Ararat, ÇağınMa, J.Wu, W.2024-03-132024-03-132023-101050-5164https://hdl.handle.net/11693/114676In this paper, we establish an analytic framework for studying set-valued backward stochastic differential equations (set-valued BSDE), motivated largely by the current studies of dynamic set-valued risk measures for multi-asset or network-based financial models. Our framework will make use of the notion of the Hukuhara difference between sets, in order to compensate the lack of “inverse” operation of the traditional Minkowski addition, whence the vector space structure in set-valued analysis. While proving the well-posedness of a class of set-valued BSDEs, we shall also address some fundamental issues regarding generalized Aumann–Itô integrals, especially when it is connected to the martingale representation theorem. In particular, we propose some necessary extensions of the integral that can be used to represent set-valued martingales with nonsingleton initial values. This extension turns out to be essential for the study of set-valued BSDEs.enConvex compact setHukuhara differenceIntegrably bounded set-valued process Picard iteration Set-valued backward stochastic differential equation Set-valued stochastic analysis Set-valued stochastic integralPicard iterationSet-valued backward stochastic differential equationSet-valued stochastic analysisSet-valued stochastic integralArticle10.1214/22-AAP1896