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A particular step in the existence proof of the conditional expectation of a sq integrable rv

Joined
11/5/14
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295
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Hey guys,

One of the standard results in elementary stochastic calculus is that, if [imath]X[/imath] is a random variable, and [imath]Y[/imath] is any square integrable random variable, then the conditional expectation [imath]\mathbb{E}[Y|X][/imath] exists and is unique. I am struggling to understand a particular step (inequality) in the first part of the proof, where the author proves that [imath]W=g(X)[/imath] and [imath](Y-Y^{\star})[/imath] are orthogonal. I have posted this as a question on MSE here.

I have tried searching the proof online, but the approach in my text appears a bit different. I would really benefit from any suggestions/clues with it.

Cheers,
Quasar
 
Hey, I was struggling to understand a particular step in the existence proof; it's all clear now. I posted it as an answer to my question on MSE! Thanks.
 
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