markov control processes
- Continuous-time constrained stochastic games under the discounted cost criteria
- Constrained stochastic games with the average payoff criteria
- Nonzero-sum games for continuous-time Markov chains with unbounded transition and average payoff rates
- Continuous-time constrained stochastic games with average criteria
- Linear Programming and Constrained Average Optimality for General Continuous-Time Markov Decision Processes in History-Dependent Policies
- Discounted Continuous-Time Markov Decision Processes with Unbounded Rates: The Convex Analytic Approach
- Ergodic Control of Continuous-Time Markov Chains with Pathwise Constraints
- Stochastic finance. An introduction in discrete time
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