Multivalued Backward Stochastic Differential Equations with Time Delayed Generators

Abstract

Our aim is to study the following new type of multivalued backward stochastic differential equation: \[ \array [c]r-dY(t) +∂(Y(t)) dt F(t,Y(t),Z(t),Yt,Zt) dt+Z(t) dW(t),\;0≤ t≤ T,\\ μlticolumn1lY(T) =,array . \] where ∂ is the subdifferential of a convex function and (Yt,Zt):=(Y(t+θ),Z(t+θ))θ∈-T,0] represent the past values of the solution over the interval [ 0,t] . Our results are based on the existence theorem from Delong & Imkeller, Ann. Appl. Probab., 2010, concerning backward stochastic differential equations with time delayed generators.