强化学习的infinite-horizon算法和finite-horizon算法,与环境是没有关系的。环境仍然是离散动力学模型,...
Discrete-time discounted Markov decision processes (MDPs, in singular MDP) with finite state spaces, compact action sets and trapezoidal fuzzy reward functions are presented in this article. For such a kind of MDPs, both the finite and the infinite horizons cases are studied. The corresponding ...
We consider asymmetric partially observed Shapley-type finite-horizon and infinite-horizon games where the state, a controlled Markov chain {X-t}, is not observable to one player (minimizer) who observes only a state-dependent signal {Y-t}. The maximizer observes both. The minimizer is informed...
Finite horizon approximations of infinite horizon linear programs This paper describes the class of infinite horizon linear programs that have finite optimal values. A sequence of finite horizon ( T period) problems is s... RC Grinold - 《Mathematical Programming》 被引量: 101发表: 1977年 Primal...
A method is presented for direct trajectory optimization and costate estimation of finite-horizon and infinite-horizon optimal control problems using global collocation at Legendre-Gauss-Radau (LGR) points. A key feature of the method is that it provides an accurate way to map the KKT multipliers ...
“Robust Model Predictive Controller Design: Finite and Infinite Horizon”出自《数学和系统科学:英文版》期刊2015年第11期文献,主题关键词涉及有鲁棒模型预测控制、控制器设计、地平线、有限和、线性不确定系统、二次稳定性、预测控制器、设计问题等。钛学术提供该
Abstract We show that subgame-perfect equilibria of infinite-horizon games arise as limits, as the horizon grows long and epsilon small, of subgame-perfect epsilon-equilibria of games which are truncated after a finite horizon. A number of applications show that this result provides a useful ...
Whoever chooses to compete with another can also choose to play with another. Sexuality doesn’t have to be bounded, it can be horizonal. Infinite players do not play within sexual boundaries, but with sexual boundaries. They cannot be said to be heterosexual, homosexual, etc. ...
Cai Dapeng and Takashi Gyoshin Nitta, Limit of the solutions for the finite horizon problems as the optimal solution to the infinite horizon optimization problems," Journal of Difference Equations and Applications, Vol.17, No.3, pp. 359-373, 2011....
Flåm, SD (1987) Finite state approximations for countable state infinite horizon discounted Markov decision processes. Modeling, Identification and Control 8: pp. 117-123Fl˚am, S.D.: Finite State Approximations for Countable State Infinite Horizon Discounted Markov Decision Processes. Modeling, ...