Mathematics

robjohn

12:01 AM

Back.

Brian M. Scott

@robjohn That problem asked by Chris’s sister has acquired a couple more solutions while you were away.

robjohn

@BrianM.Scott I had seen oen and Raymond's answers. I upvoted Raymond's answer after he fixed it.

Brian M. Scott

I like oen’s, though he could have stood to include a few more details.

robjohn

@BrianM.Scott I knew I had to work fast, because I knew someone knew the arcsin series. Raymond is one to know these things off the top of his head.

Brian M. Scott

@robjohn Which is probably why I don’t run into him very often!

robjohn

12:10 AM

@BrianM.Scott I know him from sci.math

Brian M. Scott

The name is very faintly familiar, so I may have seen him there years ago when I was still reading it.

robjohn

@PeterTamaroff: tell me those aren't sock puppets in your avatar....

Peter Tamaroff

@robjohn sock puppets?

robjohn

@PeterTamaroff Sock Puppets is a term used for alternate accounts of one person, there to upvote questions and answers for the main account.

Peter Tamaroff

@robjohn Oh, look at that. No, they are plushies. They are $G$ times more evil that sock puppets, where $G$ is Graham's number.

robjohn

12:18 AM

@PeterTamaroff I've counted higher...

:-D better bragging through bigger step sizes

Peter Tamaroff

@robjohn I'm reading about the UCT now. Universal Chord Theorem. It is quite nice.

robjohn

@PeterTamaroff Is this a musical theorem?

peoplepower

7

Q: Universal Chord Theorem

Let $f \in C[0,1]$ and $f(0)=f(1)$. How do we prove $\exists a \in [0,1/2]$ such that $f(a)=f(a+1/2)$? In fact, for every positive integer $n$, there is some $a$, such that $f(a) = f(a+\frac{1}{n})$. For any other non-zero real $r$ (i.e not of the form $\frac{1}{n}$), there is a continuous fu...

robjohn

@peoplepower I wsa just reading that. It seems pretty simple to prove, just look at $f(x+\frac12)-f(x)$

peoplepower

@robjohn The generalization is equally easy, but what I find amazing is that it only holds for reciprocal integers.

Issac M

12:23 AM

What do you call it when two functions seem to assume the same values as each other within some range, but they don't actually converge to a number/limit.

robjohn

@peoplepower Yeah, because you cannot break up the interval evenly otherwise

@IssacM what do you mean don't converge to a limit?

Peter Tamaroff

@IssacM Huh? I don't understand the "but they don't actually converge to a number/limit." part

@robjohn =)

robjohn

@IssacM An example perhaps?

Issac M

Black-Scholes option pricing model :s

I am comparing it to the closed-form pricing model of another option

Over a small interval of inputs they agree almost completely

Then one converges on zero and the other does zigzags

robjohn

@IssacM you just said, "blah, blah, blardy, blar" :-)

Jayesh Badwaik

12:26 AM

@IssacM hazarding a guess here, "they are locally convergent" ?

Issac M

hmm okay

So that's what we say when they marry together over some interval?

robjohn

way beyond my ken; I will stay out of it

Jayesh Badwaik

@IssacM Do you mean this?
http://en.wikipedia.org/wiki/Local_convergence

If not, then I don't have a word for it I guess.

Issac M

Ok thanks :)

Oh robjohn

Brian M. Scott

@robjohn I once had a student who did his senior project on the Black-Scholes model; I felt as if I’d fallen into a black hole.

robjohn

12:28 AM

@BrianM.Scott: Hey, I can cap if I spend all day answering questions, but how do you get so many acceptances?

Issac M

Do you know if $\{a,b\}^+$ denotes maximization of $a,b \in \mathbb{R}$, or is it $(a,b)^+$

Google isn't revealing

robjohn

@BrianM.Scott I'm glad to have good company here :-)

Brian M. Scott

@robjohn I’m not really sure. I like to think that it’s because I write clearly and usually have a pretty good idea of where people are likely to have trouble.

robjohn

@BrianM.Scott Even though economics is really just math hidden behind a lot of arcane language, it is hidden deeply

Jayesh Badwaik

@IssacM Naah man. Very very long ago, some 8-9 years I guess, I heard my friend telling me something similar, but I did not take him seriously then and I do not remember now. I have a hunch you are correct, no guarantees though.

Brian M. Scott

12:30 AM

@robjohn So they should award a PhDDD in econ?

Jayesh Badwaik

The roundbrackets I mean.

Issac M

@Jayesh correct about what?

@Jayesh ohhh

robjohn

@BrianM.Scott Deeply Disguised Doctor of Philosophy?

Brian M. Scott

@robjohn Pile it higher and Deep, Deeper, Deepest.

robjohn

@BrianM.Scott Ah, that sounds good :-)

@IssacM I have seen neither. Sorry. Is it an economics term?

Issac M

12:34 AM

@robjohn Thanks

Brian M. Scott

Surely this has been dealt with here before.

Issac M

@robjohn My quant finance lecturer put it on the board then rubbed it out because he didn't want to confuse us undergrads

@robjohn Forgot which one it was

robjohn

@BrianM.Scott I'm sure it has. someone will find the original. Might as well say $(-1)^2=1^2$ so $-1=1$.

Jayesh Badwaik

@IssacM If he did not want to confuse you, why should you be confused/worried? Its only a notation after all!

Issac M

I'm doing a 15 pages assignment where I have to do numerous TikZ lattices and it's typographically better without writing Max() or Min() all the time.

robjohn

12:37 AM

@IssacM I have not taken any econ classes, so I'm not privy to such arcana. Interestingly, there was a grad student Robert Johnson in econ at the same time I was at Princeton for math. He left a lot of overdue charges at the Fine Hall Library and at the dorms as well. I had to deal with all of that.

Jayesh Badwaik

@IssacM Verbose but a little ugly is always better than confusing and with a proper latex shortcut, of the same effort.

Issac M

lol

Jayesh Badwaik

@robjohn
You did the following using binomial theorem I hope?
\begin{equation}
\int_0^x(1-t^2)^{-1/2}\mathrm{d}t=\sum_{n=0}^\infty\tfrac{1\cdot2\cdot3\cdots(2n-1)}{2\cdot4\cdot6\cdots2n}\frac{x^{2n+1}}{2n+1}
\end{equation}

Peter Tamaroff

@JayeshBadwaik Nope. Chuck Testa.

robjohn

@JayeshBadwaik The previous series was from the binomial theorem.

Brian M. Scott

12:41 AM

@robjohn Mark Dominus found it; last I looked, it needed one more vote.

Jayesh Badwaik

@robjohn Damn. What.is.Wrong.With.Me!
Early morning hangover. Need more coffee.

Peter Tamaroff

►

robjohn

@JayeshBadwaik but you're right, before the integration, the sum was gotten from the binomial theorem. I should edit that in.

Jayesh Badwaik

@PeterTamaroff HeeeHaawHeeHaaw :P

Peter Tamaroff

@JayeshBadwaik NOTE: Chuck Testa does not taxidermize pets.

His name his basicall "Chuck Balls"

robjohn

12:44 AM

@JayeshBadwaik There, hopefully that is better.

Jayesh Badwaik

@robjohn yup it is. it was good enough before that too I guess. just did not read the first line properly. but anyway, it is definitely better now.

robjohn

@JayeshBadwaik thanks for the suggestion

Jayesh Badwaik

@robjohn :-)
@PeterTamaroff Hmm. Got that :P

robjohn

1:09 AM

Is the projective plane usually written as $\mathrm{P}^2$ or $\mathbb{P}^2$?

Peter Tamaroff

@robjohn I think the former.

The latter seems to be used for the positive integers, sometimes.

robjohn

@PeterTamaroff Thanks, I am editing an AG post for MathJax

Peter Tamaroff

Yet, it might be just a matter of taste.

robjohn

I am using $\mathbb{R}^2$ for the plane, so I wanted to make sure.

Peter Tamaroff

2:28 AM

@robjohn You there?

I was bored

Jayesh Badwaik

@PeterTamaroff OMFG. That is such a short answer.

@PeterTamaroff That is well written though. Good job.

Peter Tamaroff

@JayeshBadwaik I know. I'll try to be less succint next time.

robjohn

@PeterTamaroff I am now.

Peter Tamaroff

@robjohn Spivak has so many exercises. I will never finish them all. Or at least, all of the important ones.

robjohn

@PeterTamaroff Do you need to do them all?

Peter Tamaroff

2:43 AM

@robjohn Not really, just the important ones. Like this one on the Universal Chord Theorem, of those dealing with density arguments and stuff. The relevant and non trivial ones.

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$Mathematics$ Mathematics