Backward stochastic differential equations with constraints on the gains-process
Abstract
We consider backward stochastic differential equations with convex constraints on the gains (or intensity-of-noise) process. Existence and uniqueness of a minimal solution are established in the case of a drift coefficient which is Lipschitz continuous in the state and gains processes and convex in the gains process. It is also shown that the minimal solution can be characterized as the unique solution of a functional stochastic control-type equation. This representation is related to the penalization method for constructing solutions of stochastic differential equations, involves change of measure techniques, and employs notions and results from convex analysis, such as the support function of the convex set of constraints and its various properties.
Additional Information
© 1998 Institute of Mathematical Statistics. Received October 1997; revised April 1998. Supported in part by U.S. Army Research Office Grant DAAH 04-95-1-0528. Supported in part by U.S. Army Research Grant DAAH-04-95-1-0226.Attached Files
Published - CVIap98.pdf
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Additional details
- Eprint ID
- 28538
- Resolver ID
- CaltechAUTHORS:20111220-131043977
- DAAH 04-95-1-0528
- Army Research Office (ARO)
- DAAH-04-95-1-0226
- Army Research Office (ARO)
- Created
-
2011-12-20Created from EPrint's datestamp field
- Updated
-
2019-10-03Created from EPrint's last_modified field
- Other Numbering System Name
- Zentralblatt MATH identifier
- Other Numbering System Identifier
- 0935.60039