Title :
Strong and weak convexity for linear differential games
Author :
Ivanov, Grigory E.
Author_Institution :
Moscow Inst. of Phys. & Technol., Russia
Abstract :
Zero-sum linear differential games on a fixed time segment with geometrically constrained controls are considered. We study the efficiency of an algorithm to calculate the game value function, which is based on Krasovskii´s concept of the stable bridge for differential games. The second order estimates of the error of the discrete-time algorithm for games with strongly convex penalty functions and for games with strongly convex restriction sets are obtained. Convex analysis and, in particular, the theory of convex conjugate functions are important means of the investigation
Keywords :
differential games; discrete time systems; error analysis; estimation theory; optimisation; Krasovskii concept; convex conjugate functions; convex penalty functions; discrete-time algorithm; error estimation; game theory; linear differential games; second order estimates; strong convexity; value function; weak convexity; zero-sum game; Automatic control; Bridges; Control systems; Error correction; Mathematics; Physics; Q measurement; Time measurement; Vectors;
Conference_Titel :
Decision and Control, 1996., Proceedings of the 35th IEEE Conference on
Conference_Location :
Kobe
Print_ISBN :
0-7803-3590-2
DOI :
10.1109/CDC.1996.577227
