This paper concentrates on the primary theme of COMPLETE AN ARGUMENT IN THE PROOF OF THEOREM 11.1 BY PROVING THAT IF X AND Y ARE RANDOM VARIABLES… in which you have to explain and evaluate its intricate aspects in detail. In addition to this, this paper has been reviewed and purchased by most of the students hence; it has been rated 4.8 points on the scale of 5 points. Besides, the price of this paper starts from £ 40. For more details and full access to the paper, please refer to the site.
Complete an argument in the proof of Theorem 11.1 by proving that if X and Y are random variables of the form
and if g and h have disjoint support on the time axis, i.e. if
(Representation of Wiener Functionals) Let W be a d-dimensional Wiener process, and let X be a stochastic variable such that
Then there exist uniquely determined such that X has the representation