Mathematics - 2012-06-20 (page 2 of 4)

Peter Tamaroff

04:00

He called my $\LaTeX$ lame or something of the sort =(, =P

anon

heh. Frank does submit a fair number of suggested edits IIRC.

Frank Science

@Peter Modular

Eugene

@anon i think iyengar asked this question on the main site again.

Peter Tamaroff

@FrankScience I'm asking why do you include the parenthesis. It is so superfluous.

That Wikipedia uses them means nothing to me.

Eugene

this is the current incarnation

Frank Science

04:04

@Peter It's convention.

Peter Tamaroff

@FrankScience Useless one, then.

Frank Science

@Peter $a\bmod b$ means a binary operator $\bmod$.

anon

@Eugene As it turns out, a finite inverse system with unique maximal object is isomorphic to that object. (In reference to the problem I posted yesterday.)

Peter Tamaroff

@FrankScience No it doesn't, unless you define it as such.

Eugene

@anon wow. that is weird.

anon

04:06

(I say "as it turns out" ironically, because it should have been blazingly obvious)

Eugene

wait.

i guess not.

hahahah

when i first read what you wrote i thought it was weird. then i saw unique there and i realized "duh!"

Peter Tamaroff

The Who is such an awesome band.

Eugene

@PeterTamaroff that is true.

Peter Tamaroff

He's a Pinball Wizard ♫♪

anon

But if instead we say a group $G$ is infinite and consider only subgroups of finite index, we will no longer have the trivial subgroup, and thus no longer the quotient $G/\{e\}$ in the system, and things become nontrivial (I think). It's essentially the profinite completion but without the stipulation that groups be normal, and we're working in the category of G-sets rather than groups.

Frank Science

04:09

@Peter OK, that's nothing important.

I wonder whether Dirichlet generating function is useful while solving the recurrence?

Eugene

@anon i'm trying to think about this in terms of tate modules.

anon

you mean dirichlet series?

Peter Tamaroff

@FrankScience As in $\sum \chi(n)/n^s$?

anon

generating functions are useful for solving recurrences, or proving solutions

Frank Science

Yes, $\tilde A(z)=\sum_{n\ge0}a_nn^{-z}$

Peter Tamaroff

04:11

@FrankScience Well, a simple example would be another kind of GFs

Frank Science

Sorry for my mistakes, I'll input it again.

Peter Tamaroff

$A(x) = \sum a_n x^n$

You can prove the Binet Formula with that, for example.

anon

@FrankScience If it's a recurrence that works with divisors of the index, the dirichlet series might help.

@Eugene I'm reading WP on it now..

Frank Science

@anon I've see one example in cs.SE, $f(n)=f(\lfloor n/2\rfloor)+f(\lceil n/2\rceil)+e_n$

anon

and a dirichlet series is supposed to help with that? was it an asymptotics problem?

Frank Science

04:14

$\tilde A(z)=\sum_{n>0}a_nn^{-z}$

@anon He gets an asymptotics result.

Peter Tamaroff

What is $a_n$?

Frank Science

@anon But it's all greek to me.

anon

@PeterTamaroff an arbitrary sequence

Peter Tamaroff

@FrankScience πραγματικά?

Eugene

@anon btw, i'm a trainwreck all the time!

Peter Tamaroff

04:16

@Eugene Oh, don't be mean with yourself! Be mean to others!

Frank Science

@Peter It's all Greek to me means that I have no idea on it.

Peter Tamaroff

@FrankScience I know!

@anon Maybe this one is more interesting.

I need to prove that $$1 > \frac{n}{ \sigma (n)} > \prod_{i=1} \left(1-\frac 1 {p_i}\right)$$ where $p_j$ are the prime factors of $n$. (Without Euler's totient, for sure).

Frank Science

@anon I guess I have used a wrong tool in my problem

Peter Tamaroff

And then $$ \frac{\sigma(n!)}{n!}\geq H_n $$

Curioser and curioser.

anon

Well, since $n$ is in the sum defining $\sigma$, of course $\sigma(n)>n$. (except when $n=1$). For the right inequality you'll first need that $\sigma$ is multiplicative...

Peter Tamaroff

04:23

@anon I have proven that already.

anon

@PeterTamaroff That one's obvious. $n!H_n$ is a subsum of $\sum_{d|n!}d$.

Peter Tamaroff

@anon Ha!

Frank Science

@Peter $$\sigma(n)=\prod_{p\mid n}\left(1+p+\cdots+p^{v_p(n)}\right)$$

Peter Tamaroff

What is the $v$ up there? I write that differently.

@anon I think I got it.

Frank Science

$v_p(n)=\sum_{k>0}[p^k\mid n]$

anon

04:27

p-adic order

Peter Tamaroff

@FrankScience You're rigorous. I like it! =)

@anon Yeah, grabbed it by the horn.

Frank Science

Thus $$\frac n{\sigma(n)}=\prod_{p\mid n}\frac{p^{v_p(n)}}{1+p+\cdots+p^{v_p(n)}}$$

Peter Tamaroff

@FrankScience You're spoiling it for me.

@FrankScience You're lucky I'm listening to Stevie. Else I'd get mad.

Frank Science

$$\frac{1+p+\cdots+p^{v_p(n)}}{p^{v_p(n)}}=1+p^{-1}+\cdots+p^{-v_p(n)}>1+p^{-1}+\cdots=\left(1-p^{-1}\right)^{-1}$$

Peter Tamaroff

@FrankScience Are you serious?

Frank Science

04:32

Chang $\rt$ to $lt$.

$\rt$ to $\lt$.

No

I'm wrong, sorry

Change $\gt$ to $\lt$

where $1+p^{-1}+\cdots$ means $\sum_{k\ge0}p^{-k}$ (infinity sum)

anon

@Eugene are tate modules relevant to nonabelian theory?

Frank Science

Incidentally, can we give an asymptotics for $\sigma(n!)$?

anon

plug $n!$ into asymptotics for $\sigma$? :P

Peter Tamaroff

@anon LOL Maybe use Stirling then

anon

or involve $v_p(n!)$ and make things messy...

Frank Science

04:40

It is too difficult to manipulate the primes.

Peter Tamaroff

@FrankScience What asymptotics do you ahve for $\sigma(n)$?

Frank Science

In addition to probability generating function $G(z)=E(z^X)$, is there any generating functions works well to determine the expected number $EX$ and the variance $VX$?

Peter Tamaroff

@anon Can't we use Lagrange's Identity somewhere?

Frank Science

@PeterTamaroff Impossible. For example, when $n$ is prime, we have $\sigma(n)=n+1\sim n$; when $n=2^k$, we have $\sigma(n)=2^{k+1}-1\sim 2n$

Peter Tamaroff

Can't you just say $O(n)$?

anon

04:43

what do you mean by Lagrange's identity?

@PeterTamaroff lol, for $\sigma(n!)$?

Peter Tamaroff

@anon No, for $\sigma(n)$.

That means that $\sigma(n) \sim C n$ right?

anon

no, it means $\le Cn$ for all $n\ge N$ for some $N$ for some $C$...

Peter Tamaroff

@anon Oh, right.

Frank Science

I think $\prod_p\left(1+p^{-1}\right)$ diverges.

I'm not sure.

Eugene

they're related to elliptic curves.

anon

04:47

@FrankScience It does.

Frank Science

@anon Oh, yes, because $\sum_p p^{-1}$ diverges.

anon

You don't even need that.

Peter Tamaroff

@anon Hehe yes, overkill.

Frank got it.

:5030511 One thing.

anon

derp

Peter Tamaroff

$$\frac{\sigma(n!)}{n!} =\sum_{d \mid n!}\frac 1 d $$

Frank Science

04:51

Sorry, I have no idea on calculus.

Peter Tamaroff

I think equality is only true for prime $n$.

@FrankScience What do you do?

Frank Science

@Peter What?

Peter Tamaroff

@FrankScience What are your interests?

anon

@PeterTamaroff I view that as a corollary to $\sigma_\alpha(n)=n^\alpha\sigma_{-\alpha}(n)$.

Frank Science

@Peter I'm now very eager to sombody solving my problem.

Peter Tamaroff

04:53

@FrankScience Which one?

@anon Well, it is the $d \mapsto n/d$ "trick"

anon

yes

Frank Science

This one. I have to redescribe it because it's possible that generating function is not a good idea.

Eugene

are the moderators still looking at flags? i've had some under review for awhile now

Frank Science

@anon $\sigma_\alpha(n)=\sum_{d\mid n}d^\alpha$?

Peter Tamaroff

@FrankScience Yeah.

Frank Science

04:57

@Eugene What do you mean by?

Peter Tamaroff

The divisor functions.

anon

2 hours ago, by anon

I prefer divisor-sigma, $\sigma_s(n):=\sum_{d|n}d^s$.

Eugene

i flagged this as not a real question

Peter Tamaroff

@Eugene Why is it not a question??

Eugene

@PeterTamaroff just read the comments. it can't be answered.

anon

04:59

So, basically the OP has not wrapped their head around the definition..

Eugene

yes

this is why i am pushing a "no longer relevant flag"

because whether or not this is a question is debatable.

Frank Science

@anon It's a very difficult one.

@anon There's a problem I've mentioned when I took part in math competitions, It's very old-story.

anon

Eh?

Frank Science

@anon Prove that there are infinity many $n$ such that $n\mid \sigma_k(n)$ where $k>1$ is a positive integer.

@anon I was looking for the notebook and luckily found out this problem.

When $k=1$, it might be an open problem, so $k>1$ is necessary.

Peter Tamaroff

05:14

What about proving there are infinitely many integers such that $\sigma(m^2)=\sigma(n^2)$?

anon

infinitely many distinct pairs

Peter Tamaroff

Burton says $(k,10)=1$ and $m=5k$, $n=4k$.

@anon Potato, patata.

anon

patata is incorrect.

Peter Tamaroff

@anon Patata is correct. I can count to it.

Just as easily as I can count to potato.

Actually $\rm potato \equiv patata \mod \text{translation}$

I'm off. Be well, people.

anon

what is this I don't even

Frank Science

05:24

@anon ?

anon

Indeed.

Eugene

@anon i flagged that too

Frank Science

@anon Pay attention to security. You should avoid private messages when snapshotting.

anon

private messages?

The real security issue is I didn't wash any of the metadata.

Frank Science

For example, the browser you're using, the operating system, etc.

Eugene

05:28

well i now know you live in a central timezone

anon

I could care less if people know I use chrome and OS for my normal surfing.

And I've already given away my location a few times.

Eugene

ah

Frank Science

@anon Incidentally, how to show \hbox{!`} in MathJaX?

anon

Does \hbox{!`} not work? What's it supposed to be?

Frank Science

$\hbox{!`}$

It's only !`, not the reversed !

anon

05:34

no idea

Eugene

it would be a pretty dumb troll for me to ask "what is an elliptic curve" on the main site right?

anon

yes

Eugene

fair enough.

anon

unless it were April 1st

Eugene

two months too late for that

anon

05:37

For april 1st I changed my username, gravatar and profile to match that of robjohn.

Eugene

hopefully MSE will be around next year

@anon that sound pretty cool.

can two users have the same username though?

anon

yes

Eugene

i should think of something really good for next year.

Frank Science

Eh? Can I ask for a proof for Goldbach's conjecture in April Fool?

anon

In fact there are four "anon", four "anonymous", and eight "Anonymous"

@FrankScience pretty sure that was done, like three times just this AF

Eugene

05:40

@FrankScience it's only funny if you ask for it in various restatements

Frank Science

Judging this answer, is it useful?

Eugene

isn't it only useful if you find it useful?

Frank Science

I don't really think it's useful, but somebody has upvoted.

Eugene

nobody has

Frank Science

Why?

Eugene

05:44

i mean the answer has no upvotes.

anon

the answer has one upvote and one downvote

Frank Science

I've downvoted because I want to set a bounty and I don't like to bounty him.

If there's no solution and the deadline comes.

Eugene

he gets it?

Frank Science

No, the deadline will come.

Eugene

so what happens to your bounty?

Frank Science

05:51

I've mentioned a rule in FAQ that if I haven't decided to give the bounty when the deadline comes, the bounty will be given to the solution which gets the most upvotes (if $\ge2$), and if somebody else upvotes him, the bounty will eventually be given to this April-Fool (at least, I think it is) solution.

Eugene

yah that is irritating sometimes. upvotes here are incredibly random. as long as it looks somewhat credible it gets something

Frank Science

And I've mentioned that when I post a problem in fashion (for example, asymptotics, calculus, and so on), the upvotes are usually high, although I think it might not be a very good problem, but when I post a problem out of fashion (usually discrete and elementary), the upvotes are usually low.

Incidentally, is formal-power-series taught in most colleges?

Eugene

yes

Frank Science

In which branch?

Eugene

difficult questions on this site are without glory

@FrankScience take your pick

Frank Science

05:59

@Eugene what?

Eugene

@FrankScience it's basically taught in every branch of math from analysis to number theory.

Frank Science

@Eugene Thanks.

But the problems are too elementary to put into mathoverflow.

Eugene

@FrankScience they are very important after all

Frank Science

@Eugene Formal-power-series?

Eugene

yes

Frank Science

06:02

But I cannot tell the formal one from the other.

Eugene

the other?

Frank Science

in which the convergence is an important problem.

Eugene

ah yes. absolute convergence in a lot more useful IMO

sadly you don't have that a lot

Frank Science

But if it converges at $z=z_0$, the power series converges absolutely in $|z|<|z_0|$, but there're power series which diverge at any point.

For example, $G(z)=\sum_{n\ge0}n!z^n$.

Eugene

that's why you need them as formal objects no?

Frank Science

06:07

Yes, and the differential equation is also formal.

Eugene

ugh. i hate odes

Frank Science

By the way, where should I post the problems which seem difficult but elementary?

robjohn

@Eugene Shakespeare liked them :-)

Eugene

@robjohn he did indeed. i knew i'd pay for not capitalizing

@FrankScience need some elaboration

robjohn

@Eugene You find odes odious?

Eugene

06:11

@robjohn yes. both kinds.

Frank Science

For example, I'm not sure there's one solution for the latest problem I've told you

Eugene

@FrankScience you can ask on meta if this seems suitable for migration to MO

Frank Science

@Eugene Is there any previous example?

Eugene

@FrankScience of migration to MO?

just look for some on meta

@robjohn do you have any idea about 4(a)?

Frank Science

@Eugene Just like this?

Eugene

06:15

i'm trying to get an intuition as to why that small area between the curve and the trapezoid is bounded above by the slopes of the tangent lines.

@FrankScience yes

Frank Science

@Eugene but it is said that More migration requests, flagging for moderator attention is enough. – Willie Wong♦ Jul 9 '11 at 9:57

Eugene

@FrankScience then you can do that then.

i would suggest posting it on meta.MO first to see if it's appropriate for MO

Frank Science

@Eugene Thanks

Eugene

and remember to link to your MSE question

Frank Science

en

I remember that I've posted a problem which is really elementary but no body answered until one pointed out that it was solved in 1963 by Don Knuth but with a bit tricky, clever but elementary technique.

Eugene

06:19

i see

anon

@Eugene That might be a sign typo...

Eugene

so it is the sum

anon

If it's $f'(k)+f'(k+1)$ over $4$ then I can explain it easily with three triangles.

Frank Science

Is it ok?

Eugene

@anon yeah

oh man. i meant meta.MO

Frank Science

06:25

Oh, sorry

What should I do next?

Eugene

they have a "is this question acceptable" category

Frank Science

Oh, wait

Eugene

i hope you have thick skin though because MO users aren't as welcoming as MSE

Frank Science

I remember that I should register for meta.MO?

Eugene

@FrankScience oh? then just leave it as it is on meta.MSE then

Frank Science

06:28

@Eugene Did you register?

@Eugene I've registered on MO but not meta.MO

Eugene

@FrankScience yes i did. it's not an issue though. qiaochu uses MO so he'll know if it's appropriate

do you need the answer in a hurry?

Frank Science

Actually, no. But without answer I feel painful. Can you feel this if you're waiting for an answer?

Eugene

nope.

i keep myself pretty busy in the meantime

i'll give your meta thread it's first upvote so it get attention

Frank Science

Thanks. Incidentally, how to register in meta.MO?

Eugene

the not signed in link

Frank Science

06:35

The righter is Sign in?

The Not signed is not clickable.

Eugene

yes

Frank Science

Apply for membership?

Eugene

yes

Frank Science

Well, I first know that apply has such meaning.

It's not appropriate to post in meta.MO now, but the next time?

Eugene

@FrankScience well you're probably better off in meta.MSE. MO people are less welcoming sometimes.

Frank Science

06:39

Better off?

Eugene

yes.

Frank Science

Can you explain in simple English?

Eugene

as in it's probably safer to ask that here.

Frank Science

So vote to delete in meta.MSE and post in meta.MO?

Eugene

just leave it in meta.MSE is what i'm saying

see asaf's comment?

also who knows additional attention might just get your question answered.

Frank Science

07:04

Yes

robjohn

07:45

@Eugene are you still having trouble with 4(a)?

@BenjaminLim: hey there :-)

Benjamin Lim

hey

just saw the ping from jordan saying he works harder but has no results to show for

@Jordan You know what, just shut it, I use to have pity for you but now, I am sick.

2

@robjohn next semester I am doing a several variables reading course with my supervisor

it's gonna be full on

@robjohn

robjohn

@BenjaminLim that sounds intense

Benjamin Lim

@robjohn 240 pages worth of

robjohn

08:15

@Eugene: Since $f$ is concave, for $x\in[k,k+1]$, we have
$$
f(x)\ge f(k)+(x-k)(f(k+1)-f(k))\tag{1}
$$
Integrating yields
$$
\int_k^{k+1}f(x)\,\mathrm{d}x\ge\frac{f(k)+f(k+1)}{2}\tag{2}
$$
Integrating
$$
f(x)\le f(k)+(x-k)f'(k)
$$
yields
$$
\int_k^{k+1}f(x)\,\mathrm{d}x\le f(k)+\frac12f'(k)\tag{3}
$$
Integrating
$$
f(x)\le f(k+1)+(x-k-1)f'(k+1)
$$
yields
$$
\int_k^{k+1}f(x)\,\mathrm{d}x\le f(k+1)-\frac12f'(k+1)\tag{4}
$$
Averaging $(3)$ and $(4)$ gives
$$
\int_k^{k+1}f(x)\,\mathrm{d}x\le\frac{f(k)+f(k+1)}{2}+\frac{f'(k)-f'(k+1)}{4}\tag{5}

Matt Эллен

hello. I'm trying to understand wikipedia's explanation of positive-definite non-Hermitian matrices. I'm a bit stuck because I don't know what it means for a vector to be 0. What does it mean for a vector to be 0?

robjohn

@MattЭллен all components are 0

Matt Эллен

@robjohn oh! ok, thanks :)

experimentX

08:56

Hi ... does function has be be Vector function to satisfy Green's theorem??

experimentX

09:14

0

Q: Green's theorem

Let the partial derivatives of Q be defined in the enclosed Region R.How to picture this geometrically? $$ \iint_S \frac{\partial Q_y(x,y)}{\partial x} dx dy = \int \left ( \int\frac{\partial Q_y(x,y)}{\partial x} dx \right ) dy = \oint Q_y dy$$ I don't understand how it changes into closed loop?...

multivariable-calculus

Jonas Teuwen

11:17

Holy cow I slept right through two appointments! 8-).

Which day is it today...?

Hmm, already Wednesday 8-(.

Jordan

11:54

@BenjaminLim It is because you have things easy and you don't know what it is like when it is hard.

skullpatrol

@Jordan Whatever, let the haters hate.

Jordan

I am starting to get the feeling that no one here really had to struggle a lot in school

skullpatrol

Your feeling is probably correct in some cases.

Jordan

especially people like Peter or Ban that are 19 doing third or fourth year college level math

And they only reinforce my idea when they attempt to say that they are doing first year math, like they are completely oblivious to the world outside of their private school education

skullpatrol

What do you mean?

Jordan

12:10

People like them talk down to me a lot whether or not they realize it, saying things are so easy that I cant get at all

N3buchadnezzar

Well I find it weird that you find it suprising that people in a math forum excels at math It would be like going to a car showoff, and be surprised that people are good with cars.

And I guess most people struggle with various things in their lives, some with math some with other problems. But the difference is that they keep their wining to themselves, and just deal with their own problems =)

Jordan

Well it is really difficult to keep a good attitude when I work so hard at something and not even once it can pay off

skullpatrol

@Jordan What do you consider to be a "pay off" in math?

N3buchadnezzar

Proving the goldbach conjucture ^^

Jordan

12:28

I just want to get a decent grade, it would be amazing if I could get an A on a test

but really the best I have done on a test is a B on the easiest test in a class I already took one time with a reall easy teacher who gives you half points just for showing work

so really I got like a D on the test

N3buchadnezzar

@Jordan You are not the only one getting mediocre grades.

Jordan

@N3buchadnezzar But how many people put in as much work as I do and have to take each class twice just to get a C or B?

N3buchadnezzar

Plenty

Rahul

12:57

Hello freinds.

Anyone knows the "Newton's 350 year old puzzle"?

Transcript for

$Mathematics$ Mathematics