Too old and it's no longer considered "food"

unless there's something perfectly preserved in an Egyptian tomb or something

$\ell_1 = (\ell_1 + \ell_2 + \cdots) - S(\ell_1 + \ell_2 + \cdots)$

Yup

That's why it's a boundary yo

The first question was to show that $S(x)-x$ had nonzero kernel. This was to show that it's surjective

In general you could do $x+S(x)+S^2(x)+\dotsb$ I guess

It's also direct by running $H_1(\Bbb H) \to H_1(\Bbb H) \to H_1(T_f) \to H_0(\Bbb H) \to H_0(\Bbb H)$

The last map is zero, so $H_1(T_f)$ surjects onto $\Bbb Z$... I guess I don't know why it's actually an isomorphism

So scratch that

It's an isomorphism because $I-f:H_1(\Bbb H)\to H_1(\Bbb H)$ is surjective

in that notation

Yes, but I was trying to prove $I - f$ is surjective from that sequence

That would have to use something specific about $f$ and $\Bbb H$

I don't think it's true for arbitrary spaces and maps

Yeah it ain't

$\dfrac1{1-S}$ lol

Inverse map of $1-S$

Haha nice

$\sum S^n$

I feel like there should be a way to generalize the Hawaiian earring construction

What is the map $H_1(T_f) \to H_0(X)$ again? You take a 1-cycle in $T_f$, then take a cross-section to get a 0-cycle on $X$, yeah?

Probably

Say $G_n$ is a sequence of groups, and $G_n=\pi_1(X_n)$ where $X_n$ is a sequence of spaces

Form the "Hawaiian bouquet" of the $X_n$ by joining them at their basepoints and saying any neighborhood of the basepoint must engulf all but finitely many $X_n$

Call that $X$

Then is $\pi_1(X)$ determined by the $G_n$?

If so, I'd call it the "Hawaiian product" of the groups

Ask Brazas he'd know

'cause that's what happens when you put me in charge of naming things

I think this is what they call the free $\sigma$-finite product of $G_n$'s

I like my name better

Wait hold on

Google isn't showing me anything called a "sigma finite product"

Nah nevermind

I wonder if $\pi_2$ of the "spherical Hawaiian earring" (subset of R^3 that's smaller and smaller spheres put together at a basepoint) is the same as $\pi_1$ of the original

Too hard for me

Cannot be so

It's abelian

Oh right duh

Maybe it's the abelianization

It's the same as $H_2$. I think Baratt-Milnor computes it

They also prove $H_3$ is nontrivial for the spherical guy

It should just be $\Bbb Z^{\Bbb N}$

You should be able to do the same infinite shenanigans as in the original

Oh wait

Infinite product, not infinite direct sum

Yeah

Yeah I believe that

The infinite commutator (1+2-1+3-2+4-3+5-4+…) probably dies

Makes me wonder why $H_1(\Bbb H)$ is fundamentally different from $\Bbb Z^{\Bbb N}$

Incidentally

Actually the spherical Hawaiian guy is the reduced suspension of $\Bbb H$ is it not

Is the Hawaiian earring homeomorphic to an infinite snowman?

Where the sum of the diameters converges so you just put them on top of each other

and put the basepoint at the top

And $H_n(\Sigma X) \cong H_{n-1}(X)$, so I wonder where I am wrong

@Akiva The earring becomes disconnected with $\Bbb N$ components if you remove the vertex

Oh not homeomorphic but homotopy equivalent

is what I meant

who cares about Hawaiian earring, let’s visualize Mobius strip x [0,1]

That's easy

@Akiva Hm.

It's easy if you live in the right 3-manifold

There was a Mathologer video on two-sided Möbius bands

(such as for example the middle slice of your space)

You live in $\Bbb{RP}^2 \times S^1$ by any chance

'Cause in a nonorientable manifold you can do that

@BalarkaSen Nah I like my space comfy and Euclidean

$K^2\times S^1$?

The Klein bottle admits a flat metric, right?

Yeah

are the half-twist and three-halves-twist Mobius strips homeomorphic?

@BalarkaSen Maybe that equation makes assumptions on $X$

No @LeakyNun

@LeakyNun Yes

Akiva is wrong

What you see is what you get

so there are a lot of [0,1] bundles on S^1?

Of course not silly

and in fact there's a regular homotopy from one to the (mirror image of) the other

I am just confusing you

@BalarkaSen ??

Same number of boundary components and genus

Cut, twist, glue back together

I know, of course :P

Why would you just go on the Internet and tell lies

so they’re only not ambient isotopic

That's correct

Boundary components link nontrivially

Or well

Right the boundaries are the unknot and trefoil

That

you two are too fast

The three half twisted Mobius strip is the "wrong Seifert surface" of the trefoil

@AkivaWeinberger anarchy!!

Dunno why Seifert surfaces have to be orientable, maybe the theorems aren't nice otherwise

@AkivaWeinberger You're right! $H_n(SX) \cong H_{n-1}(X)$. But $SX$ and $\Sigma X$ need not be homotopy equivalent

You need good neighborhood of the equatorial $X$ to do Mayer-Vietoris, which $SX$ has but $\Sigma X$ doesn't

In case of $X = \Bbb H$

It's interesting that they're not homotopy equivalent and have different $H_2$s

Ya

@BalarkaSen have you watched the video?

which video

I have not

Ah the one I mentioned

Yeah the thumbnail says it really, that space in the middle is a two-sided Möbius band

they like created a Mobius strip with 1 edge and 2 faces

I have no idea what this even means mathematically

'cause orientability is an intrinsic property but 1-sidedness is an extrinsic one

what?

1-sided means throwing the hypersurface away leaves you with one connected component

Orientability depends on the space, 1-sidedness depends on the way it's embedding in a surrounding space

@BalarkaSen At least, locally

Right

On a tubular neighborhood if you demand

what 2-manifold-with-boundary is that?

The question is if its neighborhood looks like a product with [-1,1], or a twisted product with [-1,1]

@LeakyNun Is what?

(1 edge is normal, mind)

that strange Mobius strip

It's homeomorphic to any other Möbius strip

You're embedding a Mobius strip into something else

aha, it isnt orientability

rather it is the fact that a tubular neighbourhood looks like a trivial (0,1)-bundle

that’s what makes it have 2 faces

Why do you watch videos by these science nutcases

They're kinda dull lol

'Cause I told him to

what’s wrong with mathologer

Also I like Mathologer

at least it isn’t numberphile :p

He sucks that's what

Numberphile sucks balls lol

They're both good but kinda dry

That's why you watch them at 2x speed

they were entertaining when I was in high school that’s what

LOL

Why are you still subscribed that's what

I liked watching numberphile

Numberphile can be more or less entertaining depending on who they're interviewing

I mean you only find them boring because you already know the stuff

I like numbers

Nah I just don't like these pop science enthusiasts

I enjoyed pop science

The only channel in that realm I like is veritasium

He's actually fun

That's fine, I guess. I usually only watch them if the title catches my eye

But there are better channels

how about pbs infinite series

RIP

f

I felt that one was a bit weird

i like 3blue1brown

Same

same

3B1B is good

I give him moneys

(I'm subscribed to him on Patreon)

nice

that’s a bit too far for me

idk

I'll tell you the channels I am subscribed to

he opened my eyes to the essence of linear algebra and calculus

1) ContraPoints

2) hobestobe (RIP)

on YouTube, to be clear, right?

yeah

Ah here's a proper science channel

The Thought Emporium

It's beyond good

Ok then there's theneedledrop and a bunch of meme channels

I also like LEMMiNO

One of these days I'm gonna make math expositional videos

I promised something here like a year or two ago

Do math and stream it on twitch

Hah lol

One of these days I'm gonna prove to the world

that alternating projections of knots have minimal crossing number

Hey do you know about bridge numbers

I've heard the definition but don't know anything about them

Mmk

@BalarkaSen what is ContraPoint?

The theorem I mentioned is one of the only theorems that made me think "Why wasn't this proven decades earlier?!"

'cause it was open for a while but the proof isn't that hard

She's a leftist trans woman who does hot takes on many politically incorrect topics

I need to learn the proof that the minimal genus surface representing the homology class $n[\Bbb{CP}^1]\in H_2(\Bbb{CP}^2)$ in $\Bbb{CP}^2$ is in fact $(n-1)(n-2)/2$

The genus coming from Riemann-Roch

But apparently it requires Seiberg-Witten theory so that'd take a couple years

$H_2$, no?

Thanks yes

My homology became complex graded somehow

In my defense I didn't sleep for 20+ hours

I'm trying to visualize the connected sum of two $\Bbb{CP}^1$ in $\Bbb{CP}^2$, but my visual for $\Bbb{CP}^1$ in $\Bbb{CP}^2$ is a line in a plane

That's good

Think of the lines $xy = 0$ becoming

Also wow dude don't die

$xy = 1$

ill try not to my man

So if I take the time dimension of that movie into the third dimension (or whatever the words are) I get a saddle point

thwipping from one hyperbola to its conjugate

Yeah, it's the pencil of curves $xy = tz^2$

in homogeneous coordinates

So yeah it makes sense that that's combining the x-axis and the y-axis somehow

I like what happens to the topology at the intersection of two $\Bbb{CP}^1$'s at a point in $\Bbb{CP}^2$

A link of the singularity (intersect the surrounding with a sphere of radius epsilon) is a Hopf link

I just went from not understanding at all to completely understanding in a weird jolt

Felt strange

Haha that happened to me as well

Mike taught me this

But yeah it's like in the 3-sphere you have the xy-plane gives you a circle and the zw-plane gives you a circle

Right exactly

The 3B1B video on quaternions had this visual at one point

Oh I should check that out

I once tried and understood how quaternions actually act on $\Bbb R^4$

Multiplying by $i$ rotates the $1i$ circle and the $jk$ circle independently

Right

Birotations

Or whatever

If you sterographically project it so that the $1i$ circle is a line, you get this weird twisting motion in $\Bbb R^3$

Rotation by the same angles are different than rotations by different angles on the two planes IIRC

Ah these are the isoclinic rotations

There are infinitely many invariant 2-planes

The orbits of points under that sort of rotation gives you the Hopf fibriation

The Hopf fibrillation

@BalarkaSen you might want to look at the study I created on lichess

fillibuster

Right I should sleep

send it to me ill have a look eventually

@Akiva Same, but will I?

Found my copy of The Annotated Turing

sent

Feels like such a completely different branch of math

Left-multiplication and right-multiplication by quaternions generate all rotations of $\Bbb R^4$

"The topology of computation" would be an interesting subject

No idea what it would be though

So there's a map $SU(2) \times SU(2) \to SO(4)$

And this is degree 2

That's why $SO(4)$ is $(S^3\times S^3)/\{-1\}$

What's the set of rotations of that?

Right, $\Bbb Z_2$ acting by $(x, x) \mapsto (-x, -x)$

Set of rotations of $SO(4)$ is $(SO(4))^2$?

Does that make sense?

SO(4) is given the natural Riemannian metric or what

Yeah sure

And then we have isometries (that are connected to the identity)

Multiplication by $G$ gives a map $G \to \text{Isom}(G)$, no

Ah, left/right

Yeah in other words

So there is some $G \times G$ stuff

"precompose" and "postcompose"

At some point I convinced myself the set of rotations of the set of rotations of $S^2$ was $SO(3)^2$

I think for the same reason

Heh

A rotation of the set of rotations looks like $r\mapsto s_1\circ r\circ s_2$

and you can go over all pairs $(s_1,s_2)$

(where $r$ is a rotation of $S^2$)

But I wonder what Isom(SO(n)) is

How many dimensions does it have

If it has the same dimensions as $SO(n)^2$ then that should be it, right?

'Cause we have an injection

(It is an injection, right?)

Hm but actually I have no idea how many dimensions it has

Tangent space of Isom(M) at identity is the space of Killing fields right

of M? Yeah that makes sense

For Lie group G of dimension n, we get n independent Killing fields on G, given by the n left translates of e_i, no?

1 <= i <= n

At least

What about the right translates

I am seriously doubting dim Isom(G) can be bigger than dim G

I feel the right translates will be dependent

@AkivaWeinberger In particular I am not sure it is an injection

Suppose $s_1\circ-\circ s_2=I$

Then we can plug in $I$ and get $s_2={s_1}^{-1}$

so we're asking if all conjugations are nontrivial

OK, but then plug in $s_1$

Sure, but we'd need $srs^{-1}=r$ for all $r$

Oh yeah I was trying to get at some contradiction which doesn't work

Yeah the point is the center of $SO(n)$ is trivial

…It is, right?

Ah yeah

$s$ commutes with everything

Yes

At least when $n > 2$

Because $SO(2)$ has full center

Right

@Akiva Wait, $SO(3)$ is covered by $SU(2)$ which is isometric to $S^3$ so has isometry group $SO(4)$ which has dimension $10$, and isometries of $SO(3)$ lift to those of $SU(2)$ so $\dim \text{Isom}(SO(3)) \leq 10$ better hold, no

Dimension 10 what are you talking about

Dimension 6

Whoops yeah

But yeah it's $6=2\dim(SO(3))$ so we're good

Question is, what's the deal with like dimensions 5 and up

Ah OK great

This sort of suggests we can describe any isometry of $SO(n)$ by describing where two of its elements go

I guess yeah

Suppose $I$ remains fixed

and I guess suppose another one remains fixed, the question is do we have any degrees of freedom left

Maybe choose a 180 degree rotation about some 2-plane

You know what? I'll sleep on it

See you in the morning

Still wild that the complement of the spiral in 3-space has second homology

Only if you don't also subtract out the limit circle

yeah cool stuff

also I guess it's possible to explicitly count the solutions of $L_X g = 0$

Happy Birthday to Ramanujan

Please help me with this problem of Conic Sections

If $\alpha, \beta, , \gamma and \delta $ be the eccentric angles of the four points of intersection of the ellipse and any circle, prove that $$ \alpha + \beta + \gamma +\delta$$ is an even multiple of $\pi$

Please see my attempt

@Semiclassical @AjayMishra and everyone it's a request to please help me.

Hi, I'm trying to solve this problem that exploits the implicit function theorem. The second point, however, to me is a headache. i.sstatic.net/sRkre.png

Any suggestion?

Evening chat

Hey @ÍgjøgnumMeg

Hiya @Alessandro

Looks like my first cohomology theory is gonna be cuspidal cohomology o.O

$\mathfrak{s}$

@ÍgjøgnumMeg Splitting number?

wot

In set theory $\mathfrak s$ is the splitting number (one of the so called cardinal characteristics of the continuum)

I seeeee, in the theory of modular forms it's an equivalence class of cusps and the cohomology theory is called "Eichler cohomology" and is defined as $H^1_P(\Gamma, M) := \operatorname{ker}\left\lbrace H^1(\Gamma, M) \to \prod_{\mathfrak{s}}H^1(\Gamma_\mathfrak{s}, M)\right\rbrace$ where $\Gamma$ is a congruence subgroup of SL_2(Z) and $M$ is a representation of $\Gamma$ and $\Gamma_\mathfrak{s}$ are stabilisers of the cusps $\mathfrak{s}$ rofl

whatever that means

@AlessandroCodenotti Would you like to help me with my question?

I don't know anything about plane geometry

@AlessandroCodenotti No problem. Are you working on set theory these days?

Yes, mostly

I'm also thinking about some topology now and then

Wow.

It feels very nice when I hear someone is working on Set Theory, Topology or other pure mathematical topics than those technocrats and computer science things.

lol!

@ÍgjøgnumMeg Strange business

@AkivaWeinberger Your intuitive argument that $[\ell_1, \ell_2][\ell_2, \ell_3]\cdots$ is nontrivial in $H_1(\Bbb H)$ can actually be made precise as follows (I should have realized this immediately but I was extremely sleep deprived). If it was trivial, then it would belong to $[\pi_1(\Bbb H), \pi_1(\Bbb H)]$.

So it's a finite product of commutators in $\Bbb H$. Take the maximal $n$ such that $\ell_n$ appears in that word.

That means this word $[\ell_1, \ell_2][\ell_2, \ell_3]\cdots$ is homotopic to a word in a finite rank free subgroup in $\pi_1(\Bbb H)$ generated by the first $n$ circles.

@Balarka strange indeed

There should be a quick argument to show this is impossible.

@AkivaWeinberger Oh I lost track there, scratch the above. Here's what it is: Say it's a product of $n$ commutators in $\Bbb H$ (doesn't make sense to take the maximal $n$ such that $\ell_n$ appears, it can be commutators of infinite-length words).

Chop off every letter after $\ell_{n+3}$. Then $[\ell_1, \ell_2][\ell_2, \ell_3]\cdots$ gets sent to $[\ell_1, \ell_2][\ell_2, \ell_3]\cdots[\ell_n, \ell_{n+1}][\ell_{n+1}, \ell_{n+2}] \in F_{n+2}$, which is a product of $n+1$ commutators. But since this word in $\pi_1(\Bbb H)$ is equal to $n$ commutators after chopping off we also get it's equal to product of $n$ commutators in $F_{n+2}$.

Essentially because $\pi_1(\Bbb H)$ sits inside $\varprojlim F_k$, so the sequence of words in every free group are consistent under the "chop off the last letter map" $F_{k+1} \to F_k$

I guess it's not super clear to me that commutator-length should be an invariant

In $F_n = \langle x_1, y_1, \cdots, x_n, y_n \rangle$, $[x_1, y_1][x_2, y_2]\cdots[x_n, y_n]$ is not a product of less than $2n$ commutators because if that was so then if say $[x_1, y_1]\cdots[x_n, y_n] = [a_1, b_1]\cdots[a_m, b_m]$, then you'll get a non-nullhomotopic map $\Sigma_{2m} \to \Sigma_{2n}$

Actually there are lots of non-nullhomotopic maps from lower genus surface to higher genus ones, I want something stronger.

Ah my map would be degree 1. That should be impossible

I saw you pinged me in some $\pi_1(H)$ related madness @Balarka, but I didn't see the details, what was going on?

We were thinking about why the mapping torus of $f : H \to H$ given by shifting the circles by one has nontrivial 2nd homology

But wait jesus I have forgotten about surface groups lol. It's true that there are no degree 1 maps $\Sigma_g \to \Sigma_h$ for $g < h$, right?

So that mapping cylinder looks like a Nautilus shell?

Yeah

I meant mapping torus, sorry.

Wait what's the difference?

You autocorrected that in your head maybe

Mapping cylinder is a cylinder not a torus :P

The construction I have in mind is taking $H\times [0,1]$ and gluing $(x,0)$ to $(f(x),1)$

That's the torus, yes

Oh, wait, what's the cylinder then?

I thought that's the cylinder lol

Just what you think. If $f : X \to Y$, $M_f = X \times [0, 1] \sqcup Y/(x, 1) \sim f(x)$

Hmm I see

What's a simple example of a bijective $f\colon X\to X$ such that the mapping cylinder does not deformation retract to $X\times\{0\}$?

$M_f$ always deformation retracts to $Y$

Ah you have the other end in mind?

Yes

It deformation retracts to the other end iff $f$ is a homotopy equivalence

@BalarkaSen To $f(X)$ in general I guess?

@BalarkaSen Hm. This makes sense intuitively but I'm not fully convinced

No, no. It deformation retracts to $Y$ not $f(X)$. Take mapping cylinder of a constant map.

That's $CX\vee Y$, right?

Yes

@BalarkaSen cohomology computation

@BalarkaSen Oh sure, I was forgetting that there's also a copy of $Y$ attached, I see now

I got an hat apparently

Hi, we can use second degree taylor polynomials for finding a local minimum or local maximum of the approximated function, true?

Anyway back to the mapping torus of $H$. That's weird, the shell is open at one end

(there's a "cosmic brain" hat, I need to get it for the memes)

@MikeMiller Yeah got it. $\Sigma_g \to \Sigma_h$ for $g < h$ has to be non-surjective on $H_1$ so non-injective on $H^1$. You get some $\alpha \in H^1(\Sigma_h)$ which pulls back to $0$ in $\Sigma_g$

Take it's dual, which cups to $1$ in $\Sigma_h$ but pullback cups to $0$

@AlessandroCodenotti This is standard. Suppose $M_f$ deformation retracts to the $X$ end. Then run the homotopy long exact sequence on $(M_f, X)$ to get $\pi_* X \to \pi_* M_f \to \pi_* (M_f, X)$. Since $M_f$ def rets to $X$ the first map is an isomorphism, forcing $\pi_* (M_f, X) = 0$.

Some argument I forget here. Damn I am forgetting all of topology

@Shootforthemoon: You mean to test? If you have a critical point $a$, the second-degree T.P. at $a$ might tell you. But what happens with something like $f(x)=x^3$ or $x^4$ at $0$?

Hi, demonic @Alessandro, @MikeM, a @Balarka

@BalarkaSen "all of"?

Oh ok assume everything is cellular. $X, Y$ are CW complexes, $f : X \to Y$ is a cellular map. So $X$ is a subcomplex of $M_f$ obtained from attaching cells. $\pi_*(M_f, X) = 0$ implies you can collapse the cells of $M_f$ attached to $X$ by leaving it fixed along the boundaries

That gives a deformation retraction, cell-by-cell, of $M_f$ to $X$

And for non-cellular maps you have to jiggle a little to make stuff cellular. This bit I really don't remember

@AkivaWeinberger Anyway, I think it suffices to take the word $w = [\ell_1, \ell_2][\ell_3, \ell_4] \cdots$ in $H_1(\Bbb H)$. $S(w) = [\ell_3, \ell_4]\cdots$ which is homologous to $w$ of course. And $w \neq 0$ because if it is zero, then $w \in [\pi_1(\Bbb H), \pi_1(\Bbb H)]$ thereby a product of $n$ commutators, but then chop of all the letters $\ell_{n+3}, \ell_{n+4}, \cdots$ to get $[\ell_1, \ell_2] \cdots [\ell_{n+1}, \ell_{n+2}] = \text{product of n commutators}$ in a free group $F_{n+2}$

That's not possible because of the surface and degree argument above

Hi @TedShifrin

@TedShifrin Thanks! Well, in those cases for $f(x)=x^3$ we have a change in concavity, while for $x^4$ we have no changes and a positive concavity, right?

Does the symbol Pr usually refer to a probability measure? Yes, I guess so

@Shootforthemoon I mean, the function is convex, so we have a minimum there