This exercise weakens the conditions on the optional stopping theorem. Show that if Mt is a uniformly integrable martingale that is right continuous with left limits and T is a finite stopping time, then E MT = E M0.Let W be a Brownian motion and let T be a stopping time with Prove that EWT = 0 and This is not an easy application of the optional stopping theorem because we do not know that is necessarily a uniformly integrable martingale.

This exercise weakens the conditions on the optional stopping theorem. Show that if Mt is a uniformly integrable martingale that is right continuous with left limits and T is a finite stopping time,...

This exercise weakens the conditions on the optional stopping theorem. Show that if Mt is a uniformly integrable martingale that is right continuous with left limits and T is a finite stopping time, then E M_T
= E M₀.

Let W be a Brownian motion and let T be a stopping time with
Prove that EW_T
= 0 and

This is not an easy application of the optional stopping theorem because we do not know that
is necessarily a uniformly integrable martingale.

May 04, 2022

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This exercise weakens the conditions on the optional stopping theorem. Show that if Mt is a uniformly integrable martingale that is right continuous with left limits and T is a finite stopping time,...

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