| 1 |
Probabilistic Approach to Finite State Mean Field Games
Cecchin A, Fischer M
Applied Mathematics and Optimization, 81(2), 253, 2020 |
| 2 |
On Quasi-stationary Mean Field Games Models
Mouzouni C
Applied Mathematics and Optimization, 81(3), 655, 2020 |
| 3 |
Open-loop and feedback Nash equilibria in constrained linear-quadratic dynamic games played over event trees
Reddy PV, Zaccour G
Automatica, 107, 162, 2019 |
| 4 |
N-Person Nonzero-Sum Games for Continuous-Time Jump Processes With Varying Discount Factors
Huang XX, Liu QL, Guo XP
IEEE Transactions on Automatic Control, 64(5), 2037, 2019 |
| 5 |
Continuous-Time Constrained Stochastic Games under the Discounted Cost Criteria
Zhang WZ
Applied Mathematics and Optimization, 77(2), 275, 2018 |
| 6 |
Distributed Inertial Best-Response Dynamics
Swenson B, Eksin C, Kar S, Ribeiro A
IEEE Transactions on Automatic Control, 63(12), 4294, 2018 |
| 7 |
NASH EQUILIBRIA FOR GAME CONTINGENT CLAIMS WITH UTILITY-BASED HEDGING
Kentia K, Kuhn C
SIAM Journal on Control and Optimization, 56(6), 3948, 2018 |
| 8 |
When doing nothing may be the best investment action: Pessimistic anticipative power transmission planning
Pozo D, Sauma E, Contreras J
Applied Energy, 200, 383, 2017 |
| 9 |
Properties of feedback Nash equilibria in scalar LQ differential games
Engwerda J
Automatica, 69, 364, 2016 |
| 10 |
On polynomial feedback Nash equilibria for two-player scalar differential games
Possieri C, Sassano M
Automatica, 74, 23, 2016 |
