@AsafKaragila Yes, namely that if $x = x^\prime$ then $(x,y) = (x^\prime, y^\prime)$ in $R$. That's what I meant when I wrote "...it's a function..." above.

Exactly.

This answer of mine may also be helpful in that aspect. Even in the NBG settings where classes are objects.

@Matt I know, I'm just clarifying that so you'll be sure that you know.

@AsafKaragila Nice, thanks! : )

What's nice?

That you're making sure that I'm sure what I'm talking about.

Oh, I take care of my students. Even if they are online and from a whole other country.

I still see you somewhat a student of mine, in some sense :-)

That's also nice : ) Thank you!

:-)

For crying out loud! The first assignment took me, as a whole, 2.5 pages. In this one a single question is taking me almost 2 pages!!!

And in hours?

I don't know...

I'm so happy for Starbucks. It seems they are the only ones who are open today. :)

Can somebody tell me what's wrong with my answer here?

@tb Why should anything be wrong?

Voters needed here.

@Srivatsan bike shed again, I assume.

@tb (1) It's an involved answer, (2) it appeared late, and (3) it's drowned out by the edited posts. =)

@Srivatsan It's just so terribly annoying if you compare it to this :)

@tb I don't want to up vote if I don't read the question. I don't know if there is anything wrong with it but I'd presume there is not. Except for the fact that there is no one left that's still interested in an answer given that it was asked in April.

@Matt I didn't ask for votes...

An accept isn't going to happen either given that the user hasn't been here since then : )

Not for pity votes, that is.

: )

tb: What's the difference between (1) and (*)? It looks the same to me, with $h$ as the Borel measurable injection.

@Srivatsan I use that $h$ is continuous in 1.

I see. Ok.

I voted for the synonym.

One more needed for synonymization. :)

@JM: Did you vote for deletion on the logical paradox question?

Let me check.

I have now. :D

Excellent. What about those two standing 4 closing votes?

I think I did jury duty on those.

Jury duty? Who are you? Pauly Shore?

@AsafKaragila No, I'm Rodney Dangerfield...

@JM Chester Chesterfield?

Close enough.

I hate the search feature on SE sites. It sucks badly.

You add search terms and the result number increases.

Who uses it anyway? I vastly prefer Google.

Google offers too much porn...

"How to get started using LaTex" for an example

"Group theory"

Yay, quick walk to the top of the hill. Now my back feels much better. : )

In norway there is a storm going on, no snow. But plenty of rain and wind =)

@N3buchadnezzar have you tried including site:stackexchange.com in your Google search terms?

@N3buchadnezzar That should reduce the amount of porn, since I don't think there is any porn on stackexchange.com.

Btw I have a function

$a=2$ topp$(0,-2)$, bunn$(2,-6)$

ops

x^3 - 3x^2 + a

For what values of a does this function cross the x-axis once ?

It is an odd function, so I know it crosses the x-axis at least once.

@N3buchadnezzar It is not an odd function.

I meant a function of odd degree,

@N3buchadnezzar What does $a=2 topp(0,−2), bunn(2,−6)$ mean?

But I managed to solve the problem.

@N3buchadnezzar OK. A function of odd degree is just that, a function of odd degree. Unfortunately the term "odd function" means something else.

It means that $f(-x) = - f(x)$.

YEah, I know

Lets saya function is so that

$$ -f(x) = f(x - b) $$

ops

I'm reading tb's answer. It's probably obvious but can someone remind me why a closed set in $\mathbb{R}$ is a countable union of compact sets?

$$ -f(x) = f(b - x) $$

What is that called ?

It does not have a common name afair.

That sucks, I tend to use odd about b, but that sounds strange

@Matt Do you know why an open set is a countable disjoint union of open intervals?

Then you call it "odd about $b$". I think "symmetric about $b$" seems to ring a bell.

@Matt Were you able to figure it out? =)

Gimme a sec, I'm thinking.

Sure. Sorry, didn't mean to rush you.

Actually, sorry, @Matt. tb's statement is simpler than I imagined.

@Srivatsan Never mind that, I can still try to answer your question up there : )

Given a closed set $C$, write it as $C = \bigcup_{n \geq 0} C \cap B(0, n)$.

Oh, it's that simple?

Jury duty!

@Matt Yes, that simple. (Unless, of course, I'm missing something.)

But if you want to think about what I said, you can. I have to leave now..

Thanks, Srivatsan! And see you later!

You have a leave?

(Thanks, A. =))

:-P

Did you vote to close?

Merry Christmas, @N3buchadnezzar and @robjohn.

Yes, I voted on the duplicate question.

Then @Matt did not yet vote!

Caught me red-handed!

Matt: Aw, I'm damn too sleepy. In chat.stackexchange.com/transcript/message/2819579#2819579, $B(0, n)$ should be $[-n, n]$ instead, since the sets must be compact.

@Srivatsan I know. I had thought of this before you wrote it and then discarded it as too simple and therefore probably wrong. ; )

But for that change, this is what tb had in meant, I think. Just a note: this idea of writing things as a countable union of bounded things comes up often.

E.g., look up $\sigma$-finite measure.

Thanks for your help!

NO! It's a trap!!!!

He will enslave you like that guy hypnotized Indie in The Temple of Doom!!!

KALI-MAH!!!! KALI-MAH!!!!

@AsafKaragila Haha, this makes me want to re-watch Temple of Doom tonight : )

It is a nice movie.

I don't remember much of it.

Mmmmm... must be the season of the witch! Must be the season of the witch, yeah... must be the season of the witch.

Hey, guys, do you think I should or should not have rejected this edit suggestion? I am feeling pangs of guilt. It obviously has been done with good intentions, and the OP is a newbie, so it's good to help the OP improve the question...

It's fine that you have rejected that.

Why The Downvote?

@Srivatsan I'm not sure why you rejected it. But you shouldn't feel guilty.

No need to enforce manners on people. Especially like that.

The next thing will be people editing into every post "sir" and "dear professors, I am dust at your feet..." and such.

Is my answer wrong?

Oh, I did not have manners in mind. But I was thinking that this suggestion ought to be rejected because iyengar changed the question. But in this case, changing/improving the question is not that bad after all. [Of course, I don't approve or worry about of the "Thank you" bit.]

Anyway, what's done is done. Thanks, Asaf and Matt.

[JM, tb: if you were reading the transcript till now, I'll be glad to know your opinion as well.]

call for votes

Anyway, edited despite I think it was correct like that.

Thank you to all for not answering here and getting more downvotes there! Thank God it's not that important to me.

@Srivatsan Don't feel guilty. It was done in good faith, but I don't think that's what the question asked for and the implicit call for references is always there (and not particularly helpful in this case, or should one refer to Underwood Dudley?)

@Gigili I don't down vote. As I don't know the answer to the question it's hard for me to judge your answer.

@tb We should undelete all his downvoted questions and request a global recalc to be triggered, that way he could not delete his questions right after he got the first answer or pointed out that it is a dup.

@Gigili I didn't vote and looked at it only now. Breaking up the problem into even and odd functions doesn't seem to work. Except for pointing out that the constant function $-1$ is also a solution, your answer doesn't contribute much to the solution of the problem. That's just my opinion.

@AsafKaragila well, I don't care much for his deleted questions, but I'm completely opposed to deleting this

Well, I am going home to eat something and rest my tired bones. See you later.

See you later, Asaf!

See you later Asaf

If you have a null set in $\mathbb{R}$, for given $\varepsilon$, how do you get a countable number of intervals such that the sum of their measures is less equals epsilon?

Hi, people, is this method: en.wikipedia.org/wiki/Durand%E2%80%93Kerner_method only can approximate the real roots, not complex roots?

I thought you were trying to learn the cross product?

@tb - Thanks for your link, now i completely understand

and just wondering if numerical method have disadvantages

@Matt *) covering the null set, I meant of course.

Oh. I can just intersect with (-n,n).

Ah, no, because it says intervals and the intersection is not an interval.

The other answer annoys me.

Btw, how do you link to an answer directly?

@Matt At the bottom of the post, there's a bit that says "link edit flag".

@DylanMoreland Thanks, Dylan.

I don't understand how some answers get upvotes.

@Srivatsan You did the right thing there.

I've long given up on predicting which answers will get which number of upvotes myself. People vote the darndest things.

Happy Holidays everyone!

@JacopoNotarstefano Right back at you. :)

One more synonym vote needed.

@Matt Or even accepted. :|

@Srivatsan Well, I haven't yet figured out how to get disjointness, but I have learnt some new vocabulary : ) So $\mathbb{R}$ is second countable which apparently implies that it's Lindelöf which means that every open cover has a finite subcover. So I can write every open set as a countable union of open sets.

@Matt Wait, how is that different from compactness?

@Srivatsan That is a typo. Where it says finite it should say countable. Sorry, my subconscious speaking. : )

Thanks @tb and @JM.

@Matt How did you make the conclusion "So I can write..."

And every open set is the union of just itself. The deal is to write it in terms of intervals.

@Srivatsan If it's open then for every point in it I can find an open ball around the point that is in the set. All these balls form an open cover of the set so I can make it into a countable open cover. A ball is an interval in $\mathbb{R}$.

Oh right. Sorry.

But let's say $O$ is an arbitrary open set. How does Lindel\"ofness of $\mathbf R$ help you in writing $O$ as union of intervals?

@Srivatsan It doesn't. I can write it as an arbitrary union of intervals because $\mathbb{R}$ is a metric space. Then Lindeloefness let's me make the cover into a countable one.

Oh right. You're absolutely right.

I am the one who is screwing up.

@Srivatsan phew

That's cool..

@Matt Do you want hint for disjointness?

I didn't figure it out myself. Someone (Zhen, if I remember right) pointed it to me in chat.

@Srivatsan Ok. Yes please : )

Ok. HINT Connected components.

An open set is a union of basis elements and a basis are open intervals?

Then either they are already disjoint or if some of them share points their union is an open interval.

@Matt Well, you might end up using uncountably many open sets.

Also, disjointness would be a problem.

@Matt That's the basic idea. Suppose we can pair up every pair of overlapping intervals and make a bigger interval...

If this process terminates at all, then we got our disjoint intervals. But sadly, it's not clear that it terminates.

@Srivatsan Actually, another basis for it is (q,p) for q,p rational so I can achieve it with countably many.

@Matt Yes, that's a good idea.

Perhaps one can fix this proof.

I'd need a finite subcover. Then it would terminate.

Ok, I have to leave for some time again. See you.

See you! And thanks!

@Matt Yes. The problem with the merging idea is this:

Sorry, ignore that comment.

Essentially, I was going to say that if we have infinitely many sets, then it's not clear that we can union pairs of them in some order (even conceptually, if not physically) to get a disjoint family of open sets. But as it is, this is quite obvious.

I still don't know how to fix my proof. Anyway, I think I'm going to be afk for a while, too. bbl

1. Every point in an open subset of the real line has a connected open neighbourhood. 2. Every connected open neighbourhood is contained in a connected component. 3. Connected components are disjoint. 4. The connected open subsets of the real line are the intervals...

@ZhenLin :) I asked you this long back and I certainly remember this proof. Matt and I was trying out to figure out if the alternate approach could be fixed at all.

Use transfinite induction?

@ZhenLin I do not know exactly how that works.

So we can start off writing $O$ (an open set) as a countable union of open intervals. Then we want to merge two intervals whenever they overlap, right?

It's really nothing fancy. Just a special case of structural induction, which I'm sure you understand quite well.

@ZhenLin Yes, I do understand structural induction. Would transfinite induction work here? If it does, can you show me how?

Yes. Actually, the trick is to realise that an arbitrarily long chain of pairwise intersecting open intervals has union an open interval (possibly infinite).

Transfinite induction is just structural induction on the ordinals. The ordinals themselves are very simple. There are three constructors: the constant $0$, the successor (unary), and supremum (accepts any set of ordinals as input)

When did you start talking about set theory here? :-P

Well, I actually don't follow it =)

What seems to be the problem officer?

Then I leave the task to Asaf, since it's well past midnight here...

Thanks, Zhen.

You went back home?

@AsafKaragila Just that Zhen was trying to teach me transfinite induction and I didn't follow it. You might safely assume that I know no set theory at all...

But right now, I have to be somewhere. :)

...I really should be sleeping now; see you guys later.

Srivatsan, do let me know when you return.

If you're going to teach me, can we do it a little later? I should be back in some time.

Sure.

Thanks, Asaf.

Sleep well, @JM.

@Matt Just use the definition of Lebesgue outer measure: $$\mu^\ast(N) = \inf{\left\{\sum_{n=1}^{\infty} |I_n|\,:\,N \subset \bigcup_{n=1}^\infty I_n\right\}}$$ and a null set is the same thing as a set with outer measure zero.

Hi guys

how are you doing?

@Daniil Hi. Fine, thanks. Foolishly trying to do work on this day. And you?

Hello!

I have been asked to prove that the altitudes of triangle intersect eachother at a single point, I just need a start if any of you could give me a little hint...

Merry Christmas btw

@DylanMoreland same, I have homework to turn in in 15 mins.

@IshaanSingh Why don't you ask that as a question on the main site? You'll help others with similar questions as well.

@Dylan Belated Christmas wishes

@Kannappan Oh Okay I will post it, I just needed a hint so I thought chat would be better...

@Dylan Merry Christmas

Dear community, I wanted to ask you all, if there's any way in which all of you can be notified. And, a message to me reads (removed). What does it mean?

@KannappanSampath No, you cannot address the whole community. // It's not about you in particular. The author of the message chose to delete it after posting it, that's all.

@Srivatsan Thank you for your help.

@KannappanSampath Sure, you're welcome.

I'm back, @Asaf.

So I see.

Are you ready to ruuuuuuummbleeeeeee?????????

@AsafKaragila Can't wait :)

So what should we talk about?

Transfinite induction; a detailed example will help.

So, do you know how an induction works?

Induction on $\mathbb N$, yes.

The point is the same.

If you defined it for all previous ordinals, then you can define it for this one.

In that case, I guess I don't understand the idea of "ordinals" coming here.

Is there a concrete example where I can see this method in action?

The idea behind induction is the same as recursion.

You want to be able and "unfold" the definition.

The only way it can be mathematically valid is if you can unfold in a finite number of steps. The recursion theorem tells us that it is the other way around as well - if you can always get to the bottom in finitely many steps then you can define recursively.

Ok.

The ordinals are well founded, therefore every decreasing chain is finite.

@AsafKaragila I see.

This is the idea, in a nutshell.

That makes sense, thanks.

But can you see why Zhen suggested transfinite induction for my problem. This is my problem: "If $A$ is a union of open intervals in $\mathbb R$, then $A$ is the union of disjoint intervals." (I know that the disjoint intervals is essentially the connected components of $A$, but let us forget this for now.)

Okay

The idea is this: I want to merge pairs of overlapping intervals and replace them by the union. Of course, this is not a finite process, else ordinary induction would've sufficed.

This is a process which is at most countable.

No need to jump over your head to ordinals and whatnot :-)

@AsafKaragila Ok, I am glad to hear that.

:)

Every union of open intervals can be reduced to a union of countably many. This is because the reals are second countable.

@AsafKaragila Exactly. I am interested in exactly that case.

In the reduction, or in the countable case?

Er, I meant to say: I know that I can assume $A$ is a union of countably many intervals. From there, I do not know how to go to disjoint intervals.

I am quoting Zhen's hint here: "Actually, the trick is to realise that an arbitrarily long chain of pairwise intersecting open intervals has union an open interval (possibly infinite)."

No no no... no need for that.

Ok, go on then.

Let $U_i$ be the list of open intervals, $i\in\mathbb N$.

No... wait. Let me think it through.

Okay. I think I got it.

We go by induction. Let $\mathcal V_0=\{U_0\}$.

Suppose $\mathcal V_n$ was defined, let $\mathcal T_{n+1}$ the collection of $\{V\in\mathcal V_n\mid V\cap U_{n+1}\neq\varnothing\}$, and define $\mathcal V_{n+1} = (\mathcal V_n\setminus T_{n+1})\cup(\bigcup\mathcal V_n\cup U_{n+1})$

[You add the $n+1$th line and merge it with the previous segments if necessary.]

Yes.

It is possible that you go through all the segments.

Yes. For instance, if the $(n+1)$-th is a big ass interval.

This is natural, yes. But we should do something to handle the fact that we are facing infinite union here, right?

No need to worry.

Why not? What's the difference between this and the following example: $\mathbb N$ is finite. Proof: By induction on $n$. For every $n$, $\{ 1, 2, \ldots, n \}$ is finite (by induction, for instance). Therefore, $\mathbb{N}$ is finite.

We don't prove that the union is finite :-)

I know the second example is nonsense, but I don't see the difference between it and the first example.

Suppose we did that for every $n\in\mathbb N$, then we simply have that $\bigcup U_n$ is an interval.

Wait... no.

The process stops because you essentially exhaust the $U_n$'s.

How so? Let's say $U_n = (0, n)$. What do you mean by "stops"?

We only define $\mathcal V_n$ using $U_k$ for $k<n$.

So there is no danger that the process will go into an "infinite loop". You just run through the $U_n$'s and then you finish after $\omega$ many steps.

Oh, I see. That's right. So $\mathcal V_n$ "stabilises" after the $n$th step. But our goal is to write the set $A$ into disjoint intervals, right? How is that related to $\mathcal V_n$?

I think this can be done using ordinary induction. I mean: For given intervals $U_i$, $i\in\mathbb N$ you define inductively systems of intervals $\mathcal V_i$ such that: A. The system $\mathcal V_i$ is non-overlapping; B. $\mathcal V_i\subseteq \mathcal V_{i+1}$; C. $\bigcup\mathcal V_k = \bigcup_{i=1}^k U_i$.

Could someone please downvote my answer here?

Hello @MartinSleziak , merry Christmas.

And then adding "$\omega$-th step" by taking $\bigcup_{i\in\mathbb N} \mathcal V_i$.

@Srivatsan No no.. the $\mathcal V_n$'s don't have to stabilize.

@Gigili Imaginary answers can get only imaginary downvotes.

@Srivatsan My answer is not imaginary.

@Gigili Danke, gleichfalls.

@Gigili I don't see any answer in that page. =)

@MartinSleziak Somehow, this $\omega$-th step -- I can't follow this.

@Srivatsan The $\mathcal V_n$'s are collection of disjoint intervals, and the union of the intervals within $\mathcal V_n$ is the same as the union of $U_0\cup\ldots\cup U_n$.

That's right.

@Srivatsan Uh oh, I meant this one, sorry.

Why should we downvote it?

Because it's not helpful?

And you cannot delete it?

@Gigili Come on, don't be silly. If you're that unhappy, just pull the answer down.

I think he just wants the Peer Pressure badge. :-P

@AsafKaragila Uhum. : P

@Srivatsan So after we've exhausted all the $U_n$'s we have a family $\mathcal V$ which is made of disjoint intervals.

I wanted just to say that it does not look so much of transfinite induction is needed - only one transfinite step.

@MartinSleziak Union is the same as $\bigcup_i U_i$ -- yes.

Why is this family well defined? This is exactly the recursion theorem.

Thank you for the explanation @Matt and @t.b.

@AsafKaragila I see. This one statement -- this sums up what I am uncomfortable about. What really does it mean to say "after we've exhausted all Un's"?

@Srivatsan It is a set, and we can "walk" on a well order long enough that we have gone through all the members of the set.

Even if the walk is infinite, we still end up "after" the set is over.

I see. I have to think about this.

[I'll be going back from whereever I am to my office, so I'll be off for a little while again.]

Ciao.

Wherever you are... sounds intriguing and filled with women, drugs and alcohol. Are in your secret layer, doing cocaine and PCP while having sex with three illegal immigrants? Are you drinking all my scotch while you're at it?? If you do, please stop!

@AsafKaragila I'm unhappy about bursting this image but I'm with a friend in a coffee shop =)

Starbucks. They are closing early because it's Christmas.

Oh well :-)

Ha, I'm back.

I'm trying again =). First, I'll start with Martin's proof using standard induction just because it would be easier.

@Martin, If I understood what your wrote correctly: your $\mathcal V_n$'s are the same as Asaf's. Is this right?

@Srivatsan well standard induction + the one more step (But you do not have to look at it as transfinite induction - you can see it as using standard induction to produce some auxiliary system and then using this system to construct what you want.)

@MartinSleziak Ok.

@Srivatsan I am not sure about that. At least I did not describe how I construct intervals in n-th step in detail. (So at least this is a difference, perhaps there are more differences.)

Let's see if we at least have the same thing in mind. If $U_n = (0, n)$, then $V_n$ is $(0, n)$ as well.

This is a system where each new interval subsumes the previous ones.

No.

I define $\mathcal V_n$ in n-th step - it will not be an interval but a system of intervals.

I meant to write $\mathcal V_n = \{ (0, n) \}$. Sorry.

Another example: if $U_n = (2n, 2n+1)$, then $\mathcal V_n = \{ U_1, U_2, \ldots, U_n \}$. Here the original system itself is pairwise nonoverlapping.

I wanted to define $\mathcal V_n$ in a such way that it is increasing.

I.e. $\mathcal V_n\subseteq\mathcal V_{n+1}$.

Perhaps this is a gap in my proof.

@MartinSleziak I see. How can we do that?

I persuaded myself that this can be always done.

@MartinSleziak Actually, there is no choice in $\mathcal V_n$.

I believe there is.

My belief is that it is just the set of connected components of $\bigcup \limits_{i=1}^n U_i$.

@Srivatsan You too!

@KannappanSampath And you as well.

@Srivatsan Yes, you're right.

So the simple approach does not work, it seems at least :-(

@DylanMoreland Oh, I was so confused by that. I parsed the "You too!" in the sense of "You too, Brutus?" =)

@MartinSleziak Yay for transfinite induction =)

I hoped to get a simple proof by creating increasing system (parwise disjoint would be for free).... :-(

Oh I see. I don't want $\mathcal V_n$ to consist of any old intervals. I want them to be open (sorry if I missed it before; all this comes from some general topology discussion with Matt).

That was my mistake. (I knew you were speaking about open intervals and I overlooked it in my attempted proof.)

:2820655 Um, I was thinking about the same thing as well. I couldn't get hold of any, that's why this struggle with transfinite.

But sets from Asaf's construction are increasing in a different sense: If $U\in\mathcal V_n$ then there exists $U'\in\mathcal V_{n+1}$ such that $U\subseteq U'$.

And such $U'$ seems to be unique.

Quite.

@MartinSleziak Precisely.

The connection (no pun intended) to the connected components is hard to miss.

@Asaf you do not define $\mathcal V_\omega$ in your construction? I mean if it is supposed to be transfinite induction, there should be some step for limit ordinal...

@MartinSleziak That's what I was getting at a while back (using much sloppier terminology).

I need not define it. I merely have to show it exists.

That's correct. But why does it exist then?

And $\mathcal V_n$ in this construction has the property $\bigcup\mathcal V_n=\bigcup_{i=1}^n U_i$.

Hmmm... I'm guessing you are not going to believe the axiom "Asaf swears that it's true."

Not until I am forced to.

Well, you have no choice ;-)

The set which we started with is $A=\bigcup_{i=1}^\infty U_i$. For any $x\in A$ there is $n_0$ such that for $n>n_0$ we have $x\in\bigcup \mathcal V_i$, i.e. there is unique $U_x^i\in\mathcal V_i$ such that $x\in U_x^i$. We could define $A_x:=\bigcup_{i=1}^\infty U_x^i$. Then the system $A_x$ is the system of open pairwise disjoint intervals.

Perhaps this could work, unless I've overlooked something again.

The set $\mathcal V_\omega$ in my definition is the direct limit of the $\mathcal V_n$.

@MartinSleziak Does this work in the "nested intervals" example: $U_n = (0, n)$?

Sorry, I don't know what direct limits are. Let me check wikipedia first.

@Srivatsan I believe it does.

@AsafKaragila Perhaps what I wrote above is just a clumsy way to describe this direct limit.

@MartinSleziak Possible.

@MartinSleziak Did you use $i$ in place of $n$ here?