Mathematics - 2014-05-31 (page 2 of 3)

GitaarLAB

4:00 PM

dear experts, is my question above really that hard?

so hard it cant even be identified and named?

Daniel Fischer

Okay, I haven't come to butter sandwiches, but I'm going to cook dinner. See you later.

N3buchadnezzar

@DanielFischer For a finite topological space $\{ \emptyset , \{b\} , \{a,b\} , \{ b , d\} , \{a , b , d\} , \{ b,c,d\} , X \}$, what is the easiest way to calculate the boundary of the set $\{ a,b,c\}$ in $(X,\mathcal{O})$? =)

G.T.R

@DanielFischer :D

Pedro Tamaroff

@N3buchadnezzar Use the definition of boundary.

It is $\overline{A}\cap\overline {X-A}$.

Daniel Fischer

@N3buchadnezzar $\overline{\{a,b,c\}} \setminus \{a,b,c\}^{\Large\circ}$

Pedro Tamaroff

4:02 PM

Also ^ dat

circ?

Interior.

Interior.

JINX.

High five, @Pedro.

4:05 PM

@PedroTamaroff $\overline{A} \cap \overline{X - A} = \{ d \} \cap \overline{ \{a,b,c,d\} - \{ a,b,c\} } = \{ d \} \cap \overline{ \{ d \}}$ Something like this?

Pedro Tamaroff

@DanielFischer ^5

r9m

@Chris'ssis That is Purely AWESOME .. I simply love the second step .. (I've seen something similar to the second step in a proof of Jensen's Inequality .. extending from to $2$ to $n$ variable ) :D ..

Daniel R

Hmm, I was logged in here a couple of days ago, but I'm still getting pinged in the SE iPhone app when someone writes @Daniel to address Daniel Fischer. Who do I bribe to get rid of that behavior?

Chris's sis

@r9m I'm glad to hear that. I hope I'm AWESOME too. :-)

Pedro Tamaroff

@DanielR Your two usernames coincide, so you'd have to change your username.

r9m

4:13 PM

@Chris'ssis You sir(/Madam) is Awesomeness !! :P

Chris's sis

:-)))

Daniel R

@Pedro Sure, but I was hoping logging out from the chat room (by shutting down computer) would be sufficient.

N3buchadnezzar

The closure should be $\{a,b,c,d\}$ since $d$ is a limit point of $b$. But we have to remove the interior points. Note that $c$ is a limit point of $b$, and hence not in the interior. Therefore the boundary of $\{a,b,c\}$ is $\{c,d\}$. Correct?

Chris's sis

@r9m By the way, you simply don't need to miss this one $$\int_0^{\pi/4} \frac{\sin(\sin(x))}{\sin(x)} \ dx +\sqrt{2}\sin\frac{1}{\sqrt{2}}-1\le \int_0^{\pi/4} \cos(\sin(x)) \ dx \le \int_0^{\pi/4} \frac{\sin(\sin(x))}{\sin(x)} \ dx$$ Its simplicity is merely mind-blowing.

@r9m I love this one!

Swadhin

Hello everyone, I am really having doubt understanding this question. Please help me. math.stackexchange.com/questions/816151/balkan-mo-problem

ಠ_ಠ

4:23 PM

We are offline

N3buchadnezzar

@ಠ_ಠ ._.

r9m

@Chris'ssis aah .. I still couldn't do it .. :( .. ! gimme some time .. :P

Chris's sis

@r9m Take your time! No hurry! :-)

brb - I need to buy some food for pets

N3buchadnezzar

Interior crocodile alligator

GitaarLAB

Is there maybe a better chatroom where someone could give me a push in the right direction? I can't believe the only way to find an equation for a simple sequence of 6 is to think of random equations, fill them with random values and execute them untill one stumbles over the sequence one is looking for :(

Ted Shifrin

4:29 PM

Hello @Daniel @Pedro @Gabriel @mr eyeglasses

Mike Miller

hello

Ted Shifrin

@GitaarLAB: Have you tried this?

r9m

@Swadhin You can look into Mathematical Olympiads (1996-1997,1997-1998): Problems and Solutions from around the World by Titu Andreescu, Kiran Kedlaya, Paul Zeitz .. I don't remember if they have solutions to the Balkan MO too (I lost all my e-books recently after my hard drive crashed :( )

Ted Shifrin

Howdy @Mike

GitaarLAB

@TedShifrin Yes

but thank you for the suggestion :)

Ted Shifrin

4:32 PM

Then we're not going to be more helpful ....

To mathematicians, no finite number of terms will uniquely determine a sequence.

GitaarLAB

I don't even know what it's called that I'm doing, I don't even know what to google :(

Pedro Tamaroff

@GitaarLAB Unless you have a "rule", no finite number of terms determine a sequence.

A sequence, by definition, is determined by specifying each element.

ಠ_ಠ

Hi @Ted

G.T.R

Salut @Ted, tu connais les Tontons Flingueurs ?

N3buchadnezzar

@TedShifrin An infinite number of mathematicians walk into a bar, the first orders a pint, the second half a pint, ...

GitaarLAB

4:35 PM

isn't the 'rule' equal to the equation (if such an equation is possible for the sequence I'm looking for)?

Pedro Tamaroff

@GitaarLAB What do you mean by equation? Something like $a_n=a_{n-1}+a_{n-2}$?

A recursion?

Ted Shifrin

Non, @Gabriel, malheureusrment pas.

Indeed @N3

GitaarLAB

as a 'programmer' I think of an equation to be something like: a+b/c etc. I think of a function like: something that contains, if /else, conditions etc.

Ted Shifrin

Programmers do recursion all the time.

Mike Miller

@N3buchadnezzar An infinite number of mathematicians walk into a bar. The first orders a pint, the second orders two pints, the third three pints, and so on. The bartender says "you're all a bunch of idiots" and pours them $-\frac 1{12}$ of a beer.

Ted Shifrin

4:38 PM

slaps @Mike

ಠ_ಠ

LOL

GitaarLAB

say I have the (repeating) input-values of {0,1,2,3,4,5} (aka, n mod 6), why cant I find an equation that ouputs {1,0,5,5,5,5} or {1,0,3,2,1,0}

Mike Miller

alternatively

N3buchadnezzar

@GitaarLAB Should it be defined for non integer values?

Mike Miller

an infinite number of mathematicians walk into a bar. They all say "ouch!"

Ted Shifrin

4:41 PM

A formula in terms of $n$ mod $6$?

GitaarLAB

@N3buchadnezzar N will alway's be a positive integer

Mike Miller

you can find such a formula, but I'm not convinced it would be helpful

N3buchadnezzar

@GitaarLAB Why would you need an equation btw, and not just use cases, or if ?

Ted Shifrin

Oh, @Studentmath woke up.

GitaarLAB

@MikeMiller I still want to learn and understand how I could solve such a problem

Studentmath

4:43 PM

Sadly, I did.. Hey Prof. @Ted, @N3b

N3buchadnezzar

@GitaarLAB Well I have a sort of solution

Ted Shifrin

It's sad, @Studentmath?

GitaarLAB

@N3buchadnezzar Please share (if only what I should google)

N3buchadnezzar

Firstly you force the number into your range, eg $x = p \mod n$

Studentmath

In the good sense - had a great sleep, then had a phonecall.

N3buchadnezzar

4:44 PM

You remove a multiple of $n$, untill you reach exactly it or below.

You then fit a polynomial to your data

Ted Shifrin

Well, a phone call at 8 pm isn't exactly rude :)

GitaarLAB

@N3buchadnezzar What is the meaning of $ (so I don't mis-interpret)?

ಠ_ಠ

Yea, my advisor prefers I phone him at 8pm when he gets home and finishes dinner

Studentmath

Haha, yes, I have nothing to complain about - though he should've certainly known that I sleep U.S. time.

N3buchadnezzar

@GitaarLAB Writing latex in chat, just ignore it

GitaarLAB

4:46 PM

It's like we put code between ` on SO ? Ok.

N3buchadnezzar

For {1,0,3,2,1,0} we have n = 6. So we need a polynomial of degree p = n + 1 = 7.

GitaarLAB

@N3buchadnezzar n is the random integer input value?

(and thank you for helping!!!)

N3buchadnezzar

@GitaarLAB Just the number of terms

GitaarLAB

@N3buchadnezzar terms are the distinct values in my repeating target-range?

N3buchadnezzar

So we have p(x) = a0 + a1 x + a2 x^2 + ... + a7 x^7
with initial condition a(1) = 1 , a(2) = 0 , ... , a(6) = 0

@GitaarLAB yeh

Six equations with 6 unkowns, this system can easilly be solved by iteration / reduction

GitaarLAB

4:51 PM

@N3buchadnezzar Ok, deal, and p = 'polynomial of degree'. Got that. Now I'm parsing your next 2 lines.

Studentmath

Prof. @Ted, wanted to ask you - do you know any good books taking single-variable and multi-variable calculus knowledge from incomplete level to $\delta - \epsilon$ level? If that makes sense at all..

N3buchadnezzar

I guess it would be easier to do a(6)=a(0) = 0

Ted Shifrin

@Studentmath: Not sure exactly what you're wanting. I would suggest Spivak and my multi book (which does all the analysis, too).

GitaarLAB

I assume ... is repetition of previous logic. What is a and x?

Ted Shifrin

@N3 @GitaarLAB: Lagrange interpolation

GitaarLAB

4:55 PM

@TedShifrin so Lagrange interpolation is what I'm doing and should google?

Ted Shifrin

It's what @N3 has led you to ...

Studentmath

I've been having my eye on your multi-book for a long time (especially due to the use of linear algebra).. will check Spivak too, thanks! What I mean is that many of the proofs given to me in both my calculus courses were inadequate, not in $\delta - \epsilon$ 'langauge'. For example, when discussing on what range $R$ can you do double integral to compute the area, they simply state 'simple range' without elaboration, saying it is beyond the level of the course..

@Gitaar may I ask what it is for?

GitaarLAB

@TedShifrin Ok, thank you! Will definitely look into it (since I want to understand this).

Ted Shifrin

Yeah, @Studentmath, that's pretty standard. But I have computational stuff plus all the proofs.

GitaarLAB

@Studentmath Yes, you may ask hihi, but I still want to understand how to solve such problems in the future. I explained a couple of hours ago in the chat, can I link there somehow?

Ted Shifrin

4:58 PM

Also, somewhat more idiosyncratic and sophisticated, look at Hubbard and Hubbard. @Studentmath

Studentmath

I will scroll up @Gitaar :)

GitaarLAB

3 hours ago, by GitaarLAB

I usually have no problem thinking out of my box, but this rare occasion has me 'punching holes in the dark' so to say.

Studentmath

Thanks @Ted, I will check all of them out

@Gitaar, ah, curiousity :P

GitaarLAB

@Studentmath Well I do have one to solve now, but It's not like I'm thinking 'just gimme the answer', I really do want to learn how to come up with related solutions in the future.

@N3buchadnezzar Would you be willing to continue your explanation or shall I first read into this Lagrange interpolation that was mentioned?

@Studentmath Yeah, and I'm sorry for the cat (that got killed by my curiosity) :)

Studentmath

Yeah, it's important. Learning the logic behind really helps, even grade-wise if the question-writer does the tests too. Haha :P

N3buchadnezzar

5:11 PM

@GitaarLAB Heya

(197/10)*x-(1117/30)*x^2+(605/24)*x^3-(185/24)*x^4+(131/120)*x^5-(7/120)*x^6

GitaarLAB

@N3buchadnezzar I was already reading matematicasvisuales.com/english/html/analysis/interpolacion/…

N3buchadnezzar

@GitaarLAB I was able to write q quick script to produce such equations =)

GitaarLAB

@N3buchadnezzar is this equation for one of the sequences? (and x is the input-value?) What am I looking at?

Studentmath

@Ted I will take Spivak's and your Multivar book :) Thanks once again! Found myself another dealing for the summer

N3buchadnezzar

@GitaarLAB x is the input it produces the [ 1 0 3 2 1 0 ] case

GitaarLAB

5:17 PM

wow, thx, That's a 'heavvy' equation.. How did you come up with that?

Ted Shifrin

Another dealing? @Studentmath

Studentmath

Occupation would be a better English word, I guess

N3buchadnezzar

@GitaarLAB Polynomial fitting

Ted Shifrin

Ah, job ;)

What year in univ are you, @Studentmath?

GitaarLAB

@N3buchadnezzar Another google term, thanks! I'm taking a couple of minutes to plug it into my script.

Studentmath

5:20 PM

Hard to explain, 4th year but I had a 'major' in Chemistry before turning to Math.

GitaarLAB

@Studentmath That's a nice practical link!! Math and Chemistry!

Ted Shifrin

That happens @Studentmath ...

I've had a number of students do a double major in math and chem.

Studentmath

Yes, I am not sorry I started with Chemistry at all :) But Math just lured me in, was more challenging.

What did they usually go on to do afterwards?

Ted Shifrin

@GitaarLAB: but be warned you will not likely get integer outputs when you put in integers $>6$ ...

N3buchadnezzar

@GitaarLAB Hey

You can do it as simple as this, if you are programming

*function [ y ] = Sequence( y )

S = [0,1,3,2,1,0];
n = length(S);

y = S(mod(y,n));

end*

Ted Shifrin

5:23 PM

There is no "usually," @Studentmath. Some decided to teach high school math. Some did grad school in chem. Some got a real world job.

Studentmath

Interesting. Any you recall went on to grad school in Maths?

Ted Shifrin

No, but one of my colleagues did that :)

N3buchadnezzar

@GitaarLAB A little mistake in the code above, but I think you can fix it ;)

Ilan Aizelman WS

Hey everyone! I'm back for some more questions! It's really appreciated if you can take a look and help me. math.stackexchange.com/questions/816217/…

Victor

Hi, anybody could took out a milestone paper to help me on this? math.stackexchange.com/questions/816199/…

GitaarLAB

5:28 PM

@N3buchadnezzar: I must have done something wrong, I get -6.217248937900877e-15 as forth term. The programming-example I understand, It's what I was trying to avoid, but.. compared to the equation, the code is going to be faster..

N3buchadnezzar

@GitaarLAB Why avoid the code? it is fast, and more numerically stable than polynomial interpolation.

Victor

Any help will be appreciated

GitaarLAB

@N3buchadnezzar I got motivated when I accidentally stumbled upon n = n+((n+3)mod 6) to generate oeis.org/A007310 That example is (in my environment) faster then a function. Whilst trying different equations (because I just had the suspicion it was possible) I saw a lot of other sequences coming by. I'm also currently exploring random-number generators (and their seeds), and again that feels quite related. So I have a 'gut' feeling a simple equation should be possible.

G.T.R

@Ted is France really labeled as a country where smoking is prevalent ?

Starkers

5:51 PM

If cos = adj/hyp what is arccos ?

adj * hyp ?

N3buchadnezzar

@GitaarLAB rarely

@GitaarLAB Want to see how I programmed it?

Daniel Fischer

@G.T.R Those were the good old times.

G.T.R

@DanielFischer do you smoke?

Daniel Fischer

@G.T.R I'm old enough to do that.

Ilan Aizelman WS

Still need help, and a new question appeared that I'm trying to solve. Please help. math.stackexchange.com/questions/816259/… and here math.stackexchange.com/questions/816217/…

Thanks in advance guys!

N3buchadnezzar

6:00 PM

G.T.R

@DanielFischer what's the legal age in Germany ?

Daniel Fischer

@G.T.R Legal for what? I think for buying you need to be 18. Don't know if there's a legal limit for smoking.

G.T.R

@ilan regarding math.stackexchange.com/questions/816259/… the keyword is linear

Ilan Aizelman WS

@G.T.R Why not linear algebra?

GitaarLAB

@N3buchadnezzar Had to go to store for a moment. Back now. Yes, I'd love to see the code (pastebin etc). Learning is addictive and my code-lingo is infinitely stronger then my math-lingo :)

N3buchadnezzar

6:06 PM

@GitaarLAB Image;)

G.T.R

@ilan sum the first and third equality + linearity

Ilan Aizelman WS

@G.T.R Figured it out with Don's help, but thanks G.T.R!

GitaarLAB

@N3buchadnezzar Check. I don't yet fully understand it (some symbols especially, like the pi-like symbol), but I'll be saving the image knowing it explains a (known to me) example, so I can put it next to wikipedia/youtube explanations. Please know I'm very grateful for your help (if I can ever help you in a javascript-related Q, ping me!)

Note to self: visit tex when it's back up and express some extra gratitude ;)

And thanks to the others that pitched in!

Daniel Fischer

6:42 PM

Offline yet again? What's up?

Chris's sis

I think I'm about to create something very nice ...

N3buchadnezzar

@GitaarLAB It is lagrange interpolation, storing x and y and then using the formula from wikipedia. The for loop is the L(x) in wiki. But yeah, easier to just use mod :p

Martin Sleziak

7:08 PM

Just in case the question is interesting for someone, I'll copy it here:

in Geometry, 2 hours ago, by c c

Is it correct to say that in R^n, the intersection of (n+1) n-spheres are 2 points, nothing or a (n-1)-sphere?

GitaarLAB

@N3buchadnezzar What/where is it easier to just use mod? PS just found this: n - min((n-5)%6, (n-1)%6)...so close

N3buchadnezzar

@GitaarLAB what does that do?

GitaarLAB

11=11, 12=11, 13=13, 14=13, 15=13, 16=13 etc... (were: input = output)

so {0,1,0,1,2,3} instead of {0,1,0,3,2,1}

N3buchadnezzar

What is the % syntax?

GitaarLAB

% = 'mod' (actually remainder in javascript)

N3buchadnezzar

7:17 PM

Okay

I still think array is faster though, here you do two modular operations, and a min/max

GitaarLAB

so n = n - min((n-5)mod 6, (n-1)mod 6)

N3buchadnezzar

Instead of S(k%n)

GitaarLAB

True and the min is 10 times slower then an if (in chrome).

N3buchadnezzar

I still find the concept cool though

GitaarLAB

See? I to, still can't shake the feeling there is a simple equation. (and naturally I'd use the if to replace the min by the way, but then something like this equation would become plausible :)

Anyway, I'm late for an appointment and have to go. Please, if you get another idea (maybe mine triggers one), ping me! Have a good day/evening.. !!!!

Chris's sis

7:24 PM

Evaluate (the way you want to) $$\int_0^{\infty} \frac{x^2 \sin(x) \sinh(x)}{(\cosh(x)-\cos(x))^2} \ dx$$ newly created

Ilan Aizelman WS

Help:math.stackexchange.com/questions/816217/… According to Don's answer he told me that I need to find $dimKerT = 1$ , which is pretty easy because $dimImT = 2$ and $dimR^3 = 3$ so $dimKerT = 1$,which means there's one vector inside $KerT$, but how can I show that this vector equals to $Sp(1,-1,1)$?can I just assume that $(1,-1,1)$ is a basis in KerT because it's dimension equals to one, thus $Sp(1,-1,1)$ inside $KerT$ for sure?

I think not, and I need somehow to show it.

Chris's sis

@r9m see the one above (I bet it works great by methods of real analysis)

Ilan Aizelman WS

Now he just told me I need to show that, anyone has an idea how to show that it's inside $KerT$?

Chris's sis

@robjohn the integral above is magnificent. Don't miss it. :-)

Martin Sleziak

@IlanAizelmanWS I do not think that vector is in the kernel. Maybe we can take this to linear algebra chatroom.

Chris's sis

7:41 PM

$$\int_0^{\infty} \sin(x) \sinh(x) \left(\frac{x }{\cosh(x)-\cos(x)}\right)^2 \ dx=\zeta(2)$$

I'm thinking to do it in more dimensions ...

And now $$\int_0^{\infty} \sin(x) \sinh(x) \left(\frac{x }{\cosh(x)+\cos(x)}\right)^2 \ dx=\eta(2)$$

Nice integrals pack, isn't it?

ಠ_ಠ

What does the $η$ mean

Chris's sis

Dirichlet eta function

In mathematics, in the area of analytic number theory, the Dirichlet eta function is defined by the following Dirichlet series, which converges for any complex number having real part > 0: :\eta(s) = \sum_{n=1}^{\infty}{(-1)^{n-1} \over n^s} = \frac{1}{1^s} - \frac{1}{2^s} + \frac{1}{3^s} - \frac{1}{4^s} + \cdots This Dirichlet series is the alternating sum corresponding to the Dirichlet series expansion of the Riemann zeta function, ζ(s) — and for this reason the Dirichlet eta function is also known as the alternating zeta function, also denoted ζ*(s). The following simple rel...

ಠ_ಠ

7:56 PM

Thanks @Chris'ssis

Daniel Fischer

Is it only me, or is the site offline most of the time with intermittent short online phases in between for everybody else too?

Alyosha

@Chris'ssis Yes, it is.

G.T.R

@DanielFischer been offline once 2 hours ago, been up til now

Pedro Tamaroff

@DanielFischer Daniel.

Parth Kohli

$\lim_{n \to \infty} n^2 \log\left(\cos\left(\frac{1}{n}\right)\right)$

How would we work around with this?

Mike Miller

8:04 PM

I wouldn't advise it, @ParthKohli

Daniel Fischer

@G.T.R Could be "You may experience Read Only mode beyond the scheduled maintenance window due to DNS propagation (some ISPs still don’t respect TTLs)." then.

Alyosha

@ParthKohli Try Maclaurin for $\log(1-z)$.

Daniel Fischer

@ParthKohli Taylor expansion.

Pedro Tamaroff

@ParthKohli $\cos n^{-1}=1-\frac{1}{2n^2}+o(n^2)$, and $\log(1-x)=x-x^2/2+o(x^2)$.

skullpatrol

@MikeMiller What would you advise :-)

Chris's sis

8:05 PM

@ParthKohli That one is elementary.

Alyosha

Do Cauchy's integral theorems hold for functions whose Riemann Surface aren't $\mathbb{C}$?

Pedro Tamaroff

@DanielFischer I was trying to show that if $p_1=(x,y)$ and $p_2=(x,z)$, $m=(x,y,z)$ then $p_1p_2=p_1\cap p_2\cap m^2$. It is clear that $p_1p_2=(x^2,xz,zy,yx)$ and I proved that $p_1\cap p_2=(x,yz)$.

Mike Miller

@skullpatrol More worthwhile pursuits.

Pedro Tamaroff

Also $m^2=(x^2,y^2,z^2,xz,zy,yx)$.

Alyosha

The $\int f dz=0$ seems to, at least for $f(z)=\sqrt{\text{function whose RS is } \mathbb{C}}$.

Chris's sis

8:08 PM

@ParthKohli Use the simple fact that $$\lim_{x\to 1} \frac{\log(x)}{x-1}=1$$

Pedro Tamaroff

I feel trolled.

skullpatrol

How does it feel?

Chris's sis

@Alyosha Thanks. I created them this evening.

Pedro Tamaroff

It's a bit sad. OP, he's clueless.

ಠ_ಠ

Some are slower than others

Daniel Fischer

8:10 PM

@Alyosha Which theorems? The residue theorem holds on all Riemann surfaces, and everything else is a special case of the residue theorem, but may not have a clear interpretation on general Riemann surfaces.

Alyosha

@DanielFischer I meant the residue theorem.

Parth Kohli

@Chris'ssis I haven't studied limits to that degree. One thing that I see is $x = \cos(1/n)$.

Alyosha

In what way can the interpretation be hard?

Pedro Tamaroff

@ParthKohli I've given you a hint.

6 mins ago, by Pedro Tamaroff

@ParthKohli $\cos n^{-1}=1-\frac{1}{2n^2}+o(n^2)$, and $\log(1-x)=x-x^2/2+o(x^2)$.

Daniel Fischer

@Alyosha Interpret (well, define first) $$f^{(n)}(z) = \frac{n!}{2\pi i} \int_\gamma \frac{f(\zeta)}{(\zeta-z)^{n+1}}\,d\zeta$$

Martin Sleziak

8:14 PM

@PedroTamaroff He was in this chatroom just a while ago. You might ask him when he comes back.

Pedro Tamaroff

@MartinSleziak How's your commutative algebra? =)

Martin Sleziak

But evidently, posting link to the question in the chatroom worked this time, he got lost of answers?

Alyosha

@DanielFischer What is $\gamma$ here?

Martin Sleziak

@PedroTamaroff You wanted to ping someone else?

Parth Kohli

@PedroTamaroff Yes, I saw it. I don't want to say anything stupid... but why did you choose to compute the Maclaurin Series of $\log(1 - x)$? Am I missing something here?

Pedro Tamaroff

8:15 PM

@MartinSleziak No.

8 mins ago, by Pedro Tamaroff

@DanielFischer I was trying to show that if $p_1=(x,y)$ and $p_2=(x,z)$, $m=(x,y,z)$ then $p_1p_2=p_1\cap p_2\cap m^2$. It is clear that $p_1p_2=(x^2,xz,zy,yx)$ and I proved that $p_1\cap p_2=(x,yz)$.

Martin Sleziak

@PedroTamaroff Oh, if you're looking for help with commutative algebra, I am definitely not the right person.

Daniel Fischer

@Alyosha Some closed path of integration winding around $z$ once. That is easy to define and interpret on Riemann surfaces.

Pedro Tamaroff

I am getting that $p_1\cap p_2\cap m^2=(x^2,xz,zy,yx)+(x,yz)\cap(y^2,z^2)$, so I need to show that the last summand is in the first.

Alyosha

@DanielFischer So it doesn't matter that the value of $f(z)$ may suddenly jump on $\gamma$?

Actually, I suppose that doesn't affect its integrability.

skullpatrol

@MartinSleziak Would that make you non-communicative? ;-)

Daniel Fischer

8:17 PM

@Alyosha ? The presumption is that $f$ is holomorphic, hence continuous.

@PedroTamaroff Isn't it commutative algebra? Then I'd strongly expect $zy = yz$.

Pedro Tamaroff

@DanielFischer Hehe, yes, I just like cyclic stuff.

$xz,zy,yx$.

Alyosha

@DanielFischer Ah, OK. I was thinking of functions that weren't necessarily holomorphic in the usual sense, but were 'holomorphic on their Riemann surface'.

Excuse the woolly language, I've not been introduced to RS properly yet.

Pedro Tamaroff

Ah, I think I am done.

Daniel Fischer

@Alyosha You're thinking of branch cuts? No such thing, that's one of the points of using Riemann surfaces.

Alyosha

@DanielFischer Not quite.

Daniel Fischer

8:31 PM

@Alyosha Then what?

Balarka Sen

8:44 PM

What's the question, @Alyosha?

Alyosha

It's perhaps easier if I illustrate with an example.

skullpatrol

always^

Alyosha

$f(z)=\sqrt{1-z^3}$, with a branch cut in a straight line from $\omega \to \omega^2$ and $0 \to \infty$.

Chris's sis

Find all continuous functions $f:\mathbb{R}\rightarrow \mathbb{R}$ that admit a primitive $F$, such that $F(1)=0$ and
$$F(x)f(1-x)=-e\cdot (x-1)^2, \space \forall x \in \mathbb{R}$$

Balarka Sen

@Alyosha Sure.

Alyosha

8:48 PM

I'm finding it hard to describe what I mean in words.

Balarka Sen

Can you just repost the question?

I'll try to make sense of it.

Alyosha

Yes, one second.

skullpatrol

Examples are like pictures, they can say a thousand words.

Balarka Sen

@skullpatrol yep, that's a general reason i find category theory more intuitive than mindless algebraic calculations and schemes of riemannsurfaces more intuitive than just the algebraic equation.

@Alyosha I find it fun to answer questions by myself. Much better than "ah, that was so obvious, hell".

Alyosha

Okay, I've answered it myself, though have a related question.

Balarka Sen

8:57 PM

:15830965 Define "strange".

Nonsolvable monodromies?

Alyosha

Sorry for deleting, I need to formulate the question properly.

Balarka Sen

I think it's in general not hard to compute residues on any riemann surface, given the branches properly. Jumping from sheets to sheets would definitely result in weird beasts.

skullpatrol

@BalarkaSen that's true, but you need to learn the thousands of words that go into those pictures to be a Mathematician.

Alyosha

@BalarkaSen So a residue is defined as a closed loop on the Riemann surface?

Balarka Sen

I think so, yes. In fact, I think residues around branch points are especially complicated if points don't come back after traversing loops around the branches.

This phenomenon occurs whenever you have nonsolvable monodromy groups, I'd believe.

Daniel Fischer

9:02 PM

Fuck. Gone from intermittent to permanent. I get "We are offline for maintenance" everywhere (except chat, strangely). See you people and animals tomorrow.

Alyosha

When are closed loops around Riemann surfaces ever used?

That is, unless the Riemann surface is $\mathbb{C}$.

Balarka Sen

I am not sure what you mean by 'used'.

skullpatrol

@DanielFischer later

Balarka Sen

@skullpatrol It's not actually possible to learn them. A bunch of words will come out depending on how you are actually looking at the picture. It's like a hologram.

You look at it, get something like greenish tint. Slant it, get blue tints.

It's not possible to see all of the colors coming out of them at once.

Alyosha

I mean whether these integrals appear in somewhat unrelated mathematics (like usual complex integrals do for real integrals).

I need to sleep now.

Balarka Sen

9:15 PM

@Alyosha I am not sure.

Hurrah! I just worked out the last of my solution to a problem I have been doing for months!

Chris's sis

The last question I posted is pretty deep (although it's for high school level).

Balarka Sen

@Chris'ssis What's a primitive?

Chris's sis

I might also talk about all kind of mathematics (I learn pretty fast and I could reach many fields in mathematics) but there is so much stuff to attend at the level I'm at the moment.

My professor used to say it's such a shame to talk about great things in mathematics but not to know to compute an elementary limit or an integral.

Moreover, I only attend an art. That's all.

@ParthKohli did you compute that limit?

Parth Kohli

@Chris'ssis I did not. I was asking that question on behalf of another person, and it seems that they were able to follow with your hint.

Chris's sis

@ParthKohli That's good! :-)

Balarka Sen

9:22 PM

Hey @Parth

Parth Kohli

@BalarkaSen Hi.

r9m

@Chris'ssis are you working on the asymptotics of $\int_{[0,1]^n}\frac{1}{\sqrt{\sum\limits_{i=1}^{n} x_i^2}}\,dx$ ? or have you found a way to deal with the problem already ?! :D

Chris's sis

@r9m Yes. ;)

r9m

a few minutes ago I was able to figure out why $\int_{[0,1]^n} \max_{i=1}^{n}\{x_i\}\,dx =\frac{n}{n+1}$ (you showed it to me more than a month back) :)
how did you get the asymptotics ?:)

Chris's sis

@r9m Well, I still need to check things to make sure that everything is right. (there is some more work to do).

r9m

9:32 PM

@Chris'ssis okay :)

Chris's sis

@r9m by the way, did you see the integrals I just posted above?

$$\int_0^{\infty} \sin(x) \sinh(x) \left(\frac{x }{\cosh(x)-\cos(x)}\right)^2 \ dx=\zeta(2)$$

$$\int_0^{\infty} \sin(x) \sinh(x) \left(\frac{x }{\cosh(x)+\cos(x)}\right)^2 \ dx=\eta(2)$$

Balarka Sen

Hey, @RandomVariable

Chris's sis

@r9m They both can be easily evaluated by methods of real analysis.

r9m

@Chris'ssis real methods ! ah .. thats exciting to know ! :D

Chris's sis

@r9m Sure.

@r9m Well, I have versions in more dimensions that can be pretty tough, but it's enough what I posted for now.

Random Variable

9:41 PM

@BalarkaSen Hi

r9m

<- this guy is already out of depths .. show some mercy :P

Parth Kohli

Feels good to be able to understand and recreate a solution.

Hi, @ಠ_ಠ. I see that you were finally able to change your name.

Balarka Sen

@ParthKohli Ah? Which problem?

Parth Kohli

@BalarkaSen Physics.

ಠ_ಠ

@Parth Hi, just an hour ago or so

Balarka Sen

9:42 PM

Crap, @Parth

Hullo @Pedro. Long time no see.

@ParthKohli what kind of physics you are studying? electricity?

Parth Kohli

@BalarkaSen yes, indeed.

Shisui

What defines a competent mathematician?

Balarka Sen

@Shisui to my understanding, one who studies and plays with mathematics and respects the vast branches of mathematics, related or unrelated to his/her study.

ಠ_ಠ

What defines an incompetent mathematician?

Balarka Sen

@ಠ_ಠ Me.

ಠ_ಠ

9:51 PM

lol

At least you can be a mathematician

Random Variable

@BalarkaSen That's what I was going to say. :)

Balarka Sen

@ಠ_ಠ that doesn't stop me being "incompetent".