Is anyone familiar with what problems are in the book "Tomorrow's Math: Unsolved Problems for the Amateur"? Are many of the problems still unsolved?

Hello @TedShifrin.

Hi @Jasper

@TedShifrin I heard Pedro wanted to get Spivak's 5 books and recommended him amazon.com.

I don't necessarily recommend that , as I said.

@TedShifrin yo Ted, any thoughts on ^ ? :-)

he doesn't reply :O

@blue I am here but I can't help you. Has school started?

nope, couple weeks till

We start Monday. There's an obvious induced representation, $\text{ad}\rho$, right, @blue?

@TedShifrin I thought ad turned representations of lie groups into representations of lie algebras.

this is from page 6 of this btw

That's Ad usually :)

oh. so what's ad again?

lie bracket as a linear map on $\frak g$.

oh jeez it's back on page 3

but ad:g->gl(g) no?

Yes. Remember, he's decomposing ad$(x)$

Hi professor @Ted Shifrin

Hi @skull

@TedShifrin which of the following are incorrect: (i) $x_s\in \frak gl(g)$ and $x_n\in \frak gl(g)$, (ii) the domain of $\varrho$ is $\frak g$, (iii) $\varrho(x)$ only makes sense if $x$ is in the domain of $\varrho$

I'm saying everyone abuses notation and writes $\rho$ for various other induced representations coming therefrom.

well ${\rm ad}\rho(x_s)$ and ${\rm ad}\rho(x_n)$ don't make sense either, because they're elements of $gl(gl(V))$, while the text says $\varrho(x_s)$, $\varrho(x_n)$ are in $gl(V)$. why don't you just set me straight and tell me what $\varrho(x_s)$ and $\varrho(x_n)$ are? :)

I'm not withholding information to be evil.

So what does $\rho(\text{ad}(x))$ mean?

(Pedantically, this is $\text{ad}(\rho)$, I suppose.)

well ${\rm ad}(x_n)$ and ${\rm ad}(x_s)$ are in $gl(gl(g))$, which is even further from the domain of $\varrho$ (namely $g$) than $gl(V)\ni x_n,x_s$ is.

$\text{ad}(x)(y) = [x,y]$, and $\rho([x,y]) = [\rho(x),\rho(y)]$.

no, no, no extra ad there!!

you asked me what $\rho(ad(x))$ meant...

So, from what I wrote, we should have $\rho(\text{ad}(x)) = \text{ad}(\rho(x))\in {\frak gl}(V)$.

And you split that into its semisimple and nilpotent parts ...

if $x\in\frak g$ then $\rho(g)\in {\frak gl}(V)$ then ${\rm ad}(\rho(x))\in{\frak gl}({\frak gl}(V))$ no?

because ${\rm ad}:{\frak gl}(V)\to{\frak gl}({\frak gl}(V))$

I don't think so.

oh, I see

in order for ${\rm ad}(\rho(x))$ to make sense, ${\rm ad}$ needs to be able to take in $\rho(x)$ as an argument, which means the domain of ${\rm ad}$ must be ${\frak gl}(V)$. and $\rm ad$ takes a lie algebra to its own general lie algebra, so ${\rm ad}:{\frak gl}(V)\to{\frak gl}({\frak gl}(V))$

brb

No, @skull ... I'm too busy being confused by @anon.

@skullpatrol Haha, why are you asking him?

He is wise.

But what are you asking for? This is a non-issue.

It bothers me

If it bothers you, you should talk to a mod about it, not Ted.

I don't trust most of them

They are the only ones who can do anything. You can ask our Eng mods if you want.

Matt & robjohn are the only two

You can ask Matt then, since it probably happened in the Eng room.

He's not there now

You can even ask a question on meta.

But Ted has nothing to do with this.

Hey @anon, welcome back.

I've had enough of this "network"

Then quit. Delete your account like me.

perhaps I may pal :)

@Jasper: Your deletions/readditions are getting close to $\aleph_1$ :P

@TedShifrin I am trying to keep my current account for life.

ha ha :)

Haha.

no more preemptive threats and disappearances?

Hopefully not. I kept deleting email accounts too.

@blue: I haven't thought about representation theory in a while, but I think this is just notation, and you should be reading a more thorough exposition. So, I believe $\rho(\text{ad}(x))\in{\frak gl}(V)$ is the linear map given by $\rho(\text{ad}(x))v = \text{ad}(\rho(x))(v) = [\rho(x),v]$.

This is an announcement. My email is now jasperloy at outlook dot com. I hope to keep this email account for life.

well, @Jasper, if you ever email me, I'll have your address then :)

Pardon my interruption Professor.

no problem, @skull ...

When you interrupt me for a math question, I'll deal with that.

@TedShifrin what does $\rho(x)v-v\rho(x)$ mean for a linear transformation $\rho(x)\in{\frak gl}(V)$ and a vector $v\in V$?

It's confusing when both anon and blue are here.

Crap.

No, no, $\rho(x)$ is an element of $V$. Don't confuzle me!

What I wrote makes sense as a definition.

but $\rho:{\frak g}\to{\frak gl}(V)$ was defined to be a lie algebra representation from the beginning ...

:confus:

LOL, @Pedro's "confus" is spreading.

he got it from me, who got it from the 4chan meme

Yeah, you got me.

I get "confus" from French.

heh

Haven't seen the French guys in ages ...

Hello!

speak of the tamaroff

Ah, the deus ex machina appears. I figured you'd gone to Philadelphia, @Pedro.

@blue I was going to say that.

Hello my dear @PedroTamaroff, did you get my messages in chat?

You're right, @blue. It's a mess. Find a better book to read.

I ought to be able to sort it out, but not tonight.

@TedShifrin I didn't. Actually went to play tennis and then to drink and eat.

Philadelphia is too far away...

I take it you're better, @Pedro.

@JasperLoy Yes.

It's not far at all ... It's like a bit more than an hour.

@TedShifrin By car, I guess. But my sister has two children.

Steal her car :P

@blue Now I'm doubting if I got it from

that's where I got it from

and posted it

charlie called it cute

or maybe it was gigili

I never post any cat pics.

I wonder where gigili is.

I don't even know whom you're talking about.

She's still around

You're too chat-young.

Hehehehe

Maybe I should retire from chat as well ...

I am still around too, lol.

@TedShifrin Sounds like me.

My department head asked me today when I was submitting my letter of resignation/retirement :P

@TedShifrin What did he ask?

@TedShifrin Do another ten years of work.

what I just said, @Pedro :)

Enjoy life

@blue I can still group theory!

@anon: I suppose one way out of this is to think of $\frak gl(g) = \frak g^*\otimes\frak g$ and use the tensor product of the two representations. But then we don't end up in ${\frak gl}(V)$. GRR.

@Pedro: You didn't done answer me. You feeling better?

@TedShifrin Oh, yes. I still have a runny nose, though.

Well, I'm sure you ran faster.

@TedShifrin The court was very similar to the one in GA. I couldn't drift.

but surely someone gave you a good challenge, for a change :)

@TedShifrin I played with my brother in law. I actually lost. =D

@blue: The standard beginning text on Lie Algebras and Representations is Jim Humphreys' ... try reading it.

I was 4-2 and I lost 4-6.

Sorry I dragged you down, @Pedro :(

I'll try not to do that in math for a year.

@TedShifrin Don't be silly! =P

@PedroTamaroff group actions should be in every text on group theory

@PedroTamaroff Still in NJ?

@robjohn I am still in SG, lol.

I am now considering changing my reading list to all the Lang books...

If only Lang were still alive, I would ask him to write a book on algebraic topology, since that seems missing from his list of topics.

@robjohn Is it important to learn about topological vector spaces in functional analysis, or are Banach and Hilbert spaces sufficient?

@JasperLoy It depends on where you want to go with it. I think you can get a good number of examples of the ideas to be used with Banach and Hilbert spaces.

@JasperLoy Never got your mail about your mischief.

Morning

Hi

Hey

hi

hello

Hey!

Hi @Chris'ssis!

Greetings :-)

I did not buy Apostol's calculus books in the end, too bloody expensive.

who the heck starred skullpa-troll?

Not me, why?

this. guy.

I have mostly been getting 1 vote per answer, sigh...

Morning people!

Here is a funny question I received this morning.

I was told it was given on the international olympiad for students, but it's elementary as I can see.

It's worth giving it a try. Just for fun.

certainly $\alpha$ must be unique, if it exists

in which case $\beta$ is too

(well, $\alpha$ is unique if we don't count $\beta=0$ for large enough $\alpha$)

a good starting point would be to set $n=1+2+\cdots+m$ for some $m$

in order to simplify $\sum_{k=1}^n a_k$

Right.

so $\sum_{k=1}^n a_k$ looks like $\sum_{i=1}^m i(i+1)/2$ which is $\sim m^3/6$ (don't need to work out the lower order terms), whereas $n^\alpha\sim m^{2\alpha}/2^\alpha$. hence $\alpha=3/2$ and $\beta=2^{3/2}/6$. (we'd need to show the limit does indeed exist with some bounding arguments, but that's bookkeeping)

there we go

$\beta=\sqrt{2}/3$

@Chris'ssis That's what he wrote.

Hello @TedShifrin

@BalarkaSen I don't get your point. I put things in a simplified form. (Do you even read what I write here?)

@Chris'ssis $2^{3/2}/6 = \sqrt{2}/3$

Lang's Real and Functional Analysis does integration of Banach-valued functions, crazy.

@BalarkaSen You don't need to show me this as if I didn't knew it.

His Fundamentals of Differential Geometry uses Banach manifolds, also crazy.

@Chris'ssis I naturally ask people to define "simplified" but ok. I thought you didn't notice the equivalence.

@BalarkaSen What are you studying these days?

@blue Ever thought about the Riemannsurface $w = j(z)$?

@JasperLoy Commutative algebra.

@BalarkaSen Which book?

Atiyah-McDonald

@blue Nicely done. I was surprised how easy it was (it's an international olympiad though).

@Chris'ssis Yeah, naturally you don't see such easy problems in olympiad.

especially IMO

I can never do IMO questions. Does it mean I should not do research math?

@BalarkaSen The problem is that "easy" may be interpreted depeding on the persons you are referring at. I also think that my experience plays an important part here. I probably say "easy" to many problems that are considered pretty hard by others.

@JasperLoy IMO problems are not research math

@Chris'ssis Haha, indeed.

@Chris'ssis You are a genius, so most things are easy, lol.

But I have done a bit asymptotics so it wasn't that hard either

@JasperLoy No, I'm not. I wish I was one though. :-)

Well, I accept myself the way I am. :D

Heyo @Alizter

I've got a problem for you.

Hey @BalarkaSen

What is a problem you have?

@Alizter Construct a galois extension $K/\Bbb {Q}$ which is totally real and has galois group $\Bbb Z_3$

I am thinking maybe splitting field of $\Phi_4$? wait noo

ignore that

@BalarkaSen I have a whole plane journey to think about that. I will get back to you.

you understand what i mean by totally real, no?

@Alizter OK

I can't believe you youngsters have studied so much math.

@BalarkaSen Yes. Only elements from $\Bbb R$

@Alizter are adjoined.

I was looking at V S Sunder's website, impressive publication list.

equivalently, adjoining one of the roots of the corresponding polynomial gives the whole extension back @Alizter

unlike $\Bbb Q(\sqrt[3]{2}, i)$

@BalarkaSen Yes. I will have a think about that

Ive gotta run bye

@robjohn it looks like you're too silent these days ... :-)

@Chris'ssis Do you know of anything like integrating continued fraction expansions?

Could anyone here explain about the answer posted by Joriki here: math.stackexchange.com/a/325151/123277? I think the integral is 'incorrect'.

@BalarkaSen that's crazy talk

@blue i know i am being vague

just a thought. nevermind

I wasn't calling it vague, I was calling it wild.

?

what's that supposed to mean?

@Tunk-Fey I suspect you're right, as $\displaystyle\int_0^\pi \phi^{n-2}d\phi=\frac{\pi^{n-1}}{\color{Red}{n-1}}$ (p.s. you need the LaTeX in chat bookmark linked on the starboard to see latex in chat)

(haven't even looked at the rest of the problem)

@BalarkaSen I saw some paper in the past, but I didn't attend the integration of the continued fraction expansions, not yet.

@BalarkaSen wild means, well, wild

like those things

@blue His answer seems promising but there's something missing there.

@Chris'ssis OK, let me know if you find something/stumble upon any relevant paper.

@BalarkaSen OK

Thanks in advanced.

@blue Can you help me with a (elementary, nevertheless hard) problem?

It's an olympiad problem I guess, but I am taking a nontrivial cool-boy approach.

@BalarkaSen maybe, maybe not

won't know till I see it

wait a sec i am doing some typing in another forum. crank handling.

OK, here goes. are you with me @blue?

The problem is to prove that if $xy$ divides $x^2 + y^2 + 1$ then $\cfrac{x^2 + y^2 + 1}{xy} = 3$. This looks very similar to the other problem about $\cfrac{x^2+y^2}{1+xy}$ which is done by boring methods like Vieta jumping and inequalities so I suspected that it's from Olympiad. My approach was somewhat like this

Let $\cfrac{x^2 + y^2 + 1}{xy} = k$. Then $x^2 + y^2 + 1 = kxy$ which is $x^2 - (ky)x + (y^2 + 1) = 0$ after rearranging. The disc of this polynomial is $(k^2-4)y^2 - 4$ which we require to be a square.

Thus one arrives at a Pell-like equation $m^2 - (k^2 - 4)n^2 = - 4$. A little modular arithmetic confirms that $k$ is one of $\pm\{1 , 3\}$ modulo $8$ but that's all I have found right now.

Any idea about what now?

interesting, not sure

I like the approach better than jumping

@blue bows

If nothing, I can ask interesting questions and develop interesting (although mostly incomplete) approaches to generally boring problems.

I am thinking about finite projective planes.

Given a projective plane (P,L) we can form an equivalence relation on (P choose 2) as {a,b}~{c,d} if the line incident with a,b equals the line incident with c,d. We can identify lines in L with equivalence classes in (P choose 2). In this way, we can think of line sets as partitions of (P choose 2). I'm wondering what conditions we need on such a partition to guarantee it's a valid line set.

i'd have to toss a coin. no idea.

Hey @AntonioVargas

@BalarkaSen yo. How's it going?

Good, good. Haven't seen you here lately.

I've been working on some other things, or at least trying to

There are a couple of projects I want to make some progress on before the semester starts

I'm still addicted to this site though...

Haha, everyone is. That's what MSE does to you.

@robjohn Am I being stooopid not to realize the convergence of this?

@BalarkaSen take the log and it is pretty easy

$\frac12\log(2)+\frac14\log(3)+\frac18\log(4)+\dots$

Ah, right.

@BalarkaSen It comes to approximately 2.7612068419574980332

Yes.

I just did it with PARI.

oeis.org/A112302

@BalarkaSen It would be the square of that number

@robjohn potato-pohtato. it's not possible that one is transcendental but the other is not =)

@BalarkaSen sure... one is transcendental if the other is

@BalarkaSen is anything known of the transcendentality?

not that I know of. OEIS mentions nothing.

The exponential nature makes me think that it is transcendental.

@Chris'ssis sorry, things are hectic.

@robjohn OK

@Chris'ssis is the answer to that limit of integral problem $\frac{\log 2}{2}$ ? :-) its just Cesaro-Stolz right ? :)

@r9m Yes. :-) Do you have a solution? :D

@r9m Yeap! :D

:D

@r9m Good job!

@r9m btw, what do you think about problem $1.7.$ from Ovi's book? Do you see a brilliant solution there? :D

@Chris'ssis okay .. lemme check ..

@r9m I have a very nice proof there (btw, that book is a blessing). :D

@Chris'ssis wait ,, gimmie some time .. I wanna try it too :)

@r9m OK

@Chris'ssis problem 1.41 in the book is identical :}

@Chris'ssis Hey Chris, what book are you referring to? :)

@r9m "Limits, Series, and Fractional Part Integrals: Problems in Mathematical Analysis" by Ovidiu Furdui, a great book. :-)

springer.com/mathematics/analysis/book/978-1-4614-6761-8

@Chris'ssis Ovi's book ... it gives me nightmares :P

@r9m What gives you nightmares? :-)

@Chris'ssis Thanks a lot! Are there also problems in there for undergraduate students?

@rehband Sure. You have a preview on that link.

@Chris'ssis Awesome, I'll check it out

@rehband It's the best book I've ever seen. Any student should have it. :-)

@Chris'ssis That's a strong statement! :) I love your responses on MSE and I really want to develop similar abilities. This book may be just the right thing

@r9m This world needs such books. I'm glad it exists.

@rehband My answers on MSE are usually poor, just less explained, not detailed as it should be. My real proofs look totally different. :-)

@rehband Indeed. I agree with that.

@Chris'ssis This has its upsides as well. Makes you work to understand the answer :) I'll try to get that book from my university library tomorrow

@rehband I hope to be able to publish such a book too ... (it's not easy at all, and it requires an insane amount of work)

@Chris'ssis Wow awesome, I'd love to see that happen :D Are you from the USA?

@rehband No. I'm from Romania.

@r9m But just think about it: how about a solution without using Stolz theorem? :D

@Chris'ssis :o how ? .. I mean it can be done .. but won't be woporpap :| .. do you have a idea of doing it woporpap without using stolz thm ?

@Chris'ssis Awesome. I need to leave now, hope u have a great day (and I hope u post on MSE forever) hehe

@rehband :D The same to you!

@r9m Yeah, sure. :-)

@Chris'ssis how ?!!! :D

@r9m By a very clever trick. I'll show you when I put things on paper. :-)

@Chris'ssis okay .. :D

(in case you don't wanna think of it for some more time)

okay .. done with squeezing thm .. :)

@BalarkaSen I had a think about it but I could not find a totally real one

@r9m did you do it? :-)

@r9m Nice. :-)

@Chris'ssis oh ! okay okay :-) sorry to make you repeat .. :)

@r9m I'll show you when I put things on paper. :-)

@r9m It's nice to have multiple solutions to each problem.

@Chris'ssis Indeed .. the more the merrier :D

@r9m :D

@r9m Would it make sense to approximate the inner sum by an integral?

(better say, using Euler–Maclaurin formula)

@Chris'ssis sure ,., done that way too :-)

@r9m :-) We need to break all the limits of any kind.

@Chris'ssis problem 1.7 has no hints :(

@r9m Take a look here ...

@Chris'ssis got it :)

@r9m I hope you like it. :-)

@Chris'ssis WoW !! that was smooth !! :D

@blue @anon: OK, I've done a bit of research for you. So, given $x\in\frak g$, there are $x_s,x_n\in\frak g$ so that $\rho(x_s)$ is the semisimple part of $\rho(x)$, and correspondingly for $x_n$.

By the way, Fulton/Harris make a big deal of saying $\frak g$ has to be semisimple. So the key point is that when $\frak g$ is semisimple, $\text{ad}:\frak g\to\frak gl(g)$ gives an embedding. So we take the Jordan decomposition of $\text{ad}(x)$ and these elements come back to unique elements of $\frak g$.

@r9m Thanks! :D

P.S. @blue @anon: I highly recommend Fulton/Harris's Representation Theory: A First Course. These guys are among the best expositors of algebra/algebraic geometry.

@r9m I wonder if we might come up with another brilliant proof ... (I'm inclined to say "yes") :-)

@Chris'ssis okay .. :)

bbl

Thank you Professor @TedShifrin we appreciate your recommendations :)

Hi, @Ted. How's things?

Oh, he's gone again. Well.

Thanks pal @DanielFischer :-)

heya @DanielF ... I dropped by to correct my stupidity with @blue last night.

@skull: You don't need to thank me when it's not for you :P

@TedShifrin Stupidity as in "made a mistake" or as in "didn't know the answer"?

We crank up for classes on Monday, @DanielF, so I'm dealing with last-minute emergencies. Classes are more or less ready to go.

Yes @DanielF.

Never ask a mathematician an "or" question ;)

lol

He was quoting a poorly written source on representation theory which didn't explain things and, to make things worse, seems to have omitted a necessary hypothesis. But I couldn't explain off the top of my head and only made things worse. Of course, why blue would ask me a question about algebra is beyond me ...

In fact, @DanielF, the answer is yes, both.

Hi all

Hi

@JohnDoe You mean a net in $W$, presumably. Yes, in every topological space, the closure of a set $A$ is precisely the set of points such that some net in $A$ converges to that point.

Yes a net in $W$. So this differs with sequences since in sequences you know that the directed set in the set of natural numbers here you can't say exactly what the directed set is?

@DanielFischer