It is known that various discrete optimization problems can be represented by finite state models called sequential decision processes (sdp's). A subclass of sdp's, the class of monotone sdp's (msdp's), is particularly important since the method of dynamic programming is applicable to obtain optimal policies. Several subclasses of msdp's have also been introduced from the viewpoint of computational complexity for obtaining optimal policies. For each of these classes of sdp's, optimal policies are usually obtained (if possible at all) in fewer steps if a given optimization problem is represented by a model with fewer states.Thus we are naturally led to the problem of finding a minimal (with the fewest states) representation of a given optimi...
We prove exponential lower bounds on the running time of Dynamic Programs (DP) of a certain class fo...
This paper studies a class of finite-stage deterministic dynamic programmings (DP\u27s) with general...
AbstractIn this paper we study the existence, uniqueness, and iterative approximation of solutions f...
It is known that various discrete optimization problems can be represented by finite state models ca...
AbstractAs finite state models to represent a discrete optimization problem given in the form of an ...
In the earlier papers by Karp and Held and by Ibaraki, the representation of a discrete optimization...
In conjunction with the problem of transforming a given optimization problem into a form from which ...
AbstractA lower bound on the work to find a minimum-cost path in a monotone loop-free sequential dec...
AbstractA finite state sequential decision process (sdp) is a model which is able to represent a wid...
A lower bound on the work to find a minimum-cost path in a monotone loop-free sequential decision pr...
A lower bound on the work to find a minimum-cost path in a monotone loop-free sequential decision pr...
This paper investigates a decomposition approach for binary optimization problems with nonlinear obj...
Many sequential decision problems can be formulated as Markov decision processes (MDPs) where the op...
We develop a formal model of enumeration problems and define dynamic programming in its setting. Dyn...
Edited by P. Perny and A. TsoukiasInternational audienceDynamic Programming is a powerful approach t...
We prove exponential lower bounds on the running time of Dynamic Programs (DP) of a certain class fo...
This paper studies a class of finite-stage deterministic dynamic programmings (DP\u27s) with general...
AbstractIn this paper we study the existence, uniqueness, and iterative approximation of solutions f...
It is known that various discrete optimization problems can be represented by finite state models ca...
AbstractAs finite state models to represent a discrete optimization problem given in the form of an ...
In the earlier papers by Karp and Held and by Ibaraki, the representation of a discrete optimization...
In conjunction with the problem of transforming a given optimization problem into a form from which ...
AbstractA lower bound on the work to find a minimum-cost path in a monotone loop-free sequential dec...
AbstractA finite state sequential decision process (sdp) is a model which is able to represent a wid...
A lower bound on the work to find a minimum-cost path in a monotone loop-free sequential decision pr...
A lower bound on the work to find a minimum-cost path in a monotone loop-free sequential decision pr...
This paper investigates a decomposition approach for binary optimization problems with nonlinear obj...
Many sequential decision problems can be formulated as Markov decision processes (MDPs) where the op...
We develop a formal model of enumeration problems and define dynamic programming in its setting. Dyn...
Edited by P. Perny and A. TsoukiasInternational audienceDynamic Programming is a powerful approach t...
We prove exponential lower bounds on the running time of Dynamic Programs (DP) of a certain class fo...
This paper studies a class of finite-stage deterministic dynamic programmings (DP\u27s) with general...
AbstractIn this paper we study the existence, uniqueness, and iterative approximation of solutions f...