Congestion control and optimal maintenance of communication networks with stochastic cost functions: a variational formulation
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Publication:2080626
DOI10.1007/978-3-030-84721-0_27zbMath1496.90020OpenAlexW4234518831MaRDI QIDQ2080626
Mauro Passacantando, Fabio Raciti
Publication date: 9 October 2022
Full work available at URL: https://doi.org/10.1007/978-3-030-84721-0_27
Communication networks in operations research (90B18) Applications of game theory (91A80) Stochastic games, stochastic differential games (91A15)
Cites Work
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- On the modeling of some environmental games with uncertain data
- On stochastic variational inequalities with mean value constraints
- Parametrized variational inequality approaches to generalized Nash equilibrium problems with shared constraints
- Efficiency and vulnerability analysis for congested networks with random data
- Some equilibrium problems under uncertainty and random variational inequalities
- Optimal road maintenance investment in traffic networks with random demands
- Variational inequality approach to stochastic Nash equilibrium problems with an application to Cournot oligopoly
- Time-dependent variational inequalities and applications to equilibrium problems
- Regularization of stochastic variational inequalities and a comparison of an \(L_p\) and a sample-path approach
- On generalized Nash games and variational inequalities
- On monotone variational inequalities with random data
- On generalized Nash equilibrium in infinite dimension: the Lagrange multipliers approach
- Competitive routing in networks with polynomial costs
- Regularized Iterative Stochastic Approximation Methods for Stochastic Variational Inequality Problems
- On a Class of Random Variational Inequalities on Random Sets
- Existence and Uniqueness of Equilibrium Points for Concave N-Person Games
- Generalized Nash equilibrium problems
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