RT Conference Proceedings
SR 00
ID doi:10.1109/CDC.1989.70288
A1 Wolenski, P.
T1 The exponential formula for a Lipschitz differential inclusion
YR 1989
FD 13-15 December 1989
SP 1057
AB The differential inclusion formulation subsumes certain control problems. The process of converting the control formulation into a differential inclusion can also be reversed while at the same time preserving the essential character of the assumptions. Hence there is no essential difference in studying problems in either form. However, the differential inclusion has a simplified mathematical formulation, and indeed resembles an ordinary differential equation. It is shown that the Euler method of successive approximations from ordinary differential equation theory is applicable to set-valued problems as well. This is not so easily stated using the control formulation, but in terms of differential inclusions it can be written succinctly
T2 28th IEEE Conference on Decision and Control
ED Tampa, Florida
AV Published
LK https://pure.iiasa.ac.at/id/eprint/13618/
UL http://dx.doi.org/10.1109/CDC.1989.70288