Existence and compactness for weak solutions to bellman systems with critical growth
Date
Authors
ORCID
Journal Title
Journal ISSN
Volume Title
Publisher
item.page.doi
Abstract
We deal with nonlinear elliptic and parabolic systems that are the Bellman systems associated to stochastic differential games as a main motivation. We establish the existence of weak solutions in any dimension for an arbitrary number of equations (\players"). The method is based on using a renormalized sub- and super-solution technique. The main novelty consists in the new structure conditions on the critical growth terms with allow us to show weak solvability for Bellman systems to certain classes of stochastic differential games.
Description
"This research was supported by WCU (World Class University) program through the Korea Science and Engineering Foundation
funded by the Ministry of Education, Science and Technology (R31-20007). . . . The support of the Collaborative Research Center (SFB 611) is also
acknowledged."
Keywords
Stochastic games, Bellman systems
item.page.sponsorship
Rights
© 2012 American Institute of Mathematical Sciences