RamoSFTT feeling the same!

🎉🎉🎉🎉🎉😊

you are a legend for giving a very accurate timestamp for all the videos, thanks mate👍

And they respect the results for the hard work they were to derive!

respect

That's actually pretty cool! :)

Nice

When you're scrolling through the comments on a a random course and you see math guy from wits 10+ years ago :D

@@matthewholmes2008 Lol dude what were the chances... To be fair it is a maths video :D

"It looks right but Its wrong for reasons you dont know yet". That statement is the description of the current state of the worldwide economy.

hes a quant at millennium now

What does he do now?

@@Anyone.c now millennial portfolio manager

Any idea what the correct statement of the chain rule would be? the video doesn't show the board when he's correcting it

Never mind :) I see he fixes it afterwards :)

You're right.

geiiiii

Var(X)=E(X^2)-E^2(X) Now E(X) = 0 This makes Var(X) = E(X^2) and Var(X) = T/n This makes E(X^2) = T/n

Because it is related to P(B(t)>a) and B(tau_a) is equal to a, so P(B(t))= B(tau_a) is not applicable. It has to be greater or less than a, whilst also crossing a

Tom Jordan why is P(M(t) > a) = P(B(t)-B(tao)>0 U tao

Because it accounts for no mass at all, if X is a continuous R.V., then P(X = x) is always 0 You can incorporate it to either the 1st or 2nd term, but it makes no difference from a distribution point of view.

brownian

because the rest of the terms goes to 0 as t approaches 0. See it now?

@@lazywarrior hmmm and so this happens due to the Quadratic variation concept, right?

@@ninmarwarda5154 no. This is just evaluating the limit. My previous reply contain typos. I should say as delta t approaches 0. Remember that big O notation in some form of Taylor expansion? That remainder = zero at the limit.

Let's denote the time range as 0 = a}, but it makes no difference from a distribution point of view) If you think about it, B(s) at time t can really only be either above the level a, or below (Again I am ignoring the equality case here) You can choose an arbitrary reference level and the statement will still be true. Just so happens choosing a in this case is the most natural thing to do, as demonstrated by the calculations in the video. So, these are the only two possibilities no matter what conditional event you impose on them, that's why we can break P(\tau_a < t) into the sum above.

Let A,B be two sets. Is it easy to see that P(A)=P(A and B)+P(A and B^{c})? Then if you set A={t:tao0} does it works?

By use of mean value theorem ?

Jude is right, MVT requires the function to be continuous.

i think in his example, f depends on Bt. What you suggested is f=Bt which is not what he means.

shit is not the right word to use for such situations.

If the price goes down after \tau_a and never manage to climb back before t (actually, it doesn't really matter whether the price crosses the line y=a again, since you can always find a symmetric path that ends on the other side of y=a, as long as B(t) < a, we are good), that would be the case covered by the second part on the RHS, which is P(B(t)

I think there is a "typo" in defining τ_a. But everything will go through if we define τ_a = inf {s ≥ 0 | B(s)>a}.

michał botor why should M(t)

oh, boy. i just realized, that this is even more complicated then i originally thought, so let me restate the above again, and hopefully this will help you to resolve your doubts as well. unless my reasoning is flawed, of course. ;) so.. M(t) records the maximum value of brownian motion in the time interval (0, t). tau_a records *the first time* brownian motion attains the value of a. moreover, since (by definition of brownian motion) B(0) = 0 and t -> B(t) is a continuous function, then brownian motion starts from 0 and cannot jump in value, i.e. (1) to reach the value of a it must go through all of the values between 0 and a first, and (2) to reach the value greater than a it must reach the value of a first, which i can summarize as follows if 0< b < a < c, then tau_b < tau_a < tau_c. what i'm trying to say is that because of the two mentioned defining properties of brownian motion tau_a not only records for you the moment when brownian motion first attained the value of a, but also implicitly tells you, that in the past it never exceeded the value of a, and so it must be, that M(tau_a) = a. now, to answer your question, if we assume that tau_a < t, then from what i said above at time t maximum value of browinan motion M(t) is at least as big as it was at time tau_a, namely M(tau_a) = a, and if it is greater than a, then it must have reached this greater value after time tau_a. however if at time tau_a brownian motion will bounce off of the value of a and never reach it again in the span of time interval (tau_a, t), then its maximum value will be the one that was recored at time tau_a, i.e. M(t) = M(tau_a) = a. on the contrary if we assume, that M(t) > a, then well M(t) > a. an this is the reason, why i'm worrying, that the equality P(M(t)>a) = P(tau_a

michał botor i have this same confusion. Have you figured it out?

@@michalbotor That's why a more "careful" treatment will be using the set {M(t) >= a} instead of simply ignoring the equality case In distributional sense they are both the same, but the argument seems to be more solid if we directly consider P(M(t) >= a)

@@michalbotor Because the process is continuous the probability that M(t) is any arbitrary constant is 0, so P(M(t) = a)=0, so the statement is still true. You are right that the process could "bounce" off a and never reach it again, but in a brownian motion process this is infinitely unlikely to happen.

this is why actually it is stock price return and not stock price that is modelled in this way. It is explained in some way at 01:01:00 , dS/St is brownian motion

Thanks Federico...will take a look.

@@wcottee i know these comments are old but F_B is technically incorrect. dS/St is not brownian motion, it is the stochastic equivalent of derivative of brownian motion (i.e. normally distributed with a mean of 0). the answer to wcottee's question is that generally you model the log of stock prices with brownian motion, and the log can go below zero. Since brownian motion processes are invariant under shifts you can also define the process such that the brownian motion starts at the current log of the stock price. When you undo the logarithm, this effectively results in the % returns being normally distributed around 0.

@@robertvolgman6590 Thanks for the reply, Robert.

I think your confusion partly stems from the fact that he is not actually proving the exact version of the 3rd property. As it is just a heuristic "proof", inevitably there will be some logical flaws/holes hidden within. If you have a strong measure-theoretic probability background, then maybe skimming through the original proof made by Dvoretsky, Erdos, and Kakutani would be a good choice.

Because of quadratic variation being non-zero.

when he says we take the infinitesimal difference of the LHS, he just ignores the sum. How does one get around this? Thank you

@@MiniNinjaUK1 Note that we can rewrite the RHS into something like RHS = sum_{i = 1}^{n} [t_{i} - t_{i-1}], this is a telescoping sum which evaluates to T. Then very informally speaking, when n is crazily large, we can treat t_{i} - t_{i-1} as super small time increment, which is like dt By the same heuristic, we can also treat (B_{t_{i}} - B_{t_{i-1}})^2 as a very small change of B(t) all squared (whatever that is), and we named it (dB(t))^2 At first, it may be kind of confusing why we even adopted such a naming, since we were using calculus notation for something that is inherently not differentiable everywhere a.s. However, if you accept the "abusing of notation" here and move on to the next lecture, you will see why we restate the quadratic variation in this "differential" form and how powerful it is.

What mistake?

From the course description: "The purpose of the class is to expose undergraduate and graduate students to the mathematical concepts and techniques used in the financial industry. Mathematics lectures are mixed with lectures illustrating the corresponding application in the financial industry. MIT mathematicians teach the mathematics part while industry professionals give the lectures on applications in finance." See the course on MIT OpenCourseWare for more information and materials at ocw.mit.edu/18-S096F13.

For quants

greyreynyn why would they be sarcastic?

Do you mean stochastic?

sorry for my sexist language