References
- Apostol, T. M . (1974). Mathematical analysis . Reading, MA: Addison-Wesley.
- Arapostathis, A. , Borkar, V. S. , & Ghosh, M. K . (2012). Ergodic control of diffusion processes . Cambridge: Cambridge University Press.
- Arnold, L . (1974). Stochastic differential equations: Theory and applications . New York, NY: Wiley-Interscience.
- Bardi, M. , Raghavan, T. E. S. , & Parthasarathy, T . (1999). Stochastic and differential games: Theory and numerical methods . New York, NY: Springer Science+Business Media.
- Basar, T. (2007). Control and game-theoretic tools for communication networks (overview). Applied and Computational Mathematics , 6 (2), 104–125.
- Browne, S. (2000). Stochastic differential portfolio games. Journal of Applied Probability , 37 , 126–147.
- Buckdahn, R. , & Li, J. (2008). Stochastic differential games and viscosity solutions of Hamilton-Jacobi-Bellman-Isaacs equations. SIAM Journal on Control and Optimization , 47 (1), 444–475.
- Carmona, R . (2016). Lectures on BSDEs, stochastic control, and stochastic differential games with financial applications . Princeton, NJ: Princeton University Press.
- Evans, L. C. , & Souganidis, P. E. (1984). Differential games and representation formulas for solutions of Hamilton-Jacobi-Isaacs equations. Indiana University Mathematics Journal , 33 , 773–797.
- Fleming, W. H. (2006). Risk sensitive stochastic control and differential games. Computer Information Systems , 6 (3), 161–178.
- Fleming, W. H. , & Hernandez, D. H. (2011). On the value of stochastic differential games. Communications on Stochastic Analysis , 5 (2), 341–351.
- Fleming, W. H. , & Souganidis, P. E. (1989). On the existence of value functions of two-player, zero-sum stochastic differential games. Indiana University Mathematics Journal , 38 , 293–314.
- Freeman, R. A. , & Kokotović, P. V. (1996). Inverse optimality in robust stabilization. SIAM Journal on Control and Optimization , 34 , 1365–1391.
- Friedman, A . (1971). Differential games . New York, NY: Wiley.
- Haddad, W. M. , & Chellaboina, V . (2008). Nonlinear dynamical systems and control: A Lyapunov-based approach . Princeton, NJ: Princeton University Press.
- Isaacs, R . (1965). Differential games . New York, NY: Wiley.
- Jacobson, D. H . (1977). Extensions of linear-quadratic control optimization and matrix theory . New York, NY: Academic Press.
- Jacobson, D. H. , Martin, D. H. , Pachter, M. , & Geveci, T . (1980). Extensions of linear-quadratic control theory . Berlin: Springer-Verlag.
- Johari, R. , Mannor, S. , & Tsitsiklis, J. (2005). Efficiency loss in a network resource allocation game: The case of elastic supply. IEEE Transactions on Automatic Control , 50 (11), 1712–1724.
- Khasminskii, R. Z . (2012). Stochastic stability of differential equations . Berlin, Heidelberg: Springer.
- Kushner, H. J . (1967). Stochastic stability and control . New York, NY: Academic Press.
- Kushner, H. J . (1971). Introduction to stochastic control . New York, NY: Holt, Rinehart and Winston, Inc.
- Mao, X. (2007). Stochastic differential equations. Cambridge, UK: Woodhead Publishing.
- Meyn, S. P. , & Tweedie, R. L . (1993). Markov chains and stochastic stability . London: Springer-Verlag.
- Molinari, B. P. (1973). The stable regulator problem and its inverse. IEEE Transactions on Automatic Control , 18 , 454–459.
- Moylan, P. J. , & Anderson, B. D. O. (1973). Nonlinear regulator theory and an inverse optimal control problem. IEEE Transactions on Automatic Control , 18 , 460–465.
- Øksendal, B . (1995). Stochastic differential equations: An introduction with applications . Berlin, Heidelberg: Springer.
- Rajpurohit, T. , & Haddad, W. M. (2017). Nonlinear-nonquadratic optimal and inverse optimal control for stochastic dynamical systems. International Journal of Robust and Nonlinear Control . 27 , 4723–4751.
- Sepulchre, R. , Jankovic, M. , & Kokotovic, P . (1997). Constructive nonlinear control . London: Springer.
- Waslander, S. L. , Hoffmann, G. M. , Jang, J. S. , & Tomlin, C. J. (2005). Multi-agent quadrotor testbed control design: Integral sliding mode vs. reinforcement learning. In IEEE/RSJ International conference on intelligent robots and systems (pp. 468–473). Edmonton, Alberta.
- Willems, J. C. (1971). Least squares stationary optimal control and the algebraic Riccati equation. IEEE Transactions on Automatic Control , 16 (6), 621–634.
- Wu, Z. J. , Xie, X. J. , Shi, P. , & Xia, Y. Q. (2009). Backstepping controller design for a class of stochastic nonlinear systems with Markovian switching. Automatica , 45 , 997–1004.