Let Wt be a Brownian motion and be the minimal augmented filtration generated by W . Let Show that T is not a stopping time with respect to {Ft}. Let W and S be as in Exercise 4.1. (1) Let 0 ...


Let Wt
be a Brownian motion and

be the minimal augmented filtration generated by W . Let





Show that T is not a stopping time with respect to {Ft}.


Let W and S be as in Exercise 4.1.


(1) Let 0 <><><><>


Show that there exists a constant c, depending on s,t, and u, but not a or b, such that





(2) Show that the path of a Brownian motion does not take on the same value as a local maximum twice. That is, if S and T are times when W has a local maximum, then WS
= WT , a.s.





May 22, 2022
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