Mathematics - 2012-09-06 (page 4 of 4)

8:00 PM

When I think that music today would fright people on ~1500, the ideal of a fixed set of rules for music dies - I'm able to hear and like beyond this fixed set of rules.

MeAndMath

I like Erik Satie,too.

Gustavo Bandeira

Same for beauty - the same fixed set of rules, and people try to force a digsuting legitimacy on this. "Beauty is X, no other element could be added to this group"

MeAndMath

@GustavoBandeira People are stupid.

Some more than others...

Gustavo Bandeira

14 mins ago, by MeAndMath

@GustavoBandeira Headache.

..

MeAndMath

@GustavoBandeira what?what's wrong?

You asked what feeling the song gave me.

Gustavo Bandeira

8:05 PM

Yeah, that's the second possible meaning I thought. =)

brb

bath

MeAndMath

ok.

Gustavo Bandeira

I'm clean! Yay!

MeAndMath

@GustavoBandeira DAmn,you're fast!

Gustavo Bandeira

@MeAndMath Lol

MeAndMath

too noisy...

Gustavo Bandeira

8:13 PM

It reminded me that.

Haha

I like a WIDE range of sounds.

@WillHunting LOOK THIS

►

Peter Tamaroff

@GustavoBandeira That's an interesting equation. I have many example, yet it seems hard to prove.

Gustavo Bandeira

@PeterTamaroff Haha.

Peter Trollaroff

4

MeAndMath

Justin bieber annoys me...

Restart annoys me...Michel Teló,Gustavo Lima ...

Gustavo Bandeira

@MeAndMath btw, I played Satie's #1 gnossiene last semester.

MeAndMath

@GustavoBandeira Cool!

Gustavo Bandeira

8:16 PM

@MeAndMath But you like Gustavo Bandeira, right?

MeAndMath

@GustavoBandeira yes

Gustavo Bandeira

MeAndMath

Have you ever heard Carlos Gardel?

Gustavo Bandeira

Nope.

I thought he was a brazilian nationalist.

MeAndMath

►

My greatgrandmother sang this song!And danced!

Peter Tamaroff

8:19 PM

@GustavoBandeira You should put yourself on fire.

Gustavo Bandeira

Oh, I confused him with Carlos Gomes.;

@PeterTamaroff =D

►

MeAndMath

@PeterTamaroff He's a legend!

I've hit 13k =D

@MeAndMath Almost.

8:23 PM

@MeAndMath My father used to hear this song, but it was interpretated by some brazilian singer.

Peter Tamaroff

That is the right choice

Gustavo Bandeira

@PeterTamaroff lol

MeAndMath

@PeterTamaroff Didn't want to be rude :(

Gustavo Bandeira

Ok, I gtg. Girlfriend is waiting, I'm gonna travel ~260KM to see her.

Peter Tamaroff

@GustavoBandeira What a romantic.

Gustavo Bandeira

8:24 PM

@MeAndMath Peter is the troll set - all the trolling elements are inside him, relax.

MeAndMath

@GustavoBandeira What patience...

Gustavo Bandeira

Peter is the infinte sum of the trolling numbers - which are trolli-dimensional numbers.

gtg

cya

MeAndMath

good trip.

Argon

When can a sum and integral be interchanged?

This seems to imply only sums with positive terms can be interchanged with integrals.

However, in this post, an interchange is done without the sum having only positive terms.

anon

8:45 PM

Keywords: uniform convergence, fubini's theorem, interchange of limits. Google away.

John Senior

@anon :)

MeAndMath

@PeterTamaroffdo you know anything about continuum hypothesis?

Peter Tamaroff

@MeAndMath The hypothesis is that $\aleph_0\leq 2^{\aleph_0}$ is a "tight"inequality, correct @anon?

Argon

@anon Does the sum of the function have to have uniform convergence in order for the order of integration and summation to be switched? That is what seems to be implied here.

MeAndMath

@PeterTamaroff yes

Peter Tamaroff

9:01 PM

@MeAndMath Ok, so?

@Argon I answered that yesterday.

MeAndMath

@PeterTamaroff This problem wasn't solved yet,isn't it?

what's its implications?

Argon

@PeterTamaroff Where?

Gustavo Bandeira

I'm on the train.

MeAndMath

@GustavoBandeira Wow

Peter Tamaroff

@MeAndMath It is a "hypothesis" really, and I think it has been proved indepedent of the ZF axios, meaning one can insert it as an axiom, or insert it's negation, and things will go well.

@anon Could you correct me if I'm wrong?

@Argon Here, but no there

MeAndMath

9:05 PM

@GustavoBandeira is she mathematician?

Gustavo Bandeira

Nope.

MeAndMath

@GustavoBandeira how boring.

Peter Tamaroff

@MeAndMath You seem to have a case of mathiction.

@MeAndMath Not everything in life is maths!

Gustavo Bandeira

Should I date only mathematicians?

MeAndMath

I think it is...

Gustavo Bandeira

9:07 PM

If this is the case, I'm gonna be gay and date Peter. <3

Peter Tamaroff

@GustavoBandeira Ultimate troll mode: [on]

I'm not a mathematician, also!

Gustavo Bandeira

Hello, Pitty. ;-)

MeAndMath

I can't imagine myself living ,dating whatever,with someone who is not mathematician , or scientist...

Peter Tamaroff

@GustavoBandeira Lately I've been referring to people with questions on chat to non existent theorems. Like, someone asks about groups, and I go "That falls down easily with Schuzenheimers Theorem".

MeAndMath

Peter Tamaroff

9:10 PM

@MeAndMath Spot on!

Gustavo Bandeira

Well, that's the MSE function: If you don't date a mathematician, you come here. :-)

Argon

@PeterTamaroff What does "majorant on some D" mean?

MeAndMath

I would not give up on math , for anything in this world!

Peter Tamaroff

@GustavoBandeira Also, if an engineer has a problem, I usually suggest to try "turning it off and back on".

@MeAndMath What about unicorns?

MeAndMath

@PeterTamaroff nope.

Peter Tamaroff

9:11 PM

@Argon majorant on some domain $D$

@MeAndMath Bronies?

MeAndMath

If a genius appeared to me asking:You want the love of your life or Fields medal?
I would say Fields!

Peter Tamaroff

@MeAndMath Well, that is OK. There is "no love of your life". Except for Freddy. He can always have it.

Gustavo Bandeira

I would say "potatoes".

MeAndMath

Math is the first love of my life.Don't think anyone would understand me.

Peter Tamaroff

@GustavoBandeira Make them sweet.

Gustavo Bandeira

9:15 PM

With gorgonzola?

MeAndMath

@GustavoBandeira You have a passion for cheese don'tcha? I love camembert.

Gustavo Bandeira

YES!

MeAndMath

Argon

@PeterTamaroff Sorry for bothering you, but what is a majorant over $D$? The internet has revealed very little.

It's been a bad day.

MeAndMath

@GustavoBandeira I had a collegue who said that I was a really bizarre girl...

Gustavo Bandeira

9:22 PM

Haha, why?

(if I stop answering, its lack of mobile internet)

Peter Tamaroff

@Argon OK. You're not bothering.

MeAndMath

@GustavoBandeira i WONDER WHY..

Peter Tamaroff

@Argon Have you read the answer thoroughly?

@Argon Read the second definition

Gustavo Bandeira

My girlfriend`s uncle said I have schizophrenia, check my site, on my profile.

Peter Tamaroff

@GustavoBandeira Paranoid uncle is paranoid.

MeAndMath

9:25 PM

@GustavoBandeira Eu,hein...Se ele me conhece,então...

Gustavo Bandeira

Well, you like math, weird enough.

Argon

@PeterTamaroff Could one think of a majorant as an upper bound?

of sorts

MeAndMath

@GustavoBandeira My analysis prof said that I was too obsessed...

Peter Tamaroff

@MeAndMath Because you are.

MeAndMath

@PeterTamaroff is there anything wrong with it?

Peter Tamaroff

9:28 PM

@Argon Careful with the wording: Given a series of functions, we say that a convergent series of positive numbers such that $|f_k(x)|<a_k$ for each $k$ is a majorant for $$f(x)=\sum_{k=0}^\infty f_k(x)$$. Say this is true in some subset $S$ of the reals. Then we say $f$ is majorant on $S$

@MeAndMath Extremma are problematic

MeAndMath

@PeterTamaroff I just wanted to be better.And more inteligent...I'm not good enough..

Peter Tamaroff

@MeAndMath Better in what sense?

MeAndMath

@PeterTamaroff better...brilliant.

Argon

@PeterTamaroff Do you mean $\forall x \in S$?

Peter Tamaroff

@Argon I didn't mean it, I said it =)

@MeAndMath NOT ENOUGH DATA

Gustavo Bandeira

9:34 PM

I'm here.

Peter Tamaroff

@GustavoBandeira But not there.

MeAndMath

@GustavoBandeira Say it.

Argon

@PeterTamaroff So $a_k$ is a majorant for $f(x)$ and $f(x)$ is a majorant on $S$?

MeAndMath

@GustavoBandeira is anyone else in your family a mathematician?

Peter Tamaroff

@Argon Yes. Not there are many majorants.

Gustavo Bandeira

9:43 PM

Not

Argon

Note?

Peter Tamaroff

@Argon Yes.

Gustavo Bandeira

My father liked math, but he knew only elementary math.

MeAndMath

@GustavoBandeira you are the only one

Peter Tamaroff

@GustavoBandeira Well, one doesn't need to understand the ABC conjecture to like math.

Gustavo Bandeira

9:45 PM

Yes. We have engineers in the family.

MeAndMath

@GustavoBandeira same here.

I discovered that ,in my family about ages ago,there was a physicist and a priest mathematician in Italy.About in the eighteenth century.

Argon

So if there exists a sequence of numbers $|f_k(x)| < b_k$ so that $\sum_{k=0}^\infty b_k < \infty$ for $x \in D$ then the sum and the integral can be interchanged if the bounds of the integral are in $D$?

Gustavo Bandeira

Mathematicians are rare in Brazil. People only want to study the most easily monetizable stuff.

MeAndMath

@GustavoBandeira Totally.

Gustavo Bandeira

I guess Brazil is composed of 33% of medics, 33% of lawyers and 33% of engineers. :-)

Peter Tamaroff

9:49 PM

@Argon Essentially. You can read about that in Apostol's Calc I. He proves all that.

MeAndMath

@GustavoBandeira none of them working correctly

Gustavo Bandeira

YES! XD

The cool part is the mathematical reputation if engineers....

Of engineers.

Argon

@PeterTamaroff What do you mean when you say $\lim f_n$?

MeAndMath

@GustavoBandeira yes!na minha universidade eles tem o estereótipo carinhoso de serem fags.

Gustavo Bandeira

Haha, é assim: a matéria mais odiada na escola é matemática, dos três cursos que citei, o que mais se aproxima é engenharia, como é o mais próximo disso, eles recebem a fama, já que não existe matemático pra mostrar o contrário.

MeAndMath

9:56 PM

@GustavoBandeira É!Eu não gosto de engenheiros...showoffs...

Gustavo Bandeira

Eu tenho uma hipótese: parece que pra entrar no curso de engenharia, o aluno não pode ter a capacidade reformular algo além do que é dado a ele.

robjohn

@GustavoBandeira there are people there who've evidently paid for tickets. Why?

MeAndMath

@GustavoBandeira são limitados...depois que entrei pra faculdade me senti muito melhor.

Gustavo Bandeira

Rob? What you mean?

Peter Tamaroff

@Argon $$\lim_{n\to\infty}f_n(x)$$

@Argon Are you really a noble gas?

2

robjohn

10:00 PM

@GustavoBandeira Just my comment on the video you linked :-)

achacttn

Does anyone here do any abstract algebra?

robjohn

@PeterTamaroff I was waiting for him/her to say something that I could comment "How noble"

Peter Tamaroff

@achacttn Why would you wanna do it?

achacttn

@PeterTamaroff It's pretty sexy

4

Peter Tamaroff

@achacttn LOL

Gustavo Bandeira

10:02 PM

The topology one? I guess you replied that comment "lets go straight the point" or something like that

MeAndMath

@achacttn <3

robjohn

@achacttn what about $\color{red}{\text{abs}}\text{tract alge}\color{red}{\text{bra}}$ would be sexy?

Peter Tamaroff

@robjohn One does not simply take the bra from algebra.

Gustavo Bandeira

Hell....no chat jax on android... :-(

robjohn

@GustavoBandeira you lose :-)

achacttn

10:05 PM

@GustavoBandeira robojohn just highlighted 'abs' from abstract and 'bra' from algebra

Peter Tamaroff

@GustavoBandeira I have Android and LaTeX renders cool.

At least on main.

robjohn

@PeterTamaroff but not on chat

Peter Tamaroff

@robjohn Someone has some work to do...

achacttn

I have an algebra exam in 1.5 hours

no permitted materials :(

Gustavo Bandeira

Rob, can't you jack this? :-D

achacttn

10:07 PM

How does one remember all these theorems

robjohn

@PeterTamaroff :-p

Argon

@PeterTamaroff :)

Ed Gorcenski

What theorems? What topics?

Peter Tamaroff

@Argon Is that a yes or a no?

achacttn

@EdGorcenski Mainly group theory

John Senior

10:08 PM

@achacttn it is better to remember principles rather than theorems, I think

Gustavo Bandeira

Hack #

John Senior

(Sylow theorems are probably an exception)

Argon

@PeterTamaroff The name is a concatenation of my first and last name.

achacttn

I wonder... does everyone here just have like the proofs for theorems memorized

able to be recalled at any time

robjohn

@JohnSenior yes, but like the addition and times tables, theorems can make the application of those principles go much faster.

Argon

10:09 PM

A truncated version at least

achacttn

In physics, you can sort of fumble around with equations and derive things from first principles

in mathematics, if you don't have exact definitions for theorems and propositions and such... good luck trying to figure anything out :(

robjohn

@JohnSenior I taught my son to add on his fingers when he was very young. He decided that he did not need to learn the addition tables, and then the multiplication tables since he knew how to get the answer. He suffered through and ended up hating math.

Peter Tamaroff

@Argon Arthemis?

Argon

@PeterTamaroff Haha, no. Aaron - truncated

achacttn

@robjohn to be fair, math isn't for everybody :p

Peter Tamaroff

10:11 PM

@Argon Well, that is a cool name too.

John Senior

@robjohn very true - just than when I was learning maths at high school I had a real aversion to learning anything "by rote" - I always worked things out from the definitions

robjohn

@achacttn That is true, but he is smart and knows how to apply the ideas. He may not have become a mathematician, but I don't think he would have hated it so much.

John Senior

I derived the formulas for trig functions so many times that eventually I knew them all anyway :)

achacttn

@JohnSenior I like doing this too. Is it the same for you as it is for me, that once you understand and know how to derive it, you sort of forget about it and take it for granted

robjohn

@JohnSenior practice, practice, practice...

John Senior

10:13 PM

@robjohn yep - exactly

achacttn

@robjohn What does your son do now?

Peter Tamaroff

achacttn

@PeterTamaroff haha... but 9gag? >:O

robjohn

@achacttn He is in college majoring in game design.

@achacttn my son sends me things from 9gag from time to time.

achacttn

@robjohn Are you a math professor or something? o_O

Peter Tamaroff

10:16 PM

@achacttn He is!

robjohn

@achacttn I used to be at UCLA for a couple of years after grad school. Then I went to work for Apple.

achacttn

@PeterTamaroff That's pretty cool ~

@robjohn Ah awesome! What do you actually do at Apple?

Peter Tamaroff

@robjohn What do you think about Apple's Thermonuclear War on patents?

achacttn

@PeterTamaroff Good that the galaxy S3 made it out alive !

robjohn

@achacttn well, I am back at UCLA, but writing software now. I used to work on graphics software while at Apple (QuickDraw GX)

Peter Tamaroff

10:18 PM

@achacttn I have a Sony Ericssion XPERIA. It kicks ass.

robjohn

@PeterTamaroff Eh? What are they doing now? They just got $1 billion in a patent suit against Samsung.

Peter Tamaroff

@robjohn See this Tell me what you think.

achacttn

@robjohn If you write software for graphics engines... what math exactly did you do in grad school? (Sorry for spamming with questions, just curious)

well, used to

robjohn

@achacttn I did harmonic/fourier analysis in grad school.

achacttn

@robjohn Ah~. I'll be doing a waves and optics course in my second year, I heard it's basically all fourier analysis

Gustavo Bandeira

10:26 PM

@Robjohn didn't know this topic if do extensive.

Was so extensive #

robjohn

@PeterTamaroff It is a matter of levels. Next time you prove a theorem, think of what you are really doing. Mostly putting together ideas you've learned from others, adding a bit of your own innovation.

Peter Tamaroff

@robjohn Interesting.

John Senior

@robjohn absolutely right

@robjohn even guys like Gauss fit into that category - just that they added quite a bit more of their innovation than I ever do :))))

robjohn

@JohnSenior Some inventions are big and others are an incremental process

John Senior

(OK - vastly more than I ...)

achacttn

10:34 PM

@robjohn Wouldn't that apply to any scientific field though? In the beginning, we are all in school reading a textbook full of discoveries made by other people...

MeAndMath

@GustavoBandeira você já chegou aonde estava indo?

robjohn

@achacttn That is what I am saying... the computer industry included.

Peter Tamaroff

@robjohn Yet, there is an unfair game going on. Patenting the "slide to unlock" seems moronic.

robjohn

@PeterTamaroff I know lots of people who think that all patents are moronic.

John Senior

@robjohn Actually, I think all human development (mathematical or otherwise) is incremental - just the size of the increments varies a bit ...

Peter Tamaroff

10:36 PM

@robjohn Well, I don't think ALL are, but many of them are.

achacttn

@robjohn What is your opinion on patents in general?

Peter Tamaroff

@robjohn It is something utterly selfish.

robjohn

@achacttn technology benefits since people are more motivated to invent if they can patent their inventions.

achacttn

@robjohn Wouldn't that benefit be 'decreased' in a sense if the patent restricts that technology being used more freely?

robjohn

@achacttn However, there are some who will invent whether compensated or not.

@achacttn It restricts the use, not the invention... and patents are only temporary.

achacttn

10:40 PM

@robjohn I did not know this. Are all patents temporary?

robjohn

@achacttn I believe so.

Term of patent

The term of a patent is the maximum period during which it can be maintained into force. It is usually expressed in number of years either starting from the filing date of the patent application or from the date of grant of the patent. In most patent laws, renewal annuities or maintenance fees have to be regularly paid in order to keep the patent in force. Otherwise the patent lapses before its term. The term of a patent or specific "claims" in a patent may also be curtailed by judgment of a court, as where a claim or patent is held "invalid" under the relevant law, and thus no longer enfo...

achacttn

@robjohn Hm.. so patents are not temporary if the renewal annuities are paid?

robjohn

@achacttn or the court curtails them.

Gustavo Bandeira

@MeandMath Não, o ônibus sai às 20

robjohn

@achacttn and it varies from place to place and perhaps even from situation to situation.

MeAndMath

10:45 PM

@GustavoBandeira tá quase saindo,então.

Gustavo Bandeira

Sim.

Depois eu tenho uma coisa pra te mostrar.

MeAndMath

@GustavoBandeira mostre.

Gustavo Bandeira

Sim, mas depois, tá no computador.

MeAndMath

@GustavoBandeira qual o conteúdo?

sobre o que é?

robjohn

@achacttn I don't know if this can be done forever. At least in the US Constitution it is said that the protection is to be temporary. See here

achacttn

10:49 PM

@robjohn I will bookmark and read after my exam, thanks

Gustavo Bandeira

É pseudo matemática, deve ser uma idéia completamente demente. XD

robjohn

@achacttn I missed that... when and in what is your exam?

achacttn

@robjohn in 50 minutes. On abstract algebra

robjohn

@achacttn Oh... good luck!

achacttn

@robjohn Group theory (a lot of linear algebra examples), plus a little bit on prime fields

@robjohn Thanks!

N3buchadnezzar

11:07 PM

Hey

@robjohn What was your field in mathematics again?

robjohn

@N3buchadnezzar harmonic and fourier analysis (with some $\Psi$DO thrown in)

N3buchadnezzar

=)

I have started learning some fourier analysis, and this semester we also have a introductory course in functional analysis.

It is fun

N3buchadnezzar

11:21 PM

@robjohn You are missing a $\mathrm{d}\lambda$ in your integral here math.stackexchange.com/questions/187729/…

(3.6)

robjohn

@N3buchadnezzar I am not integrating with respect to $\lambda$

John Senior

@N3buchadnezzar are you sure - I think the integral is wrt $\phi$, isn't it?

N3buchadnezzar

@robjohn Yeah! I saw it now, it is a tad late here. Really awesome solution

robjohn

@N3buchadnezzar Thanks. It is one of those answers that came to me in the shower :-)

N3buchadnezzar

I would perhaps have placed the fraction in front of the integral to absolutely avoid confusion when dealing with dofuses such as me.

$$ {\color{red}-} \frac{\lambda \pi/8}{1+\lambda^2} + \frac{1}{2} \int_0^\infty \ldots $$

robjohn

11:28 PM

@N3buchadnezzar I thought of that, but I worried that moving it might also cause confusion. Furthermore, where it is, I can simply change the - to a + to get the similar answer for $\cos$

@N3buchadnezzar Of course the - can be changed to a + there, too

I moved the $\mathrm{d}\phi$ up into the numerator. Perhaps moving it back to the end of the integrand would make the separation clearer.

N3buchadnezzar

@robjohn Yeah, at the moment it blends in too well. I often move the integration constant up, but usually only when the integral is the last part. Or when the numerator only contains a constant.

Answers like this wants me to finish my integration booklet even more. Alas university coursework is too time consuming. Basically a collection of as many fun and interesting integrals with solutions as possible.

robjohn

@N3buchadnezzar moving the increment down makes 3.7 and 3.8 look worse. If it gets moved in 3.6, would that be clearer? That is the step where the constant term is pulled out.

N3buchadnezzar

@robjohn Moving it in 3.6 would suffice =)

robjohn

@N3buchadnezzar done.

Peter Tamaroff

11:43 PM

222 days on MSE

N3buchadnezzar

@robjohn You said you came up with this in the shower, what was the reasoning behind looking at this particular integral?

robjohn

@N3buchadnezzar Since the answer was $\sqrt{\frac\pi8}$, I figured that something similar to the way one could show $\int_{-\infty}^\infty e^{-x^2}\,\mathrm{d}x=\sqrt{\pi}$ would work

N3buchadnezzar

Yeah, the gaussian trick of squaring and adding a dummy variable.

Then you added $\sin(x^2)$, and messed around with the coefficient until you obtained the desired output.

clever =)

robjohn

@N3buchadnezzar actually you don't add a dummy variable, you square the integral which can be written as a double integral

$e^{-x^2}\,e^{-y^2}=e^{-x^2-y^2}$ suggests the conversion to polar

then $\mathrm{d}x\,\mathrm{d}y=r\,\mathrm{d}r\,\mathrm{d}\phi$ seals the deal

N3buchadnezzar

$(\int_R \exp(-x^2)dx)^2=(\int_R \exp(-x^2)dx)(\int_R \exp(-x^2)dx) = (\int_R \exp(-x^2)dx)(\int_R \exp(-y^2)dy) = \int_{R^2} \exp(-x^2-y^2) \,dx \,dy $

Seems to me like one adds the dummy variable $y$, to be able to obtain $e^{-(x^2+y^2)}$

robjohn

11:58 PM

No, you change the $x$ to a $y$ to keep them straight in the double integral, but yes, both $x$ and $y$ are dummy variables

Peter Tamaroff

@robjohn Rob, could you clarify something?

robjohn

@PeterTamaroff that depends on you, grasshopper...

N3buchadnezzar

@robjohn And the last transition is justified since the exponential function is analytic on R, right?

Transcript for

$Mathematics$ Mathematics