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iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
00:00
@Owatch Can you apply the formula tu turn some exps to sins now ?
ᴇʏᴇs
ᴇʏᴇs
Right, but in my notes it says $-nz_0^{n-1}$ becomes $-z_0^{n-1}$ but I don't see why
Owatch
Owatch
No I can't. I can make $e^{3ix} - e^{-3ix} = 3sin(ax)$, but I don't know if its right, I don't know where to put it.
And remove 2i from denonimator
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
@ᴇʏᴇs it's a typo I believe. Check for $n=2$
@Owatch So we get $\frac{e^{3ix}-e^{-3ix}}{4*2i}-3\frac{e^{ix}-e^{-ix}}{4*2i}$
ᴇʏᴇs
ᴇʏᴇs
@iwriteonpeoplewhowriteonbanana I don't think it's a typo, in my notes I literally wrote "$nz_0^{n-1}$ becomes $-z_0^{n-1}$ because..." and I didn't finish writing because the professor erased the board before I got to write it
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
@ᴇʏᴇs check for $n=2$
@Owatch right ?
OOH nvm
Soo we have $-\frac{e^{3ix}-e^{-3ix}}{4*2i}+3\frac{e^{ix}-e^{-ix}}{4*2i}$
Saal Hardali
Saal Hardali
00:05
Attention all complex analysts
Let $f: \mathbb{C} \to \mathbb{C}$ be an entire function. What can generally be said about curves in $\mathbb{C}$ upon which $arg(f)$ is constant (where the function doesn't change phase).

Do they always exist? Do they have special properties beyond the continuity that we impose?
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
right ?
Owatch
Owatch
How does that give you 8i^3 on bottom?
Where did you get 3 from?
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
it doesn't. There's a factor 1/i missing (in my expression)
Saal Hardali
Saal Hardali
Plus could someone help here?
http://math.stackexchange.com/questions/1183864/generalization-of-the-argument-principle
Owatch
Owatch
Well why is it missing, and why is there a +3 on the second piece?
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
00:07
@Owatch 3 = 2 + 1 (check the factors involved)
Owatch
Owatch
I don't get it.
ᴇʏᴇs
ᴇʏᴇs
@iwriteonpeoplewhowriteonbanana Do you have a website or book for a proof that if $\sum\limits_{n=0}^{\infty} a_n z^n$ has a radius of convergence $R>0$, then $f(x) = \sum\limits_{n=0}^{\infty}$ is holomorphic on the open disk $D(0,R)$, and for all $z \in D(0,R)$, $f'(z) = \sum\limits_{n=1}^{\infty} na_z z^{n-1}$
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
$\frac{e^{3ix}-2e^{ix}+e^{-ix}-e^{ix}+2e^{-ix}-e^{-3ix}}{8i^{3}}=\frac{e^{3ix}-e‌​^{-3ix}} {8i^3}-3\frac{e^{ix}-e^{-ix}} {8i^3}$
@Owatch ^
@ᴇʏᴇs The second part is clear. I don't remember what a holo function is though, mind reminding me ?
Owatch
Owatch
Okay.
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
@Owatch And $i^3=-i$
Thus it's equal to $\frac{1}4(3\sin(x)-sin(3x))$
Owatch
Owatch
00:11
(2+1)(e^ix - e^-ix) gives everything except the cubed e's.
ᴇʏᴇs
ᴇʏᴇs
@iwriteonpeoplewhowriteonbanana A complex-valued function on an open subset of the complex plane is holomorphic (or analytic) if its derivative exists for each element in the subset
Owatch
Owatch
@iwriteonpeoplewhowriteonbanana I do not know this either.
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
@Owatch You don't know complex numbers ?
Owatch
Owatch
I have never seen anything used to simplify this problem. I will fail if I see it again.
I don't know complex numbers.
ᴇʏᴇs
ᴇʏᴇs
@iwriteonpeoplewhowriteonbanana In the proof of this is where the professor turned the $nz_0^{n-1}$ into $z_0^{n-1}$
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
00:12
@Owatch Well then learn $sin^3(x)=\frac{1}4(3\sin(x)-sin(3x))$
ᴇʏᴇs
ᴇʏᴇs
Otherwise it doesn't seem like the proof will work
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
And do the integral with that @Owatch
@ᴇʏᴇs Have you checked the case n=2 ? Does your formula work ?
ᴇʏᴇs
ᴇʏᴇs
@iwriteonpeoplewhowriteonbanana No, which is why I need to compare it to a correct proof but none of my complex analysis books have this proof
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
@ᴇʏᴇs I might have it, but only on R. Let me check.
ᴇʏᴇs
ᴇʏᴇs
Thanks
user159870
user159870
00:16
@iwriteonpeoplewhowriteonbanana It's for a friend of mine, I don't know what definition he uses. I asked him but I don't have an answer yet. How do we get the telescopic series???
ᴇʏᴇs
ᴇʏᴇs
I wouldn't care so much about the proof as the result, but the prof. says he's gonna ask this proof on the exam
Owatch
Owatch
$\frac{1}{4}\int 3xsinx - xsin3x dx$
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
@user159870 Well the definition is like $\sum_\Bbb{m\in\Bbb{Z}} x(m)h(n-m)$
Owatch
Owatch
From $\int xsin^{3}xdx$
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
@ᴇʏᴇs Do you know how to do it on $\Bbb{R}$ ?
It's pretty straighforward
@Owatch Indeed
ᴇʏᴇs
ᴇʏᴇs
00:19
@iwriteonpeoplewhowriteonbanana No, I didn't know what a power series is until today
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
@ᴇʏᴇs Ok so 1st quick lemma : $\sum a_nx^n,\sum na_nz^{n-1}$ have the same ROC
ᴇʏᴇs
ᴇʏᴇs
@iwriteonpeoplewhowriteonbanana Really? This proof took up 2 pages for me (maybe I just write big)
Owatch
Owatch
$\frac{1}{4} \int 3xsinx dx - \frac{1}{4}\int xsin3x dx$
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
Then swap the order of integration @ᴇʏᴇs
done
ᴇʏᴇs
ᴇʏᴇs
@iwriteonpeoplewhowriteonbanana We needed 2 additional lemma including that one
Owatch
Owatch
00:21
These look like two cases of integration by parts?
user159870
user159870
@iwriteonpeoplewhowriteonbanana How do we find $\sum_{m \in \mathbb{Z}} (u(m)-u(m-T))e^{-a(n-m)}u(n-m) $ ?
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
@user159870 Unless we have mire information on $u$, I don't know. I was just hoping that the $u_n$ would telescope.
@Owatch I guess
@ᴇʏᴇs Which ones ? I don't see why you'd need that
ᴇʏᴇs
ᴇʏᴇs
@iwriteonpeoplewhowriteonbanana Lemma 1: Given a power series, there exists an $R$, $0\leq R \leq \infty$ such that $\sum\limits_{n=0}^{\infty} \lvert a_n\rvert \lvert z \rvert ^n$ converges if $\lvert z \rvert < R$ and $\limsup_{n \to \infty} \lvert a_n \rvert \lvert z \rvert ^n = \infty$ if $\lvert z \rvert > R$, and Lemma 2: If $a, b \in \mathbb{C}$, $\lvert a \rvert < \rho$, $\lvert b \rvert < \rho$, then $\lvert b^k - a^k \rvert \leq k\rho^{k-1} \lvert b - a \rvert$ for all $k \geq 0$
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
but lemma 1 is obvious
except maybe for the lim sup part, which is Hadamar's stuff. I never needed lim sup.
ᴇʏᴇs
ᴇʏᴇs
And then we used some corollary of that
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
00:28
I find my way easier q_q
Louis
Louis
@infinitesimal For omega < 1 I see the triangle having greater 180 degrees. When trying to concentrate on the gridlines as a way to see a side curved inwards, I fail to not see them bulging outwards... so I was wondering if there is an error in that image, or if it' fine and I'm just seeing it the way I do which is wrong.
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
Just swap the integration-derivative
ᴇʏᴇs
ᴇʏᴇs
If $r < R$, then the convergence is uniform on the set $\lvert z \rvert \leq r$ and if $z \in \mathbb{C}$ and $\lvert z \rvert < R$, then $\sum\limits_{n=0}^{\infty} a_n z^n$ converges and if $r < R$ then the convergence is uniform on $\lvert z \rvert \leq r$
Owatch
Owatch
$\frac{1}{4}(-3xcosx+3sinx) - \frac{1}{4}(\frac{-xcos3x}{3}+\frac{sin3x}{9}) + c$
ᴇʏᴇs
ᴇʏᴇs
@iwriteonpeoplewhowriteonbanana We don't have integrals yet
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
00:30
Ah.
Semiclassical
Semiclassical
can anyone else make sense of what this question is asking?
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
@ᴇʏᴇs gowers.wordpress.com/2014/02/22/differentiating-power-series
ᴇʏᴇs
ᴇʏᴇs
Thanks @iwriteonpeoplewhowriteonbanana
Mike Miller
Mike Miller
@Semiclassical i doubt it would be a good question even if i could
Conor O'Brien
Conor O'Brien
G'night, all!
ᴇʏᴇs
ᴇʏᴇs
00:35
@iwriteonpeoplewhowriteonbanana Oh, that uses differentiation in $\mathbb{R}$ which I don't think we can use in our complex proof
Semiclassical
Semiclassical
agreed
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
It's awfully late here, i'm off to sleep. Good night !
ᴇʏᴇs
ᴇʏᴇs
Night @iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
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ᴇʏᴇs
ᴇʏᴇs
Thanks for helping
iwriteonpeoplewhowriteonbanana
iwriteonpeoplewhowriteonbanana
00:35
@ᴇʏᴇs Good luck finding a nice proof :-)
Committing to a challenge
Committing to a challenge
Two matrices, $A$, $B$, are similar if some invertible $P$ exists, such that $P^{-1} A P = B$. Does it matter if it were $PAP^{-1}=B$ instead? I think not, but I wonder if it matters when trying to show that similarity is a reflexive relation
$P^{-1} A P = A\implies PAP^{-1} = A \implies P=P^{-1} \implies$ $A $ is similar to $A$
Owatch
Owatch
user image
Solved I think.
Committing to a challenge
Committing to a challenge
Neat handwriting
user159870
user159870
@robjohn @iwriteonpeoplewhowriteonbanana The denition is the infinite sum x(n-k)*h(n)
ᴇʏᴇs
ᴇʏᴇs
@Owatch Do you write slowly
Owatch
Owatch
00:52
I work carefully.
Committing to a challenge
Committing to a challenge
I write so damn fast that noone else can read it :)
It's an auto cipher <3
ᴇʏᴇs
ᴇʏᴇs
I write pretty fast that even I can't read it
Committing to a challenge
Committing to a challenge
Encrpytion by converting letters into squiggles
The decryption method is me reading it out
ᴇʏᴇs
ᴇʏᴇs
Yea my handwriting is just horizontal lines of varying heights
Committing to a challenge
Committing to a challenge
ROFL
Owatch
Owatch
00:53
I often miss signs, ect. And as I solve I write. Since I solve slowly, I have time to print well.
A Beautiful Mind
A Beautiful Mind
Hi, I am still alive.
ᴇʏᴇs
ᴇʏᴇs
Hi @ABeautifulMind
Good to know
Owatch
Owatch
I'm tired. I think I do one more problem. Then go do other stuff.
ᴇʏᴇs
ᴇʏᴇs
@Owatch Other stuff = different math subjects?
Owatch
Owatch
I must find a man called James Stewart.
He is on the front of this book, I have to stop him.
Committing to a challenge
Committing to a challenge
00:56
@ABeautifulMind We are all glad for that.
Owatch
Owatch
No, other stuff does not include math subject.
A Beautiful Mind
A Beautiful Mind
I will be in this chat for one hour, after that I will take a nap.
Committing to a challenge
Committing to a challenge
For exactly one hour?
ᴇʏᴇs
ᴇʏᴇs
@Owatch Did you know he has a mansion worth millions of dollars
Owatch
Owatch
James Stewart has taken away my vacation.
I want to make him pay.
Or anyone else who was involved in writing this book.
A Beautiful Mind
A Beautiful Mind
00:59
@Committingtoachallenge Nope, but approx.
Committing to a challenge
Committing to a challenge
@ABeautifulMind What have you done today?
A Beautiful Mind
A Beautiful Mind
@Committingtoachallenge I have been in a state of great anxiety the entire year, just thinking about the past, present and future mostly.
Committing to a challenge
Committing to a challenge
Lying in bed thinking about these things?
ᴇʏᴇs
ᴇʏᴇs
@ABeautifulMind I hope you think about positive things
A Beautiful Mind
A Beautiful Mind
@Committingtoachallenge Or in other positions.
Committing to a challenge
Committing to a challenge
01:01
You sit there thinking to yourself in your head?
A Beautiful Mind
A Beautiful Mind
@Committingtoachallenge Or talking aloud.
@ᴇʏᴇs Yes, I am trying to do that.
Owatch
Owatch
Think about absolute values. They are always positive.
Committing to a challenge
Committing to a challenge
Talking aloud improves my reasoning abilities
A Beautiful Mind
A Beautiful Mind
I know some people will tell me I should not think so much but should do other things, but this is something I have to go through. If you understand what happened in 33 years of my life, you will understand everything.
ᴇʏᴇs
ᴇʏᴇs
I like to walk while I'm thinking which isn't good for my exam-taking skills
A Beautiful Mind
A Beautiful Mind
01:03
I am trying to make progress, of course, as always.
robjohn
robjohn
@user159870 usually, it is $\sum\limits_{k}x(n-k)h(k)$
A Beautiful Mind
A Beautiful Mind
@Committingtoachallenge and @ᴇʏᴇs are my good friends.
Owatch
Owatch
$\int sin^{3}x cos^{4}x dx$
I convert stuff
$\int sin^{2}xsinx(cos^{2}x)^2dx$
Committing to a challenge
Committing to a challenge
Glad to hear it :). When you start doing Math again, perhaps we can work on a paper :)
A Beautiful Mind
A Beautiful Mind
Honestly I am not even sure if I will be well again, but it is something I hope for every day.
I call something hard to achieve but possible a miracle, and I am trying to achieve this miracle.
@Committingtoachallenge By then you would have won the Fields medal.
Mike Miller
Mike Miller
01:07
@robjohn I am free 10-12 tomorrow. If you are not busy then, maybe that is when we could all meet.
Committing to a challenge
Committing to a challenge
Haha that would be a miracle
I think meeting two other M.SE members simultaneously would make me anxious as hell[in the nervous sense]
A Beautiful Mind
A Beautiful Mind
Do you have social anxiety? I don't.
Committing to a challenge
Committing to a challenge
Yes I do - but I don't take medication for it[I did a long time ago{beta blockers}]
A Beautiful Mind
A Beautiful Mind
I imagine @ᴇʏᴇs and @Committingtoachallenge are very good looking.
Committing to a challenge
Committing to a challenge
@ABeautifulMind Haha nah, I am somewhere in 7-9 depending on who you ask(or a 10 if you ask my more attractive than me girlfriend)
ᴇʏᴇs
ᴇʏᴇs
01:09
@ABeautifulMind I'm ugly as heck
A Beautiful Mind
A Beautiful Mind
One day we will all meet up.
ᴇʏᴇs
ᴇʏᴇs
Even my mom tells me so
Blessoul
Blessoul
Hello
ᴇʏᴇs
ᴇʏᴇs
Hi @Blessoul
How are you
A Beautiful Mind
A Beautiful Mind
@ᴇʏᴇs Your mom is crazy as we all know.
Committing to a challenge
Committing to a challenge
01:10
wut? That is depressing @EYESZ
Blessoul
Blessoul
Hi @ᴇʏᴇs
Doing well, going crazy over my advanced combinatorics class.
what about you guys?
A Beautiful Mind
A Beautiful Mind
You have not become crazy until you reach my stage.
Committing to a challenge
Committing to a challenge
Doing my algebra assignment
(still)
Blessoul
Blessoul
lol, do you happen to know combinatorics and might be able to help me with a problem?
Committing to a challenge
Committing to a challenge
I don't happen to know combinatorics(sorry)
Blessoul
Blessoul
01:12
Oh man
no need to be sorry
Committing to a challenge
Committing to a challenge
Do you happen to know abstract algebra?
Blessoul
Blessoul
whats the problem
ᴇʏᴇs
ᴇʏᴇs
Hi @Ted
Ted Shifrin
Ted Shifrin
hi mr eyeglasses
A Beautiful Mind
A Beautiful Mind
Hi Ted, he is Bart.
Ted Shifrin
Ted Shifrin
01:14
I don't think we should put too much faith in your book-burning mother.
A Beautiful Mind
A Beautiful Mind
@ᴇʏᴇs is Bart and @Committingtoachallenge is Alex. And you know who I am @ted.
Ted Shifrin
Ted Shifrin
I like the name mr eyeglasses :P
Mike Miller
Mike Miller
eyebrows
Ted Shifrin
Ted Shifrin
@Mike, don't you have a lecture to prepare?
ᴇʏᴇs
ᴇʏᴇs
lol
Mike Miller
Mike Miller
01:15
Doing so
Now that I have the right version of this paper...
Ted Shifrin
Ted Shifrin
Did anyone answer your question on MO? And is Pedro in the vicinity yet?
oh, there were multiple versions?
Committing to a challenge
Committing to a challenge
Let $k$ and $N$ be positive integers and suppose $k\leq N$. Let $W(k)$ denote the vector space spanned by vectors $V_S$ where $S$ ranges over subsets of $\{1,\dots, N\}$ of size $k$.

For $S\subset \{1,\dots,N\}$, let $S^c$ denote the complement. Show that the map sending $V_S$ to $V_{S^c}$ defines an isomorhism of vector spaces $W(k) \to W(N-k)$
Is what I am working on @Bless
Well its a subquestion but that's a closed form question
Good old first week assignments that are too hard
Mike Miller
Mike Miller
Yes - Ruberman (one of the topology students here is going to do a postdoc with him) commented, saying the desired theorem is proved in section 22, and exposited it a bit. Now, the paper I was looking at was 4 pages long, and I didn't think you could fit 22 sections in it.
Ted Shifrin
Ted Shifrin
Do you have a fixed set $V$ of $N$ vectors to start with, @Committing?
Mary Star
Mary Star
@TedShifrin Could you take a look at math.stackexchange.com/questions/1187196/…? ??
Mike Miller
Mike Miller
01:16
Turns out I was reading a version published in the Bulletin...
Ted Shifrin
Ted Shifrin
Ah, Ruberman's another grad school compatriot, @Mike ... actually heard from him recently.
Mike Miller
Mike Miller
where he just announced the results, of course. I was upset that Gluck seemed to think the result was so trivial, since he wrote it in two lines!
thank the lord it's not ALL my fault :)
user159870
user159870
@robjohn $\sum\limits_{k}x(n-k)h(k)= \sum\limits_k (u(n-k+2)-u(n-k-2) \left( \frac{1}{2} \right)^{|n|}$
The Heaviside function gives the unit step signal(t).
Do do we continue with the sum???
A Beautiful Mind
A Beautiful Mind
My favourite line from my favourite movie is 'it is not your fault'.
Ted Shifrin
Ted Shifrin
@MaryStar: I have no idea what the intersection refers to in your question. You have got to stop asking us every single one of your homework questions.
A Beautiful Mind
A Beautiful Mind
01:19
@TedShifrin She is a star just like me.
Committing to a challenge
Committing to a challenge
342 questions holy moly @MAry
Ted Shifrin
Ted Shifrin
Everything is always your fault, @Mike. :P
Mike Miller
Mike Miller
Aw.
Committing to a challenge
Committing to a challenge
@TedShifrin Nope
Ted Shifrin
Ted Shifrin
Oh right, a few things are @Committing's fault.
Committing to a challenge
Committing to a challenge
01:20
Noooo I was noing the previous thing follow the arrow haha
Don't make things my faultttt
Philip Hoskins
Philip Hoskins
If M, N are smooth manifolds and F from M to N is a submersion, then every smooth vector field Y on N has a lift X on M. But why is it the case that if F is not a diffeomorphism, then this lift is not unique?
A Beautiful Mind
A Beautiful Mind
@Committingtoachallenge Holy Mary.
Ted Shifrin
Ted Shifrin
Then it seems to me $W(k)$ is the entire vector space, if I can pick any $k$ vectors I want each time, @Committing. That problem sucks.
Committing to a challenge
Committing to a challenge
@MaryStar You have 4 questions today!? Do you think about them before posting them?
A Beautiful Mind
A Beautiful Mind
@Committingtoachallenge youtube.com/watch?v=GtkST5-ZFHw here.
Ted Shifrin
Ted Shifrin
01:22
Because you can add to $X(p)$ any vector in $\ker(dF_p)$, @Philip.
ᴇʏᴇs
ᴇʏᴇs
@ABeautifulMind I cried
Mike Miller
Mike Miller
@PhilipHoskins Try the most trivial example: $\Bbb R \to \{pt\}$. Then every vector field on $\Bbb R$ is a lift of the (only) (trivial) vector field on the point. This is prototypical of what's going on in general.
ᴇʏᴇs
ᴇʏᴇs
RIP Robin Williams
Committing to a challenge
Committing to a challenge
@TedShifrin I haven't been working on this one long, so maybe I don't fully understand it, I will show you my proof when I finish it(just so you can see if it was a bad question in the end)
after I hand in of course, I don't want to get in trouble haha
Mary Star
Mary Star
@Committingtoachallenge I ask something specific at each question. I have tried something and asked at the point I got stuck...
Ted Shifrin
Ted Shifrin
01:23
Perhaps I don't understand the question, @Committing. That's why I asked if you had a fixed set of vectors to start with, but even then, if you can pick any $k$ of them, you will generate their entire span if you get to choose all possible $k$-tuples.
A Beautiful Mind
A Beautiful Mind
@ᴇʏᴇs Have you watched the whole movie?
Committing to a challenge
Committing to a challenge
@Mary really? That's what you do?
A Beautiful Mind
A Beautiful Mind
@Committingtoachallenge Maybe she got stuck at the start, that's possible.
@MaryStar I admire your spirit. Are you planning on becoming a mathematician though?
Mary Star
Mary Star
Yes!! @ABeautifulMind
Ted Shifrin
Ted Shifrin
Oh, I see, $V_S$ is chosen for a fixed $k$-tuple $S$. I'm still confused. You needn't choose linearly independent vectors. Agh.
Philip Hoskins
Philip Hoskins
01:26
@TedShifrin Okay, that was pretty much what I thought. But, just to be clear, dF_p only makes sense locally where we can ensure $F$ is surjective, right? For example, if I take a very small coordinate cube of M, then F will map onto some small coordinate cube of N by the Rank Theorem.
A Beautiful Mind
A Beautiful Mind
@MaryStar OK. I think you will need to work very hard to achieve that, good luck.
Ted Shifrin
Ted Shifrin
@Philip: No, if you have a map $F\colon M\to N$, $dF_p\colon T_pM\to T_{F(p)}N$ is defined independent of charts.
Karl Kronenfeld
Karl Kronenfeld
@Committingtoachallenge You said it is a subquestion of something. By any chance are any of the things you use defined in that primary question?
Ted Shifrin
Ted Shifrin
No hypothesis on $F$ other than smoothness.
Karl Kronenfeld
Karl Kronenfeld
Hi @Ted @Mike
Ted Shifrin
Ted Shifrin
01:27
heya @Karl
Mike Miller
Mike Miller
morning karl
Committing to a challenge
Committing to a challenge
@TedShifrin Assumed linearly independent is he said in class briefly(without updating the assignment)
A Beautiful Mind
A Beautiful Mind
Whenever Karl comes, I get confused with Arkamis and Ed.
Philip Hoskins
Philip Hoskins
@Ted: But You don't know that dFp(X) will be a vector field on N.
Owatch
Owatch
I think I solve.
Easy
Karl Kronenfeld
Karl Kronenfeld
01:28
@MikeMiller You figured me out.
Owatch
Owatch
user image
Ted Shifrin
Ted Shifrin
LOL, @Committing ... oh, isn't he helpful :P
A Beautiful Mind
A Beautiful Mind
@Owatch Very nice handwriting.
Committing to a challenge
Committing to a challenge
@KarlKronenfeld The only other subquestion prior was find dimension of W(k)
Ted Shifrin
Ted Shifrin
@Philip: I was assuming you had defined a smooth lift $X$ and was explaining why it needn't be unique.
Mike Miller
Mike Miller
01:29
@Karl: Are you willing to tell me if you're an undergrad or not?
Owatch
Owatch
thankyou
Karl Kronenfeld
Karl Kronenfeld
@MikeMiller Yeah, I am an undergrad.
Mike Miller
Mike Miller
Willing to say what year, or am I pushing it?
Karl Kronenfeld
Karl Kronenfeld
First year
Mike Miller
Mike Miller
whoaly moly
Ted Shifrin
Ted Shifrin
01:29
@Owatch: Neatness really does help in mathematics. I once had a student who got a D from me in one course ... he couldn't even read his own work. I forced him to be neater, and he improved to a C in the next course (which was harder). I think I have the grades right.
A Beautiful Mind
A Beautiful Mind
I thought you finished undergrad long ago @KarlKronenfeld? Maybe I forgot.
Philip Hoskins
Philip Hoskins
@TedShifrin Yes, but to show the existence of the lift, I needed to work locally. So, if I want to make a vector field that gets killed by dF, I'm guessing I would have to also work locally. Is there a way to construct the lift by starting globally?
Owatch
Owatch
Thank you for inspiration.
Committing to a challenge
Committing to a challenge
@KarlKronenfeld Lies haha
Or trick answer
Mike Miller
Mike Miller
@Committingtoachallenge Well, there's no reason to believe he's not.
A Beautiful Mind
A Beautiful Mind
01:30
@TedShifrin Better handwriting = better grades. Now all I need is to hand in a blank sheet and I get an A+.
Committing to a challenge
Committing to a challenge
@MikeMiller Except he has been on M.SE for 2 years has has 86 points in abstract algebra
ᴇʏᴇs
ᴇʏᴇs
@ABeautifulMind Yes I watched the whole film
Karl Kronenfeld
Karl Kronenfeld
@Committingtoachallenge Because I am concerned with people's perceptions of first-year undergrads in relation to me. /sarcasm
Ted Shifrin
Ted Shifrin
@Philip: You're right that you need to work locally to get a lift. I don't know how fancy you are, but because $F$ is smooth and has constant rank, $\ker dF$ defines a vector subbundle of $TM$ and you can take any smooth section of it.
ᴇʏᴇs
ᴇʏᴇs
@ABeautifulMind Would you defend me if I was making a fool out of myself like in the bar scene
Ted Shifrin
Ted Shifrin
01:31
Jasper, I'll let you look for the fallacy ...
A Beautiful Mind
A Beautiful Mind
@ᴇʏᴇs If I could, I would.
Karl Kronenfeld
Karl Kronenfeld
@Committingtoachallenge Oh I think I get it. Still a shitty question, if so.
Ted Shifrin
Ted Shifrin
@Karl: It seems we all thought you were a graduate student at this point, despite your coy behavior :P
Committing to a challenge
Committing to a challenge
The guy is pretty impressive(the lecturer) surely he wouldn't give shit questions right
Mike Miller
Mike Miller
@Ted: My topology professor couldn't read my handwriting. He told me to give him something legible or he wouldn't read it, and would just give it a 0. He suggested LaTeX. And that's the story of how I learned LaTeX.
A Beautiful Mind
A Beautiful Mind
01:32
And you guys know all about me, no need for more info.
Karl Kronenfeld
Karl Kronenfeld
@TedShifrin My childishness should have set you all straight.
Mike Miller
Mike Miller
Ted and I are perhaps more childish than ye.
Owatch
Owatch
coy: (especially with reference to a woman) making a pretense of shyness or modesty that is intended to be alluring.
Committing to a challenge
Committing to a challenge
@KarlKronenfeld You are listed as 22?
Owatch
Owatch
He said you are a woman karl.
Karl Kronenfeld
Karl Kronenfeld
01:33
ok, enough questions.
Ted Shifrin
Ted Shifrin
don't be sexist, @Owatch: Men can be plenty coy.
Owatch
Owatch
What are you going to do about that?
A Beautiful Mind
A Beautiful Mind
@MikeMiller That's very nasty of him.
Mike Miller
Mike Miller
No it's not.
ᴇʏᴇs
ᴇʏᴇs
I started using LaTeX in community college because I thought it looked cool
Committing to a challenge
Committing to a challenge
01:33
Lot's of chat
Owatch
Owatch
@TedShifrin It's definition, I didn't write.
Ted Shifrin
Ted Shifrin
Your dictionary is old-fashioned and sexist :P
ᴇʏᴇs
ᴇʏᴇs
Handed in all my homeworks in LaTeX and felt cool because everyone was jealous of how pretty it looked
A Beautiful Mind
A Beautiful Mind
You have used LaTeX, but have you used latex? LOL.
ᴇʏᴇs
ᴇʏᴇs
@ABeautifulMind pls
@ABeautifulMind I wear latex gloves whenever I eat pizza because I don't want to get oil on my hands
Ted Shifrin
Ted Shifrin
01:34
mr eyeglasses, please smack him.
on second thought ...
ᴇʏᴇs
ᴇʏᴇs
lol
Owatch
Owatch
user image
Ted Shifrin
Ted Shifrin
Get back to your integrals, @Owatch.
A Beautiful Mind
A Beautiful Mind
Please don't flag me, I have been suspended too many times. 6 already, lol.
Ted Shifrin
Ted Shifrin
There's no call for flagging.
Owatch
Owatch
01:35
Yes Herr Feldmarschall Ted.
Ted Shifrin
Ted Shifrin
As one many of whose relatives died in the concentration camps, @Owatch, I'm not sure I appreciate your humor.
Mike Miller
Mike Miller
@Abe It's not against the rules to make jokes that aren't funny, or they'd have kicked me out long ago.
2
ᴇʏᴇs
ᴇʏᴇs
I want to strengthen my differentiation/integration skills so I can take differential geometry in 2 years
Philip Hoskins
Philip Hoskins
@TedShifrin Ok I had to think about that for a minute but it makes sense now. This is all still a foreign language for me.
A Beautiful Mind
A Beautiful Mind
But let's say that this room is very flag prone, lol.
Philip Hoskins
Philip Hoskins
01:36
Thanks for the help.
Ted Shifrin
Ted Shifrin
mr eyeglasses, it's your multivariable calculus and linear algebra skills you need ... and, depending on who teaches it at what level, differential equations occasionally or more advanced multivariable analysis.
Mike Miller
Mike Miller
@Phil: Also, note that your statement wasn't quite right. We just need it to be a local diffeomorphism to have a unique lift.
Ted Shifrin
Ted Shifrin
@Philip: Of course, to get smooth sections of vector bundles, I suppose we have, abstractly, to take local ones (coming from local triviality) and glue them together with partitions of unity. So you really win the argument :P
Owatch
Owatch
Feldmarschall is not a position that implies involvement in WW2 tragedies.
But I apologize.
ᴇʏᴇs
ᴇʏᴇs
@TedShifrin The chair who also taught the course says I should be comfortable with tensor and exterior algebra, change of variables formulas for multiple integrals, and existence and uniqueness theorems for ODEs
Ted Shifrin
Ted Shifrin
01:38
Yes, @Owatch, I know what a field marshall is ... However, the German tone ...
Philip Hoskins
Philip Hoskins
@MikeMiller Oh that's right, as long as dF_p is invertible in some neighborhood of each point, it'll be unique.
Owatch
Owatch
Implies strictness
Ted Shifrin
Ted Shifrin
mr eyeglasses, that sounds like a graduate course in manifolds, not an introductory undergraduate differential geometry class. For the graduate course, you absolutely need the inverse function theorem and multivariable analysis.
Philip Hoskins
Philip Hoskins
@Mike I mean dF_p is invertible for all p in some chart. Sorry
Mike Miller
Mike Miller
No need to apologize. I thought what you originally said was perfectly clear.
Ted Shifrin
Ted Shifrin
01:39
@Philip: Again, the linear map $dF_p$ does not need a chart to define. :)
mr eyeglasses, who is the chair to whom you refer? I'm curious.
Mike Miller
Mike Miller
He's actually just a large chair
He gets very uncomfortable when students sit on him
as do we all.
ᴇʏᴇs
ᴇʏᴇs
@TedShifrin Do you have any recommended texts for tensor/vector analysis, etc. that I can read over the next couple years to prep me for this course
Ted Shifrin
Ted Shifrin
smacks @Mike
ᴇʏᴇs
ᴇʏᴇs
@Ted Józef Dodziuk
Ted Shifrin
Ted Shifrin
mr eyeglasses, no, I would recommend you find an undergraduate differential geometry course first and then take a multivariable analysis course and point-set topology.
Ah, I know him.
ᴇʏᴇs
ᴇʏᴇs
01:42
Actually I don't think he's the chair anymore
Ted Shifrin
Ted Shifrin
He was a postdoc at MIT when I was an undergrad there ... so he's getting old :P (I think I have that right.)
ᴇʏᴇs
ᴇʏᴇs
Yea, he was a Moore Instructor
A Beautiful Mind
A Beautiful Mind
Not Moron Instructor?
Philip Hoskins
Philip Hoskins
@TedShifrin That's clear. I was only referring to it locally because that's where I was working to get that the lift will be unique when F is a local diffeo.
Mike Miller
Mike Miller
@Ted: In lots of old topology papers, a (codimension $k$) smooth embedding of $S$ is defined as one that can be thickened to a neighborhood $S \times D^k$. But what we now call smoothly embedded surfaces in 3-manifolds can be 1-sided just fine. Funny how terminology evolves.
Ted Shifrin
Ted Shifrin
01:43
right, @Philip ... You've got it :)
I'm confused, @Mike. If you have a non-orientable surface, you can still take a tubular neighborhood.
Mike Miller
Mike Miller
You're right. Let me edit to the correct statement.
Ted Shifrin
Ted Shifrin
Well, the original definition agrees with mine for what the local structure of an embedding is. I guess I still don't understand your 1-sided option. How do you have a one-sided tubular neighborhood unless you're talking about the boundary?
ᴇʏᴇs
ᴇʏᴇs
@Ted Your multivariate calc text isn't enough analysis for the graduate differential geometry course is it?
A Beautiful Mind
A Beautiful Mind
The people in math chat are much nicer than those in Eng chat.
Mike Miller
Mike Miller
@Ted If you embed something with nontrivial normal bundle.
Ted Shifrin
Ted Shifrin
01:46
mr eyeglasses, yeah, it probably is. You still need tensors, though, and more topology.
ᴇʏᴇs
ᴇʏᴇs
@Ted I am taking a topology course next year so that's set
Ted Shifrin
Ted Shifrin
OK, so let's look at $\Bbb RP^2$ in $\Bbb RP^3$, @Mike.
Philip Hoskins
Philip Hoskins
Ok cool. Thanks very much @Ted and @Mike
Ted Shifrin
Ted Shifrin
Good to see you again, @Philip.
The tubular neighborhood theorem still gives you a neighborhood of the zero-section as diffeo to a neighborhood in the ambient manifold.
Mike Miller
Mike Miller
@Ted: That has nontrivial normal bundle, and the tubular neighborhood is homeomorphic to the (open) unit disc bundle. We delete our copy of $\Bbb{RP}^2$ in this and we get something connected.
Ted Shifrin
Ted Shifrin
01:48
Oh, I see, your $S\times D^k$ was a global product structure, so, yes, that happens only for trivial normal bundle. So I don't agree that that's the definition of embedding.
Mike Miller
Mike Miller
Not anymore, no. :P
Ted Shifrin
Ted Shifrin
Embedding meant trivial normal bundle? I don't recall ever seeing that.
Was that back when the dinosaurs roamed the manifold earth?
Mike Miller
Mike Miller
Well, not that old - this is in a paper from '62.
Ted Shifrin
Ted Shifrin
Maybe they were doing something with tame embeddings or something
In the differentiable manifold setting, it's never meant that.
Mike Miller
Mike Miller
What is probably likely is that implicit in the author's mind is the case of a codimension 1 orientable thing.
Certainly that's the only case needed here.
Ted Shifrin
Ted Shifrin
01:51
Yeah, don't over-generalize from this. I don't think it was used in general settings that way.
As far as I know, embedding always meant diffeo to its image :P
Mike Miller
Mike Miller
This is about tame stuff, though. What's written here is "an embedding is said to be smooth if..."
That's what I was saying I was amused by.
Ted Shifrin
Ted Shifrin
I think this is local terminology ...
Committing to a challenge
Committing to a challenge
@ABeautifulMind We rock
Mike Miller
Mike Miller
Local to the paper, or local to a point?
Ted Shifrin
Ted Shifrin
If you look at Milnor's differential topology lectures from the late 50's or early 60's (which I have somewhere), I think he is consistent with modern use.
local to the paper, @Mike.
Mike Miller
Mike Miller
01:52
fair 'nuff
Ted Shifrin
Ted Shifrin
Yeah, Milnor's 1958 lectures say embedding = immersion that is a homeomorphism to its image.
Committing to a challenge
Committing to a challenge
It will have been an hour, so nap time @Abe
Mike Miller
Mike Miller
Thanks for checking, @Ted.
I have probably spent too much time goofing off in here. Back to the cave.
Ted Shifrin
Ted Shifrin
You had me worried ... Bubye. Say hi to Pedro in the morning.
ᴇʏᴇs
ᴇʏᴇs
Morning @Mike
A Beautiful Mind
A Beautiful Mind
01:55
@Committingtoachallenge I am thinking if I should go now or wait another hour.
Committing to a challenge
Committing to a challenge
Cya @Mike
Mike Miller
Mike Miller
I won't see Pedro for a continuum of mornings from now, @Ted, given it's always morning in LA
Committing to a challenge
Committing to a challenge
@Mike À plus tard
Ted Shifrin
Ted Shifrin
well, I won't tell you to say good night to Pedro :)
Committing to a challenge
Committing to a challenge
@ABeautifulMind I will be gone in an hour for an hour
Ted Shifrin
Ted Shifrin
01:56
A bientôt, @Committing.
A Beautiful Mind
A Beautiful Mind
@Committingtoachallenge That means now?
Committing to a challenge
Committing to a challenge
@ABeautifulMind in an hour for the following hour
@TedShifrin Le close enough(sic[it's a meme])
A Beautiful Mind
A Beautiful Mind
@Committingtoachallenge I think I will wait another hour.
Committing to a challenge
Committing to a challenge
@Ted Am I just trying to count the number of subsets of size $k$ of $\{1,\dots,N\}$ for the dim(W(k))?
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