FURTHER RESULTS ON THE EXISTENCE OF CONTINUOUS SELECTIONS OF SOLUTION SETS OF QUANTUM STOCHASTIC DIFFERENTIAL INCLUSIONS

TitleFURTHER RESULTS ON THE EXISTENCE OF CONTINUOUS SELECTIONS OF SOLUTION SETS OF QUANTUM STOCHASTIC DIFFERENTIAL INCLUSIONS
Publication TypeJournal Article
Year of Publication2008
AuthorsAYOOLA E.O.
JournalDynamic Systems and Applications
Volume17
Start Page609
Pagination16
Date Published2008
ISSN1056-2176
AMS Subject Classification60H10, 81S25
Abstract

We prove that the map that associates to the initial value the set of solutions to the Lipschitzian Quantum Stochastic Differential Inclusion (QSDI) admits a selection which is continuous from the locally convex space of stochastic processes to the space of adapted and weakly absolutely continuous solutions. As a corollary, the reachable set multifunction admits a continuous selection. In the framework of the Hudson-Parthasarathy formulation of quantum stochastic calculus, these results are achieved subject to some compactness conditions on the set of initial values and on some coefficients of the inclusion.

PDFhttps://acadsol.eu/dsa/articles/17/DSA-2007-609-624.pdf
Refereed DesignationRefereed