<--- Back to Details
First PageDocument Content
Systems theory / Equations / Dynamic programming / Operations research / Richard E. Bellman / Bellman equation / Optimal control / Markov decision process / Functional equation / Mathematics / Control theory / Mathematical optimization
Date: 2002-03-27 13:57:11
Systems theory
Equations
Dynamic programming
Operations research
Richard E. Bellman
Bellman equation
Optimal control
Markov decision process
Functional equation
Mathematics
Control theory
Mathematical optimization

Add to Reading List

Source URL: www.cas.mcmaster.ca

Download Document from Source Website

File Size: 53,00 KB

Share Document on Facebook

Similar Documents

Concurrent computing / Parallel computing / Computing / IT infrastructure / Cloud infrastructure / Job scheduling / Apache Hadoop / Apache Software Foundation / Data-intensive computing / Workflow / Algorithmic skeleton / Programming paradigm

Towards a high level programming paradigm to deploy e-science applications with dynamic workflows on large scale distributed systems Mohamed Ben Belgacem Nabil Abdennadher

DocID: 1xTOs - View Document

Minimax Differential Dynamic Programming: An Application to Robust Biped Walking Jun Morimoto Human Information Science Labs, Department 3, ATR International

DocID: 1vqMk - View Document

Empirical Dynamic Programming William B. Haskell ISE Department, National University of Singapore Rahul Jain*

DocID: 1vouJ - View Document

MarchRevised MayReport LIDS-P-3506 Stable Optimal Control and Semicontractive Dynamic Programming

DocID: 1vhRF - View Document

EE365: Deterministic Finite State Control Deterministic optimal control Shortest path problem Dynamic programming Examples

DocID: 1vg0M - View Document