Well, I'm kinda tired now. See you guys later.

Bye, JM.

Later, JM.

@Srivatsan you can see this here

Aw, right.

@JM What is it that can't be done that is done there?

Sorry, I just came in on the discussion and I don't see the answer nearby :-)

And I didn't even notice that you've left :-)

What happens to the rejected edit suggestions? Will they be presented to the user who made the suggestion (so that they can learn why the reason for rejection)?

@Srivatsan Good question. I have no idea.

Have you made any edit suggestions?

@Srivatsan A long time ago, but they were all accepted.

@robjohn I guess people accept most suggestions since accept means +2 for that user. =)

Oh, not to say you made some suggestion that should've been rejected... :P

If a suggestion has a problem, I have tried to improve the edit, but it simply puts me into a mode to edit the original.

@Srivatsan I was simply saying that I don't know what happens when a suggestion is rejected.

@robjohn Doing that has at least two problems: 1. The post is unnecessarily touched by too many hands; 2. The suggester never learns or realises that there is scope for improvement.

[I guess an alternative is to leave a comment to that user, explaining what can be improved...]

@Srivatsan Yes, but I hate to enter all their edits and fix the one problem. I would have to accept their edit and then edit again myself.

@Srivatsan Yes, an edit comment would be nice.

That's why I rejected one suggestion today. The post had three issues, and the person corrected only one...

@Srivatsan Hmm. I would have accepted the edit, if it were correct, and then edit the rest myself. That is just a difference in operating procedures.

@robjohn I guess that helps a lot actually. Once @tb shot down my TeXing skills in a comment =). Just kidding, but that made me I realise quite a few issues that weren't quite obvious.

@robjohn What do I say, you're too nice... =)

My Algebraic Topology lecturer produced a counterexample to the obvious generalisation of this question via, of course, the homology a certain algebraic variety...

What is the generalisation?

Let $R$ be a (commutative) ring, $\mathfrak{a}$ an ideal. Then there is a canonical map $\textrm{SL}_2(R) \to \textrm{SL}_2(R/\mathfrak{a})$. The question is, are there $R$ and $\mathfrak{a}$ so that this map is not surjective?

@Srivatsan You're going to ruin my "mean square" reputation.

@robjohn You ruined it yourself by draping yourself in candy cane.

I think the (counter)example that came in the end had $R$ a polynomial ring and $\mathfrak{a}$ prime...

@Srivatsan I was hoping for a "sweet & sour" or "bittersweet" image there.

@ZhenLin Is the "2" significant?

Does the MSE question you linked to work if changed to SL_k(Z) -> SL_k(Z/nZ)?

Hmmm... I think he claimed it still works (but did not prove even the 2-dimensional case).

Speaking of SL's, is it true that every volume preserving continuous map $\mathbf R^n \to \mathbf R^n$ is linear? [$\operatorname{SL}(n, \mathbf R)$ are the volume-preserving linear maps.]

Well, there's the obvious counterexample of a translation, which is technically non-linear...

Right, that's true. =)

I know that every isometry (fixing at least one point) is linear, and hence an orthogonal transformation.

I apologise for interrupting, but if may I please ask an unrelated question?Sorry if I am rude.

Not at all rude. Shoot your question :). // You may not get an answer right away, but if someone reads it and has something to say then they will ping you.

Oh.sorry in that case.

@SabyasachiMukherjee Do ask.

oh.I see.I was wondering which the toughest introductory book on Abstract algebra is

Is Hernstein tougher than Artin?

@Srivatsan No, this is very far from true. The group of volume-preserving maps of $\mathbb R^n$ is infinite-dimensional if $n \geq 2$. A standard method to get examples is using Hamiltonian flows and Liouville's theorem on flows

@tb I see. Thanks for the link.

Is there any obvious or simple example?

@Srivatsan again, a rotation about the point $(1,0)$ is not technically linear.

@robjohn It's affine, no?

@Srivatsan it is, but there are a lot of non-trivial volume preserving maps.

@robjohn OK. What subject would this question fall under? Wiki page seems to talk about "symplectics" but I am not sure what this is...

In $\mathbb{R}^3$, rotate shells in a continuous fashion. That is a non-linear, volume preserving map.

@robjohn That preserves volumes? Why/how?

take any continuous family of unitary matrices, $U_r$, and map $x\mapsto U_{|x|}x$.

That preserves volumes.

compute volumes by the shell method.

Just confirming - your notation means that the rotation depends on only the radial distance, is it?

Hi! Anyone here familiar with Von Neumann's trace inequality?

@Srivatsan In this example, yes; but this can be obfuscated by combining with translations, shears, and other maps that preserve volumes.

@robjohn Yes, that makes sense.

This is so cool... :=)

@Srivatsan There are some really bizarre looking maps that preserve volume.

And the "shell method" is simply to decompose a body into radial shells and integrate the area of $\mathrm{body} \cap \text{ Sphere of radius } r$?

[My description looks obfuscated, but hopefully it's right...]

@Srivatsan Integrate the area of the body intersected with the shell times the width of the shell.

Ok. Got it.

Using this idea to prove volume-preservation is quite interesting.

Thanks, robjohn.

This is bizarre: why is the OP hung up on why there is only one generator?

@Srivatsan as mentioned in the comments, there is one generator "in S". That seems reasonable.

@Srivatsan If there were only one generator, that would seem to be a problem, would it not?

some power of a generator should also be a generator, if I am not mistaken.

@Srivatsan: is there some part of your AM-GM-HM question that remains unanswered?

Ugh! There's this annoying fly here.

@AsafKaragila A thermo-nuclear device would get rid of your problem :-)

Flies are the trolls of real life. They don't really bite, but they make this irritating sound and piss you off.

@robjohn Some power of a generator need not be a generator. Indeed every element is some power of a generator...

@AsafKaragila You've never been bitten by a fly?

@robjohn Do you have any? Ahmadinejad won't share :(

@robjohn Mosquitoes yes, flies no. Except those nasty desert flies, but that's not that.

@Srivatsan not all powers, but some power.

@AsafKaragila Hmm. The flies here bite.

@robjohn Read that way, yes. Because, if $g$ is a generator and $h$ is any other generator, then surely $h$ can be written as a power of $g$ (since $g$ is a generator) =)

@robjohn I don't think so. :)

Unless you want me to make up some questions on the fly.

@robjohn But do they also feast on your liver?

@AsafKaragila not unless I have been performing open liver surgery.

or zombies have been at my liver beforehand...

@robjohn Have you?

@AsafKaragila not recently.

@robjohn Good, I think.

@robjohn I won't accept answers for some time. I'm letting the answers soak in.

@Srivatsan I wasn't worried about that, after all acceptance points are a minor portion of the reputation points. I just wondered whether there was something I'd missed.

@robjohn Well, that was just a side point.

@robjohn He's trying to say that your answer sucks. :-P

@AsafKaragila I know, but I have to ignore that or I might start to cry :-p

@robjohn You should cry and send him a patch of beard soaked with tears, so he'll know how bad it hurts you!! :-P

@AsafKaragila I could do the same thing with a wrecking ball through the wall :-D

@robjohn I didn't think you're neighbors....

@AsafKaragila I'm sure I can order one online...

@robjohn I think I should give you a second chance by posting another question =)

@robjohn Well, you are living in the USA...

@Srivatsan Gee, thanks.

This guy is fast...

@AsafKaragila so we have to be neighbors.

@robjohn Well, not quite neighbours. We live a couple of miles apart.

@robjohn No, I'm saying that you live in the USA so it's possible to get a wrecking ball service online :-P

@Srivatsan All three of them?

@AsafKaragila Ah, yes.

@Srivatsan Are you stopping by soon?

He's around. If he won't answer it's because robjohn is wrecking his house.

@Sivaraman I haven't eaten lunch yet, so...

@Srivatsan Where are you planning to eat? I haven't really eaten either :-/

@Srivatsan Are you going to meet for lunch, and you gonna decide that in here?

Are you suggesting grabbing something?

@Srivatsan Or you can give me a time in the future :)

I'm not sure what is open.

Hi @AsafKaragila.

@Sivaraman Ok, I will meet you in the future. 3.30?

@Sivaraman $(a,b)$ is an open interval.

@Srivatsan, @AsafKaragila OK :)

An abstract one at that. People doubt whether $(0,1)$ is open enough...

@Sivaraman It's your turn now. I told you time.

@Srivatsan My turn for?

Choosing what and where to eat.

Randomness?

@Sivaraman I gave a time; does that work?

Yes I guess so.

Bye, then.

Bye @rob and Asaf. I'll going out for lunch.

Yeah, I figured that.

@Srivatsan eat well!

Who wanna drop an axe?

So I take it that lexicographic proximity is not the only thing the two S's share.

@AsafKaragila thwack!

@robjohn Yes. Lexicographic, geographic, racial(?) proximity. Also, youtube.com/watch?v=e1DnltskkWk&t=2m6s :)

@Sivaraman Shouldn't you be meeting Srivatsan for lunch now?

@AsafKaragila I think we're meeting after.

Oh.

Can you relay a message to him?

Yeah.

Just tell him I said something racist about his Indian origin :-P

Yeah. No problem. I can make something up if you'd like ;-)

Sure, knock yourself out.

@robjohn I found another kind of school that the teachers can "pass the buck" to Rob

@Skullpatrol Oh?

It is called "intermediate" school grades 5-6

between elementary and middle school

@Skullpatrol Never heard of that. Where do they classify those grades like that?

Has anyone here read Bott and Tu?

@Potato Yeah, he dies at the end.

Raoul Bott is actually dead...

@robjohn I found it on wiki for a school district in Dallas

@Potato I meant the hero in the book. He saves the girl, but dies.

@robjohn Highland Park Independent School District

We must be speaking about different books. I am talking about a book on differential forms in algebraic topology, not an adventure novel.

@Potato So do I.

I am very confused now.

I am hungry.

@Potato Bott+Tu is fantastic.

@robjohn Here is the link where I found it en.wikipedia.org/wiki/Highland_Park_Independent_School_District

@CamMcLeman How much algebraic topology does one have to know to do publishable original work (even the most minor work)? I assume with the state of the art today that just Hatcher and Bott/Tu will not suffice.

@AsafKaragila Come to the States and you can have lunch with S&S.

@Potato: That's a tough question, but I think it's safe to say that if you were solid on everything in Hatcher and Bott/Tu, you would be able to begin working on publishable original work, even if you weren't yet at the very frontier of modern research in algebraic topology.

Oh wow, really? I guess it does reduce to having a good advisor who can choose good problems.

My conception of research is that you read all the advanced monographs and have everything down pat before beginning research, and I don't think it works this way in reality.

@robjohn I have a policy against dining with Hitler's army.

Also I am making a kid-pizza.

@AsafKaragila Hitler's army? Perhaps I'd best not ask.

@AsafKaragila what kind of pizza?

@robjohn Well, The S.S. :-P

@AsafKaragila Ah, okay.

@robjohn Kid style pizza. You take a pita bread, cut it open and put some tomato paste, cheese and olives then into the toaster oven for a few minutes. Of course I topped it up a notch with pesto, three kinds of cheese and further additions.

@AsafKaragila Ah, a pitza :-)

@robjohn Heh. Yeah.

@robjohn I guess the middle school idea is good in its own way because it makes the high school program, grades 9 - 12 into a 4 year program which is what the bachelor program is in university...

@Skullpatrol and why is that good? I would think that what would be best depends on the maturity of the students involved.

middle school/junior high is different from elementary school in that the students manage their own schedules, moving from one class to another.

That was some good pitza.

@robjohn I agree it does depend on the "maturity" of the student, but this way all the students get to try out a 4 year program before deciding on university, in my opinion.

In high school, they also choose their own classes. But they are watched and counseled more closely than in college.

@Skullpatrol I don't think the length of the program is much of an issue. For kids of high school age, I think 3 years may be the equivalent of 4 years at college age.

@robjohn "equivalent?" in what way??

@Skullpatrol time is different as people age. For most people, it passes faster as they get older.

and I don't think that the length of the program is what needs to be tested. It is more the choosing of your own classes, and management of your own studies, that needs practice.

@robjohn I agree "time managment" is a big issue

but also in the overall picture students should get practice at making a "4 year plan."

in my opinion

@robjohn having said that I once read that the average science/ math degree takes 6 years to complete a bachelor

@Skullpatrol I don't think that most high school kids are capable of even conceiving of a four year plan. That is too long a time period for someone that old (14 or 15 at the inception).

and I think that the idea of high school is to master more basic skills than a four year plan.

Even some college students are not really ready to make a four year plan.

@robjohn As I said, I agree it does depend on the "maturity" of the student.

@robjohn One of the basic skills that needs to be mastered is PreAlgebra and of coarse Algebra, but I think this gets lost in the middle school to high school transition. And now having a 4 year high school program with students thrown into Calculus classes leaves me wondering if students are able to "mature" mathematically before moving on to new areas of study in math?

@Dylan Hi

Bye Dylan

@AsafKaragila Hey Asaf. How's that cursed algebra?

@Skullpatrol You seem to now be assuming that all students will be taking calculus. You have jumped from general maturation into mathematical education. These things do not generally correlate.

@DylanMoreland I managed to finish that question.

I have to finish like three more questions by 12 hours ago.

@AsafKaragila that might be hard to do (have done?).

@robjohn Unless I do it so fast that I go back in time!

Is it true that all a non-algebraist needs to know about groups is contained in Lang's Algebra? The group theory section seems a bit light on exercises...

Superman.

@DylanMoreland Well, I do have a killer headache.

@Potato The exercises there are pretty serious, I thought. I learned something from most of them.

What were you expecting?

@DylanMoreland "Prove all groups of order less than 60 are solvable"?

That seems hard.

Not sure, I was just wondering.

Well I think earlier on he has you prove things about groups of order $2pq$, $p^3$, $p^2q$ and so on.

That takes care of a lot of it.

Indeed.

I guess what I like about Lang is that he usually doesn't waste your time, but on the other hand he might skip something that's pretty important.

I thought the exercises on primitive groups and related notions were useful.

Also, this is just a general knowledge question, but I've had a very good mathematician tell me that a solid knowledge of linear algebra is absolutely necessary to be a good mathematician. But when I look at the qual courses I am supposed to take in grad school, none of them appear to use linear algebra that much, if at all.

Ok, I guess I will just have to work through it. My original meaning was that for 80 pages of text it seems like too few exercises, but if they are as meaningful as you say then it should be alright.

@Potato On a totally unrelated note, if too few exercises are your concern, you must look into Dummit and Foote.

Bergman has some extra exercises if you need more. They're organized by section, which is nice.

You might also take a look at Isaacs' Algebra: A Graduate Course.

Lots of hard exercises. Very healthy.

Thanks for the recommendations.

Do you know how sometimes you know that you're supposed to prove something, have no idea nor the inclination to find out, but you figure out that if you just ignore the fact that you need to prove it - it will be fine?

Yes. I still haven't actually learned about triangulating manifolds rigorously. Don't tell anyone.

And, @Potato Have you looked into Artin's Algebra

I have a copy. I used it as reference in my undergrad class.

If this is a long-term project: my friend Mitya is teaching group theory out of Lang next semester. Any homework he gives will be great.

So you could look there in a week or so.

Math is always a long-term project.

@robjohn General maturation and mathematical education do not generally correlate? Is it not generally true that the behaviorly more mature students are the ones that are willing to put in the time to do their homework and thus progress further and sometimes faster in subjects like math and the sciences?

I think that someday I'll teach a course in set theory, and the final project would be to write an extensive chapter about something, and slowly but surely I'll construct Lecture Notes written by the students and edited by myself. That would be awesome.

Still wondering about that Linear Algebra though. People swear to me it's important, but I don't see how it is fundamental to pure mathematics.

@Potato That's a sort of Bridge between Analysis and Algebra

@Skullpatrol You seem to be putting too much correlation between math and good students. There are lots of good students who will struggle with math no matter how or when it is presented to them. There are many who are good at math who are generally bad students and generally immature.

Others would like to correct me if I am wrong.

@Potato linear algebra is a prelude to abstract algebra, as well functional analysis and modern analysis.

@Potato, this LA comes up in Representation Theory as @Asaf points out.

In abstract algebra you meet the same ideas, on a much looser environments (compared to finite dimensional vector spaces and fields, which are very strict structures)

Things like modules over rings, ideals and so on.

This then connects with algebraic geometry, algebraic topology, algebraic number theory, representation theory, abstract harmonic analysis and operator theory.

@Dylan Can you give me some hint on something?

@robjohn I agree with you that I may be over generalising, and there will always be exceptions, thank you for sharing your views on this hypercomplex topic, and have a Happy New Year!!!

@Potato It really does come up all the time.

@DylanMoreland But where? Outside of analysis, which I dislike.

You're ambling along and then suddenly flag varieties pop up to solve your number-theoretic question. You're chaining together a bunch of dual space identifications and it's a mess.

Symplectic forms, orthogonal groups, whatever.

@AsafKaragila Spill it.

Matt E and I meet every week to talk about Shimura varieties, which are about as number theoretic as you can get. And most of the time understanding what's happening turns into some exercise in linear algebra.

@DylanMoreland I'm supposed to show that if $R$ is a nontrivial commutative ring, and $R^m\cong R^n$ then $n=m$. The hint says something about using the existence of a maximal ideal.

I'm not sure, but tell me if this is correct:

$R/m=F$ is a field, then $R^m$ and $R^n$ modded by $m$ are vector spaces and we know it's true there.

I have a simple question about differential forms. The book says that if a form is locally exact, it is closed, because of course $d(d\omega)=0$. But wouldn't this just show it is "locally closed"? How do we get that it is closed over the whole domain from it being closed over overlapping subsets, because the exactness depends on different functions.

Well I guess you know it's closed at each point so it's closed over the domain...

My answer needs to be edited, but I don't want to bump it. Mostly for formatting and correct a typo.

@ZeeshanMahmud I think the party line is that if the edit is appropriate, just go on and edit it. The bumps are a way to gather eyeballs for edits that turn out to be inappropriate, so they can't be disabled by the one who edits.

@Henning Ok. Also I was having problem with formatting. Listing was driving me nuts as well as unable to format the equivalent sign. Also I was curious how to make the stars 'dots'. Autoformatting partially made some of the stars dots...

@ZeeshanMahmud It seems to work reasonably well for me to indent the ascii art with 4 spaces plus > plus 4 spaces again.

Oops, sorry: at least one space, followed by >, followed by five spaces, and then stars.

@AsafKaragila Ah, fun exercise. You have the right plan.

@DylanMoreland Excellent.

@ZeeshanMahmud Also, if you don't indent the lines starting 1. 2. and 3., then you get a proper HTML list if you make sure everything else in the list is indented with at least one space. Then you can use blank lines for paragraph breaks within the list items.

@DylanMoreland What is the exact argument for modding the module by the ideal?

@HenningMakholm Thanks most of the problems are fixed except for converting the ascii stars to dots... :)

@AsafKaragila Hey, sorry. Um, if you have an $A$-module $M$ and an ideal $\mathfrak{a}$ then you can form $\mathfrak{a}M = \{\sum a_im_i\}$.

@DylanMoreland Then just take the quotient module?

Exactly.

Or you could tensor with $A/\mathfrak{a}$. It's the same thing.

Hmmm.

But I guess the goal here would be to show that this is isomorphic to $(R/\mathfrak m)^n$

Yeah, but that would be just Chinese remainder theorem usage, no?

LOL at that typo... Chinese reminder. :-)

@ZeeshanMahmud They don't become bullets for me. Shall I edit?

@AsafKaragila Hm. I don't see how that follows.

@DylanMoreland Well, $R^n$ is an $R$-module when identifying $R$ with the diagonal of the ring $R\times\cdots\times R$.

@HenningMakholm I will go ahead and submit the corrections and you can perhaps edit in the bullets? And I will see from there how to do the formatting...

@DylanMoreland I think I'm right, no?

@ZeeshanMahmud Oh, I misunderstood you. I thought you wanted the stars to stay stars instead of being autoformatted into bullets.

One could use TeX instead of ascii art to get bullets all the way through, I suppose.

I agree with what you said about the diagonal embedding. What then?

@DylanMoreland Then $(R/\mathfrak m)^n\cong R/\mathfrak m\times\cdots\times R/\mathfrak m$.

@HenningMakholm For future reference what would the TeX code? the dollar sign?

Er, you mean that $R^n/\mathfrak{m}R^n \cong (R/\mathfrak{m})^n$.

Yeah, that one. :-)

Why?

I don't know, because I'm tired and I want it to be true... that used to be enough!!

@ZeeshanMahmud $$\begin{array}{cccc}\bullet&\bullet&\bullet&\bullet\\\bullet&\bullet&\bullet&\bul‌​let\\\bullet&\bullet&\bullet&\bullet\end{array}$$

How does one rigorously show a continuous angle function cannot on all of $\mathbb{R}^2-\{0\}$?

Spivak states this without proof.

@Potato I would search around. This has definitely come up on the site.

I can't find it on the search.

Hmm. I'll give it a shot.

@HenningMakholm Yes that seems to work; i am tempted to edit though for cleanliness.

@Potato Consider f(v)=(cos v, sin v) for 0<=v<=2pi. If h is a continuous angle function, then g(v) = h(f(v))-v maps (0,2pi) continuously into multiples of 2pi, which is a discrete set, and therefore g is constant. But that contradicts g(0) != g(2pi).

@Asaf I think you can just say: there's a surjective homomorphism $R^n \to (R/\mathfrak m)^n$, and the kernel is the submodule $\mathfrak m \times \cdots \times \mathfrak m$.

And then show that this last thing is $\mathfrak{m}R^n$. That's not so bad.

@HenningMakholm Thanks!

@Dylan: I think that I came up with an even direct-ier proof...

Let $\pi:R^n\to R^m$ be an isomorphism, then $\pi(\mathfrak m R^n)=\mathfrak m\pi(R^n)=\mathfrak m R^m$.

@HenningMakholm a final 'point'... in general if a code is too big for a line that messes up formatting how do i split it up in 2 lines? :)

So we have that $R^n/\mathfrak mR^n\cong R^m/\mathfrak mR^m$, as we want.

Looks good. Now you just have to argue that the dimension of $R^n/\mathfrak{m}R^n$ over $R/\mathfrak m$ is $n$.

@ZeeshanMahmud Between the dollar signs you can put line breaks everywhere; they shouldn't affect the formatting.

Maybe you could argue more directly. It's obviously $\leq n$.

Going to walk the dog. Back in a bit!

Thanks!

@HenningMakholm The code you gave me does not create a perfect array. Last bullet in line 2 is in red letters called :\bul with the word 'let'; incidentally this is the same place where the code breaks up in 1 line

Zeeshan, this is because the chat forces linebreaks into the code.

@AsafKaragila ok

@ZeeshanMahmud Oh, sorry. You can only break lines where you'd be able to place a space; that is (simplified), before a non-netter, except after a backslash.

(Yes, that's a rather strange sense of "everywhere")

@Henning To a post where you just commented, do you understand what OP means by $ x \to 45^\circ - x$.

@HenningMakholm I experimented adding a space at various places but nothing seems to fix the following:

True that's intuitive, but change of variables in product, you don't have a nice notation where you change your limits.

@KannappanSampath No, not exactly. But the overall plan seems to be clear enough.

@ZeeshanMahmud You have either a space or a line break between \bul and let that shouldn't be there.

@HenningMakholm I have written down an answer where I just draw his attention to this substandard notation.

Hope that helps OP.

@HenningMakholm Not a space, the line breaks actually because the whole code does not fit in 1 line...

@ZeeshanMahmud Then put some line breaks in at the end of the lines. The canonical place would be after the double-backslash that ends each line.

Here, let me show you:

$$\begin{array}{cccc} \bullet&\bullet&\bullet&\bullet\\ \bullet&\bullet&\bullet&\bul‌let\\ \bullet&\bullet&\bullet&\bullet \end{array}$$

There, with more spaces to cut-and-paste from instead.

Does anyone here have a copy of Spivak's Calculus on Manifolds on hand?

I did both ways copy-paste and manually but doesn't resolve it.

@Asaf So I think you could say, "I have a generating set of size $n$, so the dimension is $\leq n$. If $e_1, \ldots, e_n$ is the obvious thing (a $1$ in the $i$-th slot), then a relation $a_1e_1 + \cdots + a_ne_n = 0$ means $a_n \in \mathfrak{m}$, just looking at each coordinate.

So that's pretty clean.

Under bul of bullet i get the squiggly underline for spelling. Not a browser problem, is it?

@HenningMakholm Eureka! I just deleted your bul of bullet and manually rewrote it. it works :)

I am guessing the unicodes didn't match for some reason...

@ZeeshanMahmud Spell checking in the edit box is up to the browser.

@HenningMakholm Thanks for the help.

@Dylan Reviewing the previous questions (some of which I prefer not to do, since I have quite the choice in this course - literally :-)) as well hints from A&M (the source) I think that tensor products should be fine.

@ZeeshanMahmud My word! There's a U+200C ZERO WIDTH NON-JOINER between the bul and the let. Now where did that come from? I certainly didn't type it.

I just need to use the right-exactness of tensor products to show that $R\otimes R/\mathfrak m\cong R/\mathfrak m$.

If I want to find a singular 2-cube whose boundary is the circle with radius 1 minus the circle of radius 2 centered at the origin, does it suffice to map $I^2$ to the annulus bounded by those circles so that two of the sides overlap and cancel (so I would map the other two sides to $[1,2]$ and $[1,2]$ with the orientation reversed so they cancel)?

Then to use the fact that tensor product commutes with direct sums to have $\left(\bigoplus R\right)\otimes R/\mathfrak m \cong\bigoplus(R\otimes R/\mathfrak m)\cong (R/\mathfrak m)^n$.

@Potato To respond to a 3-hour old comment (sorry): Yes, this is not a non-uncommon misconception. But if you can get the basics of your field down ("basics" in an obviously understated sense), then you're ready to start research. In the process of that research, you'll undoubtedly have to start working through a slew of research-level papers, but it would be a mistake to try to pick those in advance.

@CamMcLeman Thanks! I wonder how basic those basics actually are though.

@Potato Not basic at all. :) But Bott+Tu and Hatcher definitely cover them.

Well, I am closer to doing research than I previously thought I was. Joy.

@KannappanSampath I think the problem is not so much one of notation, but the fact that the OP uses no connecting prose between his formulas. Just a dozen English words at strategic places would have made his procedure totally clear.

Right, I took something which is not hard and made it unreasonable convoluted. I think it's a good time to hit the hay and finish tomorrow.

@HenningMakholm I agree, so I have edited my answer, please drop by at this link: math.stackexchange.com/a/95059/21436

Even while going to sleep I still managed to prove that $1+1=2$... how about that.

@AsafKaragila And much shorter than Russell and Whitehead's proof too.

(Of course, they were working with equivalence classes of sets, not Peano numerals).

Well... I had Peano, what did they have?

I wrote three completely trivial answers today.

Judging by the name the user has an Israeli citizenship; judging by his profile on programmers.SE he's living in the USA. Interesting.

Hmmm... 30 minutes to cap-time, I wonder if I'll make it.

8 more votes to hit 200, 11 if I want to completely go to the limit.

@AsafKaragila Are you a senior undergrad or a graduate student in Math

Grad student.

I hope to finish my M.Sc. this year and start my Ph.D. next year.

@Asaf Hope that wasn't rude. Just wondering because you seem to do much of algebra

@KannappanSampath Yeah, I'm being forced to take two courses in algebra this semester. So I'm having some troubles with the homework assignment.

I hate algebra.

I am interested to chalk out a research career in fields connected with algebra.

I am definitely not the guy to talk to.

I can just say that most people are drawn to algebra when they start with mathematics. I thought it was cool at first too.

With time I realized that only set theory captures the essence of mathematics that I am truly capable of doing on my own.

I am only a first year undergrad and did some group theory; ring theory.

So, it's true what I have seen is rudimentary. But, I am motivated towards algebra ; planning to learn commutative algebra on my own next semester.

Don't jump too far ahead. Mathematics is a slow, slow... slowwwwwwwwwwwwwwww process.

True, but is my plan ambitious

Ambition is the pitfall of those whom are too proud.

Now you'll have to excuse me. I am going to sleep.

Bye @AsafKaragila Good night.