Multivalued backward stochastic differential equations with local lipschitz drift

We deal with a one dimensional multivalued backward stochastic differential equation associated to the subdifferential ∂hof a lower semi-continuous convex function h, with a local lipschitz coefficient (drift). When the terminal value is bounded, we prove the existence of a solution by using a suita...

Full description

Saved in:
Bibliographic Details
Published inStochastics and stochastics reports Vol. 60; no. 3-4; pp. 205 - 218
Main Author N'zi, Modeste
Format Journal Article
LanguageEnglish
Published Abingdon Gordon and Breach Science Publishers 01.04.1997
Taylor & Francis
Subjects
AMS 1991 Subject Classifications: 60H10, 60H20
Backward stochastic differential equations
convex function
Exact sciences and technology
Mathematics
maximal monotone operator
Probability and statistics
Probability theory and stochastic processes
Sciences and techniques of general use
Stochastic analysis
Brownian motion
Differential equation
Lipschitz drift
Maximal operator
Lipschitz function
Convex function
Delay equation
Stochastic equation
Online AccessGet full text
ISSN1045-1129
DOI10.1080/17442509708834106

Cover

More Information
Summary:We deal with a one dimensional multivalued backward stochastic differential equation associated to the subdifferential ∂hof a lower semi-continuous convex function h, with a local lipschitz coefficient (drift). When the terminal value is bounded, we prove the existence of a solution by using a suitable approximation of the drift by a double sequence of lipschitz functions. The uniqueness is obtained under the condition that the drift is local Lipschitz in y and globally Lipschitz in z. The existence result is an extension to the multivalued setting of the work of Hamadène
ISSN:1045-1129
DOI:10.1080/17442509708834106