Iterated logarithm law for anticipating stochastic differential equations
Abstract
We prove a functional law of iterated logarithm for the following kind of anticipating stochastic differential equations ut=X0u+1 uΣj=1k ∫0t Aju(us) dWsj+ ∫0t A0u(us)ds, where u>e, W=\(Wt1,...,Wtk), 0 t 1\ is a standard k-dimensional Wiener process, A0u,A1u,..., Aku:Rd Rd are functions of class C2 with bounded partial derivatives up to order 2, X0u is a random vector not necessarily adapted and the first integral is a generalized Stratonovich integral .
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