BSDEs generated by fractional space-time noise and related SPDEs
Abstract
This paper is concerned with the backward stochastic differential equations whose generator is a weighted fractional Brownian field: Yt=+∫tT Ys W (ds,Bs) -∫tT ZsdBs, 0 t T, where W is a (d+1)-parameter weighted fractional Brownian field of Hurst parameter H=(H0, H1, ·s, Hd), which provide probabilistic interpretations (Feynman-Kac formulas) for certain linear stochastic partial differential equations with colored space-time noise. Conditions on the Hurst parameter H and on the decay rate of the weight are given to ensure the existence and uniqueness of the solution pair. Moreover, the explicit expression for both components Y and Z of the solution pair are given.
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