Lp-Variational Solutions of Multivalued Backward Stochastic Differential Equations
Abstract
The aim of the paper is to prove the existence and uniqueness of the Lp--variational solution, with p>1, of the following multivalued backward stochastic differential equation with p--integrable data: equation* \ array[c]l -dYt+∂y(t,Yt)dQt H(t,Yt,Zt)dQt-ZtdBt,\;0≤ t<τ,\\[0.1cm] Yτ=η, array . equation* where τ is a stopping time, Q is a progresivelly measurable increasing continuous stochastic process and ∂y is the subdifferential of the convex lower semicontinuous function y(t,y).
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