Set-valued stochastic integrals in UMD spaces and applications
Abstract
The purpose of this paper is to study certain set-valued integrals in UMD Banach spaces and provide a compatible form of the martingale representation theorem for set-valued martingales. Under specific conditions, these martingales can be expressed using revised set-valued stochastic integrals with respect to a real standard Brownian motion W = (Wt)t∈[0,T ]. Moreover, we prove the existence of solutions to the following set-valued backward stochastic differential equation of the form Yt=(+∫tTHu du+∫[0,t]RZ\, dWu) ∫[0,T]RZ\, dWu a.s., t∈ [0,T], where the right-hand side, of this equation, represents the Hukuhara difference of two quantities containing revised set-valued stochastic integrals, is a terminal set-valued function condition and H is a set-valued function satisfying some suitable conditions.
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