#advanced-algebra

but this is essentially the main part of proving that a fd Lie alg over a char 0 field with an invertible derivation is nilpotent

Its for sure a useful lemma to know, at least in all of the problems ive done

right, thats cool

you can also use it to prove that the Jordan decomposition of a derivation must be into derivations

gradings where most components are 0 are the best kind of gradings lol

easier to understnad

true

At that point just grade by a finite group

Sweep everything into grade 0.

hmm yes let's add structure by not adding structure

gradings sound very intuitive

touched up on like superalgebras and mentioned that they are Z2 graded algebras

where the superalgebra is composed of a direct summation of two subspaces

isnt a superalgebra also a vector space

wait but i thought an algebra over a field K or a K-algebra considered a superalgebra or is that not how it works

thought its just an algebra but with more structure

well it is

everything "over a field" has an underlying vector space

a grading can be seen as a generalization of polynomial rings

in a polynomial ring, everything can be written uniquely as a sum of elements with a certain degree (either simply degree or a multidegree in the case of multiple variables)

these will be monomials

graded rings/algebras generalize this

Interesting

Direct sum decomposition of subspaces is what algebra grading is right

I thought it was a direct sum decomposition of sub algebras

It's part of it. It only becomes a "grading" when the multiplication operation respects the grades.

Does that mean grading is structure preserving

well that cant be it

the unit element can only be a part of a single component

It means that An Am ⊆ An+m for all n, m

and 1 ∈ A0

in particular, A0 is a subalgebra

So 1 component can be a subalgebra and the other is a subspace ?

sure

yeah

well the 0 component has to be a subalgebra

and the others cannot be

Is that how even graded algebras work

well you can do this over any commutative monoid Γ

So the odd graded algebra can’t be a subalgebra ?

you mean graded over Z/2Z?

Yes

then yes, because it is not the 0 component

This is for multiplying elements of degree l and k resulting in an element of degree l+k right

yes

Could algebraic extensions also generalize superalgebras

What algebraic structure would you make if it were to be a direct summation of two even graded algebras over Z2

These are of homogeneous elements of parity 0 right

Would that mean the superalgebra is unital by definition (I don’t think superalgebras are associative by definition)

Maybe this is because I worked through a treatment of the derived category in decent detail from Weibel (and also a bit from Fourier-Mukai Transforms in Algebraic Geometry), but when reviewing this stuff from Residues and Duality, I’m surprised at how such a complicated object (relatively speaking) is kinda… obvious?

Like it’s still kind of homological algebra like where if you know what to do the steps in doing that are relatively obvious and just kinda doing the only thing you can

It can just maybe be a pain to verify that this construction has all the properties you need and whatnot. And then there’s some silliness when trying to extend stuff out of a derived category with some sort of finiteness condition to one with less finiteness conditions, but I think these become really standard stuff

-# re-self-promote my message; as stated before, any help is welcome

I am stuck at iv), i don't see how the hint helps me here? Okay 1 \otimes x = 0 in A\xi \otimes M

Note that
A -> A\xi
a |-> a\xi
is an isomorphism of A-modules

And you know that
a (x) x = 0 iff ax = 0
because
A(x)M -> M
is an isomorphism

I got it, thank you

Oooh very neat that the torsion functor is left exact

I mean it’s kinda clear

It’s literally a subset of the module it comes from so it’s gotta preserve injections

I guess exactness at the middle is kinda interesting

Yeah, I can see it in hindsight. It just wasn't something that occurred to me

@hallow bone is there a name for when a quasigroup's divisions are identical to its multiplication, and also, the quasigroup is idempotent?

it's like if steiner quasigroups were non-commutative

involutive

whoa

x(xy) = y = (yx)x

so an involutive idempotent quasigroup

i found something interesting geometrically that is naturally described by them

not UAG tho sadly

oh?

just like, geometry-geometry

alright lol

UA has plenty of geometrically-like stuff anyways

i was thinking about interesting ways to generalize how a line graph is the unique connected 2-regular tree

like the one whose vertices are integers and whose edges are given by consecutive integers

so instead i decided to consider what happens if you freely try to tessellate solid triangles together

by "freely" i mean escaping the constraints of euclidean space, just like as an abstract structure

and what i came up with was, let the vertices be elements of the free involutive idempotent quasigroup on two generators, and let triangles be of the form {s, t, st} for all terms s, t

actually i wonder if i could get sagemath to make some drawings for me

i did some on my own via a whiteboard

sounds hyperbolic almost

yea that's part of what im thinking

admittedly, a while ago, i did something similar, by generating the unique connected 3-regular tree via the cayley graph of the group presentation <a, b, c | a^2, b^2, c^2>

these structures, as topological spaces, should be homotopic, although i dont have a precise proof, just vibes

but it's interesting to me how the quasigroup creates the "filled-in" version, which might possibly be a manifold with boundary, while the other one isn't. although im not sure if it's a manifold because of what happens at sharp corners

well it shouldnt have a boundary because every triangle is surrounded by triangles

that's true. so the only problematic behavior can occur at vertices

cuz we end up having infinitely many triangles all attached by the same vertex

right

at every vertex

yea kinda mind-boggling

ok this is too big to be useful for understanding it

https://sagecell.sagemath.org/?z=eJyVUUFugzAQvCPxh73ZVimCqKdI9NIn9OhayCJLask1lqFA-_raBtKU5pI9jWdnR-vZEd3QQwWczCQD8kVEmrSywcgF3DmoQRlw0pyRHtgxTcCXwaket1mxcEE7Bm1srMKtMd1qhFKtH6oqmHZ8qKYzgzKf-G9Co6ETg2coQZrTasALca_HeOXBS3HfHlsGPgI6ZjCx2-0-l9aiOdGN2Oli3JuGB6PsMitW7RL1Q_Vrmiav6sNq1SipXzqPcKac94Pzf8odWu1dKcnCUckV8Ub2DCwEL4-PPoC_uaDu0Yd7OWwrIm4jDmsLlp-dtO-U5VZ3Aw2r4Vz36hurQ1EUGbTqHF9PBfsB63OlkQ==&lang=sage&interacts=eJyLjgUAARUAuQ==

yea ok this is terrible for visualization

ill just make my hand-drawings

actually wait maybe the computer is trying to tell me i was wrong

i need more axioms

yeah you cant form tetrahedrons

because then it wont be a tree anymore

yea i checked via sagemath, the homology is nontrivial, which is very much not intended

well glad to know i was wrong

this is what happens when i just declare things true on vibes cuz i checked a few cases 🥀

lmao

aha i see what happened

i entirely forgot that (xy)(yx) is a term

in my head, i was only generating more terms off of edge-connected ones

ok tl; dr everyone can ignore everything i wrote in this channel today cuz it was based off of a fundamental error in understanding

F

ok i fixed my idea

this is what i originally intended

https://sagecell.sagemath.org/?z=eJxNTsEKwjAMvQ_2D7k1xTGq6EXw5Cd4LGOULauF2ZZ26BQ_3nY4MYfw8vLyXmIHJ7iYmx9NZ9R4dgnRjFKymVXAnqxpeFlYerSD6igmsWzKYnABWjAWgrKacM-PZQGpMk-9pryKXa2D8lfkdaYirqJcP8NaeU-2R5k1UjTVci-3CbA3gw18-RVtl3_WrGyRs352fxEpX_X9QmNu6cwHYydMi6u7udHpJ_LE_j3qRzfhncJEcxvNi04HIUQFg9HLtBP8A3xQXDo=&lang=sage&interacts=eJyLjgUAARUAuQ==

im using polish notation to reduce vertex name sizes

anyway this time the rules are very simple

each edge freely generates a face with that edge on it

this is more analogous to my previous idea cut in half, cuz there is an explicit edge boundary this time, specifically along x-y

ok yea now that ive not fucked up, it's actually planar

hi mico

sorry for clogging chat with me talking to myself a little, yall are free to like, use this channel as intended if yall want

this seems to be the largest it'll go before sage gives up trying to get hyperbolic space to fit into euclidean space nicely

It scares me mishu :3

it constantly seems like it wants to close up on itself lol

mishu no know what maths mishu want do so mishu bored

i do have UAG notes im working on :3333333333333

UA no is option

fucK

Scooped

bbut theyre cool I promise

keith can vouch for me

You is have opinions on fun group theory for mishu?

well im sure you know lots more group theory than i do lol, but quantum groups are always fun

What is good book to learn quantum groups?

Kassel!

why does it scare you

is it beeg

It beeg and not dwagon shaped

ikr

mishu steal :3

that's true although i think mico actually once tried ua before

you should teach me ggt

:3

idk maybe theyd like uag lol

tbh i have no idea what kind of math it's mostly into

mishu probably no would
It not very mishushaped

mishu mostly do all the groups like micotses

that makes sense when i think about it

https://tenor.com/view/aileen-solo-farming-in-the-tower-the-top-dungeon-farmer-manhwa-chill-gif-7214407249400814117

sadge

this is mishu

eepy

its kinda interesting to see how did systems interact with like math

ok so there's a natural action on the faces by the free monoid on 2 generators

Wawawawawawawawa
mishu mostly just get in way of doing maths because cudl is more fun :3

lowkey can get behind that

for me tho i dont have like full dissociation between alters or wtv i do notice that math just seems to be like

mostly an ever present knowledge? not like my other skills like drums or breaking or whatever

right

an easy way to get a 3 regular tree is the term algebra on one variable and three unary operations

oh wait

you're kinda right

😭

well the 4 regular tree depending how you count

oh fuck

anyway i wonder if there's a similar thing that the free group would act on

no you're right im stupid

wait what if theyre all involutative though

then it should work

so like the variety of Gsets with G the product C2 * C2 * C2

yea that does work

peak

im sorta trying to get a surface version of that

yeye i see

i think you can take a really large colimit

How does Jacobson's "Lie Algebras" compare to other, more modern texts?

i havent really studied a ton of it but i did buy it because its one of those cheap dover publishing books, i think it gives an good treatment of lie algebras that you could find in most modern texts but i think you could probably get better takeaways from texts that will talk about lie groups and lie algebras

its very focused on lie algebras hence the name so it doesnt really cover much about the connections between lie groups and lie algebras and how to relate representations of lie algebras to representations of lie groups

lie algebras can be taught independently just fine, but a lot of what you learn can feel unmotivated without seeing how it gets applied to the representation theory of lie groups

that was my experience at least, because my first exposure was introduction to lie algebras by erdmann and wildon

i think brian hall's textbook gives a better picture

I am stuck at vii)

I proved one direction, Supp(M/aM) \subset V( a + Ann(M) )

maybe you can use vi) cause i think there is an isomorphism M/aM = A/a (x) M

should be

But then I need A/a has to be finitely generated as A module

it is

Yeah

take the SES
0->a->A->A/a->0
tensor with M
a ⊗ M -> M -> A/a ⊗ M -> 0
is exact. Clearly the image of a ⊗ M in M is aM, so M/aM ≈ A/a ⊗ M

so whats the problem lol

Let me try

I got it, thank you @limpid horizon @hallow bone

peak

I'm fine with a purely algebraic text, I have some familiarity with Lie groups.

if you are already familiar with lie groups i think youd definitely get a lot more out of brian halls book but jacobson is fine if you just wanna learn about lie algebras

the treatment is pretty much the same as most other texts on lie algebras

Is there a standard category whose automorphism objects are the finite Weyl groups of all other types, similar to the category of finite sets for type A?

I mention https://pages.uoregon.edu/njp/fsb.pdf as relevant.

I am stuck at the last part, any hint?

I think it may be helpful to recall that

$(M \otimes_A B){\mathfrak {q}} \simeq (M \otimes_A B) \otimes_B B{\mathfrak {q}} \simeq M \otimes_A (B \otimes_B B_{\mathfrak{q}}) \simeq M \otimes_A B_{\mathfrak{q}}$

HChan

for the middle isomorphism refer to exercise 2.15, p.27

Any hint for part c?

The exceptional types should just be the delooping of the corresponding Coxeter groups, embedded into FinSet via their canonical group action as real reflection groups. In the notation of the paper you linked one can most likely define FS_D by a similar process of embedding a unique involution on-top of FinSet as D_n is isomorphic to C_2^{n-1} \rtimes S_n, similar to how B_n is Z_2 wreath S_n but I admit I haven’t worked out the details - the involution in the paper seems to corresponds to the diagonal C_2 in B_n but the semidirect product that forms D_n isn’t as simple so the precise action of this involution on the finite sets isn’t as clear to me

Hey guys, i understand that the "If condition (i) (and therefore (ii)) holds..." statement should be true but how do i prove it?
This guy here says it's an easy consequence of (i) so i think im missing something obvious
The (satisying (7)) => (forming a basis) implication is clear but i cant see how to do the other implication

For info, "B as above" means N-graded k-algebra where k is a field and "h.s.o.p." is homogeneous system of parameters, as in homogeneous, algebraically idependant elements a1,a2,...,an€B such that B is a finitely generated k[a1,a2,...,an]-module

this is how far i got

simple examples work if you just try stuff out

Does anyone here have a reference for learning more about Koszul-Tate resolutions? I'm specifically interested in ones for group algebras, but I can't find a good resource for this

To check that I am understanding correctly:

The sheaf $\underline{{p}}$, which I will denote $p$ from now on, is the sheaf such that for any open $U \subset X$, $p(U) = {p}$.

swifteeee

That is, to any open set, I am associating the set {p}

Hom(p, F) is the sheaf on X given by associating to any open set U, the set of morphisms from the restrictions of sheaves. Hom(p, F)(U) = Mor(p|U, F|U)

And a morphism $\varphi : p|_U F|_U$ is given by the following data: to any open $V \subset U$, I get a morphism of sets $\varphi(V) : p|_U(V) \to F|_U(V)$, that commutes with restriction

swifteeee

So this is just a map {p} -> F(V)

Ts is like an onion twin ✌️ tf is going on 🥀

long story short: I don't know where to go. I am completely overwhelmed by the amount of data in this one sentence. Help.

This is not the correct definition of a constant sheaf

The constant sheaf are all continuous maps from U to {p}
I think in this case it's the same because they're always the same map

But you've gotta be careful in general

its the sheafification of the constant presheaf

Yes

in this case its the same

the set {p}(U) is cts maps from U to {p}?

aren't singletons final in Top

so there is one map, sending each element of U to p

In this case what you wrote is correct but for other bigger sets you have to look at the continuous maps

okay

So I just said that so you don't get the wrong intuition from a special case

I see, thank you

I think where I'm struggling is to describe a map from Hom({p}, F)(U) -> F(U)

Well what does Hom({p},F)(U) look like

A section of Hom({p}, F)(U) is a sheaf morphism from {p}|U to F|U, where | denotes restriction.

I.e. to any open V \subset U, I get maps {p}(V) -> F(V)

that play nice with restriction

And what is {p}|U?

Well notice that maps {p}(V) -> F(V) are in bijection with the elements of F(V)

Oh I see my problem

I thought this wouldn't work, because it wouldn't 'play nicely' with restriction. Take f : {p}(V) -> F(V), say f(p) = v. Then if we take a subset W of V such that v is not in W, then it wouldn't restrict appropriately, but of course my arrow is the wrong way

I'm not explaining myself too well, but I see now

Okay let me try to write this up

If you want a concrete answer the way you do it is you look at the global sections of your morphism and map it to it's image

And the inverse is given by taking a section s in F(U) and defining the morphism by phi(V): {p} -> F(V) where p is mapped to the image of s in F(V) by the restriction map and then this glues by the fact that we're working with sheaves

Writing these things out still feels really awkward to me, so I would appreciate any comments on clarity/brevity/notation

This is the following data: for any open subset V of U, p|_U(V) = p(V) = {p}

this whole paradigm of doing ag better become useful soon

I think you should clarify what f is and that you're taking global sections of something in Mor(p_V, F_V)

Could you please elaborate on 'clarify that you're taking global sections of something in Mor(p_V, F_V)?

Well I mean a morphism between sheaves is a collection of maps for each open

So the idea is to look at the map for the biggest open (this is U since that's what we're restricting to)

And looking at the image of that map

I'm fairly sure I know what you mean, but I'm kind of struggling to put it into words.

Perhaps I need some air

Thank you for your help Irony

Let R be a ring and suppose it is freely and finitely generated over a subring S.

Apparently this implies that R is integral over S, so for any r in R, it is the root of a monic polynomial with coeffs in S.

Under what additional conditions is it the case that the constant term of this monic polynomial is non-zero?

This is false unless you are using "freely and finitely generated over a subring" in a nonstandard way

Since this should just mean it is a polynomial ring over S

I assume you mean it is a finite free as an S-module for S a subring

Yes, sorry

I do mean R = S^n for some finite n

I should add that R is commutative here.

Ultimately, I'm trying to prove (or disprove) that if M is a finitely generated R-module, its torsion submodule as an R-module is the same as its torsion submodule as an S-module

Its clear that if m in M is an S-torsion element, it is an R-torsion element.

If m is an R-torsion element, then I was trying to use that R is integral over S to show that some r that annihilates m is the root of a monic polynomial with coeffs in S. But unfortunately, I'm not sure if I can say the constant term of this polynomial is non-zero

If I can, then I can conclude m is an S-torsion element (the constant term is the element in S I need)

R being an integral domain is a simple condition at least

Why is that?

Divide the poly by x

If x * f(x) = 0, then either x or f(x) is 0

Idk if there is much nicer stuff you can say

Idk if you want a hint for the question you are ultimately doing though

Is what I'm trying to prove even true in general?

No

One issue is like this module structure isn't massively helpful

Like let's take S to be a field k

Then the hypothesis holds for any finite dim commutative k algebra R

I in fact have that in my specific situation

Well now there are.simple counterexamples I mean

In my application, R is a polynomial ring with coeffs in k

ahh

Since you're talking about torsion elements at all, presumably R is an integral domain. So then there's no issue

Like k x k

I'm confused

Then it isn't fd over k

Even in general you would probably define torsion element as annihilated by a regular element, and then again there's no issue

Yeah you're right, I specifically have a quotient of a polynomial ring

To be fair that is implied already by being integral over k

So to summarize, you're saying that if R is a finite dim k-algebra and M is a fg module over R, then torsion_R(M) = torsion_S(M) (where M is interpreted as an S-module on the RHS)?

I'm saying that that is false

Take R = k x k and M = R

Well depends what Torsion_R means

Sure

like m in M is in Torsion_R if there exists an r in R such that rm = 0

I mean, if that's your definition that's fine. But it's a stupid definition that isn't even a submodule

Ah sure, I guess I need regular element in general like you were saying

My situation is basically this.

R = k[x,y], S = k[x^b, y^b], so R = S^(b^2) as an S-module (I will need to consider quotients of these rings later).

I have a map M: R^2 --> R given by the 1x2 matrix [f g], where f and are g are in R.

I have an induced map M': S^(2b^2) --> S^(b^2). I need to consider Torsion(coker M) vs Torsion(coker M')

It wasn't clear to me how these are related, but I'm skeptical there is a relationship based on what you two said

Thanks for the help!

So I guess these maps are a bit of a distraction.

What you're saying is your have an R module and you take restriction of scalars to S.

As R is a domain an integral over S, the two torsion modules should be the same

Ah ok, and is the proof obvious?

I mean you already wrote it earlier

If rm = 0 take the minimal polynomial of r, then the constant coefficient also annihilates m

Ah ok. And if I then quotient S and R by a common ideal, the proof breaks since R is no longer necessarily an integral domain

At the very least it would depend what torsion should mean for this new ring

Thank you two once again for your help!

I think torsion is best considered associated with a mulitplicative subset of a ring (at least if it's commutative).

Or more generally a filter of ideals, but in any case not just a function of the ring and module.

Could define it with respect to an element in a flat module, as the kernel of the map M = M(x)R -> M(x)F.

Then you get it with respect to a multiplicative closed set by picking 1 in S^-1 R

I wonder if this gives you more than multiplicative sets in the commutative setting...

Another nice way is do define it as the torsion part of a torsion pair. So for example fix a module Q and call a module torsion if it has no map to Q.

If Q is the field of fractions of an integral domain you get the usual notion. Not sure if there is a nice cannonical choice associated with a multiplicative closed set for this

Okay, I think you can pick Q to be an injective cogeneratot for S^-1R modules

This definition seems rather circular and I don't know how to interpret it

What part are you struggling with?

all of it

If you're thinking of the differential then a more verbose description would be

$(df)n \coloneqq d_B \circ f_n - (-1)^n f{n+1} \circ d_A$

jagr2808

what are the f_n's?

also what are the quantifiers?

Okay, forget that equation and let me step back.

Let C be the Homcomplex we're constructing.

Then Cn = Prod_i Hom(Ai, Bi+n). That is an element f in Cn is a tuple of f_i : Ai -> Bi+1.

Now we need a differential d: Cn -> Cn+1. It should take this tuple f to a new tuple g = df.

Then g_i is defined as
d_B o fi - (-1)^n f_i+1 o d_A

A more abstract perspective could be that Cn consists of homomorphisms of graded abelian groups A[n] -> B (i.e. we forget the differentials) and then the differential d: Cn -> Cn+1 is checking if these homomorphism commute with the differential. (So df = 0 iff f is a homomorphism if chain complexes)

are there more than one f in \underline(Hom)(A,B)_n?

ah so the differential is a map of of tuples of maps

Underline-Hom(A, B)_n is a product. So an element f in it is an element of a product, i.e. a tuple

indeed

So all understood?

yes I think so

thank you

I don't understand the definition of P^(i) in

The idea is you start with P^(i) = A, then modify it one differential at a time to replace the objects with objects in A_0

I have a probably dumb thing I wanted to check, but suppose I'm working with chain complexes of vector spaces. Let f: A --> B be a chain map.

We know the homology of the mapping cone (by taking the usual LES) helps us determine if the induced map in homology f* is surjective/injective at various degrees.

But in the vector space setting (and I think any hereditary category?), it can be shown MC(f) is homotopy equivalent to ker(f) (+) coker(f) (up to some degree shift I'm being lazy about). So surely I can just analyze the homology of ker(f) (+) coker(f) to get the same information about f*?

You say "just", but I'm not sure why this would be any easier

Well I guess it depends what info you want about f

In my application, my f is in fact surjective. So I only need to analyze ker(f), and I know the boundary maps on this complex are induced from those on A

That's why I was hoping this would help

I guess it is unclear to me what you want to know about f

If you have a short exact sequence of chain complexes you get a LES in homology.

So if you just want to know the dimension of the homology of the cone, then it's the same as for ker(f)

It's specific to my application, but I just want information about whether certain homology groups of the mapping cone vanish and to relate that to properties of the boundary maps on A and B (their kernels and ranks)

I don't understand how the limit comes into play

The limit is then a complex where every object has been replaced by something in A0

Like P^(n) has replaced every object for i <= n

Then in the limit as n goes to infinity, every object is replaced

I see

Why isnt this nilpotent? This is the argument presented in the solutions, but Im not sure if thats what I get? Like H is a cartan subalgebra, so its abelian, so [A,A] = \oplus_i L^1_{alpha_i} right? But then going to A^2, dont we end up taking like [L_alpha,[L_alpha,L_alpha]]\subset L_{3alpha} and get the same argument as with L^(n)?

Im slightly just confused about why the same arugment doesnt apply to both the derived and lower central series, I guess im misunderstanding the argument that its soluble too (which is possible, the solutions mention heights which afaik we didnt cover this year, this is an old past paper)

So we get
[a, [a, a]] contains [h, [h, L_a]] = h^2(a)L_a

Now there’s some h with h(a) =/= 0

But with [[a, a], [a, a]] we can’t do a similar thing, since neither side contains H

Im not sure I follow

explaining it is annoying to phrase correctly because i have forgotten all of lie algebras, but if you just work things through with sl_n (where this is the upper triangular traceless matrices) it becomes pretty clear why it's solvable but not nilpotent

Ok this is probably wise, just work with sl_n as a toy is the mantra of lie algebras lol

Just as a toy example. Let F be a sheaf on X, equipped with the discrete topology. Let U \subset X, where U = {p1, p2, p3}. If f is a section of U, let [f]_p denote the germ at p.

Let f, g be sections of U. Then does ([f]_p1, [f]_p2, [g]_p3) consist of compatible germs?

I can pick open subsets of U, namely U1 = {p1, p2}, U2 = {p3} and f in F(U1), g in F(U2), such that the germ of any element of U1 is the germ of f?

By f in F(U1) i mean the image of f in F(U) under the appropriate restriction map

I'm fairly sure this is correct looking at the equivalent definition.

Yes. In general whenever U is a disjoint union of open sets you don't need to check any compatibility between germs in coming from different sets

Thank you : )

Notice that [H, [A, A]] is already simply [A, A], since each L_α is a generalized eigenspace, so L_α = [H, L_α] as α =/= 0

Thus
[A, A] ⊃ [A, [A, A]] ⊃ [H, [A, A]] = [A, A]

im a lil tired so i may be misinterpreting why youre confused

I think the issue is the first line, but I’ll give this another go tomorrow with like sl_n and see if I can work out exactly where I’m getting confused

Because I’m pretty sure what I said about it being soluble is correct, I just need to work out why it doesn’t then carry over to nilpotent, but I suspect I’m just saying something silly

well its not nilpotent because for every L_α (with α =/= 0) there is an h ∈ H such that it acts invertibly on L_α

the H is important, because without it the algebra would be nilpotent (for example because its [A, A], and derived algebras of soluble algebras are nilpotent)

what did u try to prove it

yea i would say that exactness « spreads » information in a way

wdym the rest?

the way it's stated is kind obtuse but the two cases are "the morphism is injective" and "the morphism is surjective"

so the way you prove it is to do a diagram chase

going around the rest of the diagram to show it's injective/surjective

oh hn i can’t even read it 🥀

and it’s 3 am so i can’t even read AT ALL 😭

https://tenor.com/view/ishowspeed-translate-gif-12052961640477791272

Bro it looks you held the pencil overhand with your whole fist

Are you right handed?

Ok well then I don’t think the fact you use your left hand matters much lol

How does one make it to homological algebra before primary school 🥀

I knew homalg before primary school, it’s like
The first thing your parents should teach you

I learned the alphabet through homological algebra

Like M, I was like oh that’s like modules

R is for R-Module

A is for Algebra
B for BG 🎵
C is for chain complex
D for dg 🎵

E is for Eilenberg
And F is free 🎵

G is for group
H for homology 🎵

A is for abelian group
B is for bar resolution
C is for chain complex
D is for differential
E is for essential extension
F is for free module
G is for group ring
H is for homology
I is for injective module
J is for Jacobson radical
K is for killing form
L is for Lie algebra
M is for module
N is for Noetherian
O is for octahedral axiom
P is for projective module
Q is for Quillen
R is for radical
S is for short exact sequence
T is for torsion
U is for uniform module
V is for variety
W is for Weyl algebra
X is for exact sequence
Y is for young tableau
Z is for zig-zag lemma

Amazing.

X for eXact
Y for yoneda
Z for ... the integers

lol we came up with Z at the same time

Changed E to essential Extension and X to exact sequence
I prefer mine for Y (down with the categories!)

Yoneda meaning yoneda extensions of course, not yoneda lemma

X is for Twitter

Z is for Zentrum

B for bar resolution

Done 🙃

Q and Z are the ones I’m not happy with now

Maybe V too

O is a little boring too

Yeah fair

Z for zig-zag lemma

I was thinking A for A-module, O for O_X-module...

T for Tate Module?

okay maybe only I find this joke funny

D for dwagon module :3

O for orbit-stabiliser

Just joined, can i put questions in here or is this just for discussion and i should put my questions in regular maths help?

You can put them here as long as they’re (abstract) algebra questions beyond a standard first algebra series (questions from a first algebra series belong in #groups-rings-fields )

To add onto the answer above, you should not post these level of questions in the help channels cuz it won’t get seen by someone who can help you, most likely

thank you, having a quick look it seems im definiutely not at the abstract alegbra level yet thanks tho

O for octahedral axiom?

Added

Down with the octahedral axiom

Outer isomorphisms, then?

Just rename it to the second isomorphism theorem and all is well

I have a question about this exercise in Weibel

Let P ---> A, Q ---> B be Cartan-Eilenberg resolutions. Its clear that when taking the vertical filtration, doing the vertical homology H_q(Tot(P_(i,*) (x) Q_(j,*))) computes Tor_q(A_i, B_j).

My first question: is the Tot^(+) in the second result just denoting the fact that when I take horizontal homology, I'm just doing something like taking the pth homology of Tor_q(A_0, B_0) <--- Tor_q(A_1, B_0) (+) Tor_q(A_0, B_1) <--- ....?

Second, I know that for CE resolutions, taking horizontal homology gives a projective resolution of the homology of the base complex at a particular column. But is it the case that P (x) Q is itself a CE resolution of A (x) B?

Or at least is it obvious that when I do the horizontal differential along Tot(P_(*,k) (x) Q_(*,l)), it factors as the direct sum of terms like H_k(A) (x) H_l(B), where k+l = q?

Can someone please verify this solution? I'm slightly suspicious because it felt too easy. Comments on notation/clarity/whatever else appreciated : )

(implicitly I am assuming that F, G are (pre)sheaves on a set X, and U is an open subset of X)

This is not how I would have done it, but it’s pretty swag

As in it’s better

I can't exactly take credit because the hint is to consider the diagram, but thank you haha

lol

ok bud

Nvm, when taking horizontal homology, I can use flatness + kunneth to distribute the homology over the tensor product. Then the columns are tensor products of resolutions of the homology groups of the base complexes by a property of CE resolutions, and taking vertical homology computes Tor of these

people who take classes on them usually don't understand it pretty well

that's why they take the classes :>

the fuck is a neurotropic

"the math channel" 💔

I don't see how they conclude that that P^(n) -> P^(n-1) is a quasi-isomorphism

You only need to worry about the homologies being isomorphic in degree n and n+1. The fact the kernels of the chain map in degree n+1 and n are isomorphic (via the natural map between them) is a general categorical fact due to it being a pullback square.

Because the chain map is surjective, and the next map is identity, it’s obvious that H_n(P^(n)) surjects onto H_n(P^(n-1)), the question is whether it’s injective or not. Suppose a class x goes to 0 via this map, then x is mapped to something by the chain map to something in the image of P^(n-1)_n+1. Pull this back to an element y in P^(n-1)_n+1, and since the chain map is surjective in degree n+1 as well this pulls back to something z in P^(n)_n+1. Then the image of z maps to the same thing x does via the chain map, meaning it differs by something in the kernel. This means x = im(z) + x’ for some x’ in ker(P^(n)_n -> P^(n-1)_n). But because the kernels are isomorphic, x’ is the image of some z’ in P^(n)_n+1, so z - z’ maps to x.

This says that the class of x in H_n(P^(n)) is zero, and so the map on homologies in degree n is injective and thus bijective

You can do another similar element-wise argument to show that the homologies in degree n+1 are isomorphic which I leave to you

is there a categorical argument that does not rely on element-wise arguments?

There’s this marvellous thing called the Fryed-Mitchel embedding theorem

There will be an argument just using kernels and cokernels etc because it is true of abelian categories but I suspect it’ll be pretty painful

Ahha

Also, I seem to be unable to react to messages with emojis?

A -> B
C -> D
is pullback iff
0 -> A -> B(+)C -> D
is exact.
As B -> D is epi you get that
0 -> A -> B(+)C -> D -> 0
is exact, so the square is also pushout.

Pullbacks induce isomorphisms on kernels, pushouts on cokernels.

So in degree n+1 the kernels are the same, and the images coming from n+2 are the same, boom boom.

In degree n use that you can define homology as the kernel of the map
cok(d) -> P_n-1
and it's just the dual of before

Alternative approach:

Let K be the kernel of P^(n) -> P^(n-1)

From the square being pullback the differential K_n+1 -> K_n is an isomorphism, so the homology of K is 0 in degree n and n+1.

Then take the long exact sequence in homology

i wonder if theres a way to automatically diagram chase

like with prolog

where you give constraints and it tries to prove things like that

Okay I wanted to try and do something like this but failed to see the kernel as a complex and LES

Jagr with an incredibly slick proof as usual

Nope with the jagr glaze as usual

The LES argument requires proving that first though. Which then ends up more complicated than the first one

Youll write a good proof one day chmonkey, I promise

Proving what first

The existence of LES in homology

Oh I guess but

I think you’d have that by the time you’re doing this thing

This is like something to setup the derived category

Yeah true

Using projectives

Let F be a presheaf of sets on X, let F^sh denote its sheafification. Let V \subset U. Is the restriction map F^sh(U) -> F^sh(V) given by essentially 'forgetting' all the germs of points not in V?

As, in, we send (f_p), p \in U to (f_p), p \in V? Is this even a morphism? It feels as if I am not specifying where some elements are sent?

That’s a morphism of (sets, groups, rings) fairly trivially
It’s just the projection morphism of the product

Wait I am so silly

And yeah this should all be pretty tautological because we’re essentially saying “well if something works, it must be this. Does this work?”

Yes of course (x,y) \mapsto x is a function

Thank you mico

If you think of compatible germs as a function from U to the germs, then the restriction map is literaly restriction

Oh this is neat. And the sheafification of a sheaf is the same datum as the sheaf itself because we showed earlier that "sections of a sheaf F over U" = "compatible germs"

Do you mean as a function from F(U) to the germs?

No

A set of compatible germs (f_p) is a function on U taking p to f_p

I think I see

Like the idea is if you let
X' be the union of all germs. Then you have a map
X' -> X
that just takes a germ to whatever point it is a germ over.

Then for a sheaf F, sections of F are exactly sections of this map and the restriction maps are restrictions.

I need to ponder for a moment

if 0 -> A -> B(+)C -> D -> 0 is exact isn't the cone on the morphisms is acyclic and hence they are quasi?

any hints for showing a localization of a UFD is a UFD?

I mean. That's true yes

A factorization of a/s is just a factorization of a times the unit 1/s

Lmfao

I think this is not that simple????

Oh no, I think what im thinking of is showing a regular ring is a UFD

At least in Matsumura I think you prove first that if a localization with respect to some multiplicative set with some special property is a UFD, the original ring is a UFD or some shit

how does B -> D being epi imply that A -> B (+) C is a mono?

It does not. That's unrelated.

If
0 -> A -> B(+)C -> D
is exact. Then
A -> B(+)C is mono, independently of whether B -> D is epi

But if B -> D is epi, then also B(+)C -> D is epi

then how do you get that 0 -> A -> B(+)C -> D -> 0 is exact from B -> D being epi?

0 -> X -> Y -> Z -> 0
being exact is equivalent to
Y -> Z being epi and
0 -> X -> Y -> Z
being exact

Here you have a pullback square with P^(n)_n -> P^(n-1)_n epi

The point is that this square is also pushout

I’m pushout

How do you argue that
"As B -> D is epi you get that
0 -> A -> B(+)C -> D -> 0
is exact, so the square is also pushout."
how is 0 -> A -> B (+) C known to be exact?

The square is pullback

That's how P^(n)_n+1 is defined

You need a D at the end

ah ok I see

And that’s the definition of a pullback via a formula

Or a construction I guess

How can I do moves in triangulated categories like jagr

Just shoot for the stars, if it feels right then aim for the heart of a t-structure

Well if you miss the stars you’ll still be… wait it’s supposed to be shoot for the moon and if you miss…

Shoot for the stars, if you miss you'll land among the vast suffocating emptiness of space

you know in kung fu panda when po goes to the top of the mountain with master shifu? thats my plan for getting good

The secret ingredient is ||that there is no secret ingredient||

My plan is basically to think about them for the next 4 years, suffer a lot, and maybe become wise somewhere along the way

About what

Maths

triangulated categories, likely among other things one would think

I like stable ∞-categories

I don’t

Have you considered studying AC :3

What’s ac

Axiom-o choice

axiom of choice Atiyah conjecture

autistic cohomology

Idk what that is

Basically a whole cluster of conjectures about what values l^2 betti numbers can take

On what

Aeanvalue Cheorem

What’s l^2

#1504882709569212616 message

What is C^2_n

Too much

Sorry

It no is simples

Peak

Does 'natural' in this case mean 'unique'? Both of these objects are limits/colimits, so is the question asking me to verify that each side satisfies the others universal property?

Can someone verify that this is the correct definition of the colimit? Vakil simply tells me to flip some arrows but I get confused sometimes about which arrows should be flipped and which arrows shouldn't be.

essentially, yes

alternatively you can show that the morphism induced by their universal properties is an isomorphism

thanks : )

all of them

all the arrows should be flipped, because youre working in the opposite category

wait i think F(m) is going in the wrong direction

It doesn't matter for the concept whether you flip m and F(m); at worst that just corresponds to taking I^op instead of I.

(At best, to drawing the mirror image of the same commuting triangles, in which case the actual content of the definition is exactly the same).

Natural means in the categorical sense. But the unique isomorphisms between things with the same universal property are natural, so that is a way to obtain naturality.

Wait I've just had a thought. I don't think this is good enough. \

Suppose $\ker(\mathcal{F}_p \to \mathcal{G}_p)$ satisfies the universal property of $(\ker(\mathcal{F} \to \mathcal{G}))_p$. As the stalk is a colimit, this induces a morphism $(\ker(\mathcal{F} \to \mathcal{G}))_p \to \ker(\mathcal{F}_p \to \mathcal{G}_p)$\

Now suppose that $(\ker(\mathcal{F} \to \mathcal{G}))_p$ satsifies the universal property of $\ker(\mathcal{F}_p \to \mathcal{G}_p)$ As the kernel is a limit, this induces a map $(\ker(\mathcal{F} \to \mathcal{G}))_p \to \ker(\mathcal{F}_p \to \mathcal{G}_p)$.\

Originally, I thought one of the morphisms was going in the other direction, then I could conclude they are isomorphic because limits/colimits are unique up to unique isomorphism, so they have to compose to the identity. But, now I'm not so sure. \

I've already shown the first part, that there is a unique morphism $(\ker(\mathcal{F} \to \mathcal{G}))_p \to \ker(\mathcal{F}_p \to \mathcal{G}_p)$, but I'm not sure how to proceed. \

Any advice?

swifteeee

I suppose I can try to show that the induced morphism is an isomorphism

and we're assuming that F is a sheaf taking values in abelian groups, so maybe this won't be too painful

Are you doing set valued sheaves or a more general category?

sheaf of abelian groups

or O_X modules

but I'm doing abelian groups for ease

Yeah, then you can probably just show explicitly that it's injective and surjective

I'm going to have lunch then give this a go

I'm just thinking, so far I've only shows the existence of a morphism using universal properties, and there is no way I can prove injectivity/surjectivity using just existence? Maybe I need to explicitly constrcut a morphism using the characterisation of limits/colimits we have for categories that are set with extra structure, in terms of some quotient of the (co)product. hm

in general categories this doesn't hold

the fact that limits and colimits commute isn't a true statement generally

so you have to use the properties of the categories you're given

so you can't do this "purely abstractly"

this is true for abelian categories in general right? (that limits in abelian categories commute, not that sheaves with values in an abelian cateogry form a category in which limits commute)

No, not true in general.

An abelian category where direct limits commute with kernels is called AB5
https://en.wikipedia.org/wiki/AB5_category

I like how AB4 categories aren’t mentioned in this page

oh curious. this grothendieck guy seems pretty good at maths

they're not real

Its also interesting that it doesnt just redirect to the abelian category page where they discuss this anyway

what an odd stub article

since all this is already said in the abelian category page anyway

Bro took inspiration and decided to repeat what I said 🥀

it's meta if you think about it

you're like the abelian category article and im like the ab5 category article

90% of the actual content of the article was written by the original person to create the article in 2010

i totally didnt just make up this excuse

Perhaps even metabelian?

Am I being stupid. Is there an easier way of doing this

Or do I have to just thug it out

I mean, this doesn't seem that hard.

It's the induced morphism essentially by definition.

Well definedness and injectivity should be immediate and there's not much to showing surjectivity either.

Okay, maybe I am just being a weakling and should just shut up and write

After thinking for 2 minutes it turns out that basically everything is immediate. And all of a sudden after spending a solid 3 hours on this exercise, all of it feels trivial and it feels like I haven't done anything haha

thank you all for the help

youve done lots! familiarised yourself with the concepts more

No of course, I know, I'm being dramatic

i feel you haha

this is the first time i've really experienced a 'grothendieck proof' I think. at each step we're unravelling definition, or doing some obvious diagram chase, and in the end we have really done something nontrivial

I feel like a nut in water rn

Typical day in the life of math

Also what the hell, for sheaves of abelian groups, kernel, cokernel, mono, epi and exactness are all stalk-local

I'm slightly stunned

I'm flabbergasted in fact

I hated stalks ten days ago and now I am a huge fan and this makes me happy

It’s kinda the point

You can cover a lot with them at least

Eventually you'll reach the limit though

It is good to know that they are all fancy variations of "exactness is stalk local" using the properties of abelian categories

IMO the more amazing part is how many complicated things are usually determined by "coherence condition + pointwise condition", in case of morphisms of sheaves you want to know the existence of some morphisms but then a lot reduces to just looking at all the points.

In Vakil we show that kernels, images etc. are stalk-local first and then use this to deduce that exactness is stalk-local. Does this mean that we can show that exactness is stalk-local first then deduce everything else?

I'd have to think about it, but no thats the normal way

Preserving exactness is equivalent to preserving short exact sequences... which in particular means preserving kernels and cokernels

So any reasonabe proof would end up proving these two cases first

You can make reasonable proofs that just proves exactness without splitting into cases

What's the idea?

I mean just consider a germ in the kernel and show it's in the image

I guess from there it would depend how exactly you're defining image of sheaves

But I'm not sure how it would help to split into cases

local global principles!!

I prefer local to local principles

I got really giddy in my commalg module when we proved that being the zero module is local so it shouldnt be a surprise that i got so giddy at this

haha

its a very nice result

Prove that AG is local

and basically all the results you mentioned can be proven from that

every geometric property is local, AG is about geometry

hence AG is local

I was actually wondering if there is a difference between study of local properties and geoemtric properties

Not every geometric property is local :3

I don't intuitively why geometry should be local i suppose

such as?

A curve being a geodesic

(In the metric geometry sense)

(metric geometry is not geometry)

I say in the metric geometry sense because metric geometers require a geodesic to be globally length minimising and Riemannian geometers usually only want locally

(It is)

(but geometry is when topoi)

(Least brainrot algebraic geometer)

I mean have you seen algebraic geometry when you dont do all that nonsense?

do metric geometers use the word "topoi"?

It’s all bs 🙃

How about being simply connected?

That too

But I’d say that’s topological not geometric

let A = k[x,y,z]/(x^2+y^2+z^2) where k is a field (char(k) is not 2). Then A can be checked to be integrally closed in its fraction field (This is similar to calculating the ring of integers in quadratic fields).
What happens when k is not a field? is it still integrally closed?

same thing duh

I think you need to have that 2 is invertible

and probably k itself should be integrally closed

another question. If A is integrally closed, is A[x] integrally closed?

how do I show this?

idt it's entirely straightforward to prove

idt = I don't think?

yeah I mean it's not hard but you need to have some preliminary results set up

https://stacks.math.columbia.edu/tag/030A

I will just take it for granted for now xD

In short, like: if K = Frac(A) then note K[x] is integrally closed, so it's enough to show that A[x] is integrally closed in K[x]. In other words we need to show that given some polynomial f = a_n x^n + ... + a_0 where the a_i are in K, if f satisfies some monic polynomial g over A[x] then each coefficient is in A. But by induction on n and using our hypothesis on A, it's enough to show that a_n is integral over K, which should just follow from staring at g(f)=0

<@&268886789983436800>

Let A,B be two k-algebras and domains that are isomorphic as vector spaces.
If A is integrally closed then is B integrally closed?

Isomorphic as vector spaces tells you basically nothing. Any finitely generated k-algebra will be a countable (or finite) dimensional vector space

As an example compare k[t] with k[t^2, t^3]

I see

That they're isomorphic as rings for example

Not sure I have that in my case

Looking at
k[w,x,y,z]/(wz-xy) and k[x,y,z,w]/(x^2+y^2+z^2)

which one do you know is normal?

The sum of squares one

Also I would like just a hint

I need to check if the isomorphism I have in mind is an isomorphism of rings

If k has square root of -1 it looks like you can maybe do a change of variables

Its alg closed yeah

I didn't check, but looks like it could be possible

I will try

Btw do you have a reason you want to use one to prove the normality of the other as opposed to just proving normality

Thats the point of the exercise I think

are they even isomorphic? diagonalizing wz-xy should give you a sum of squares in four variables, not three

Yeah i meant 4 squares

this should just give you the answer then lol oops

Already finished this exercise

There’s no way around groking these out it seems?

Bro go to #prealg-and-algebra or #competition-math

Alright alright

For an n-dimensional symmetric real matrix is there any well known tight lowerbound for the smallest eigen value?

This goes to #linear-algebra or sth

Idk

Dont try to move people if you dont even know what question theyre asking

Okay

What do you know about the matrix that you'd hope to get that lower bound from? Merely the fact that it's symmetric will not give you any.

Sorry I meant, I have an n-dimensional symmetric matrix. And it's too difficult to calculate the eigenvalues by solving the characteristic polynomial. So is there a way I can get a lower bound for the eigenvalues

beyond standard ones like the matrix norm idts. Consider just like a diagonal matrix with your favourite arbitrarily large or arbitrarily small values on the diagonal

Also do you mean absolutely smallest eigenvalue or would large negative eigenvalues qualify too?

(Not that I have a good answer in either case).

negative eigenvalue qualify too

shouldn't there be an inequality with some norm or something?

Not really a bound, but iterating
x |-> Ax / |x|
should converge to an eigenvector for the largest eigenvalue.

And the smallest for A would be the largest for A^-1.

This is in absolute value though. Negatives might be annoying

I guess you might also just solve the characteristic polynomial with newtons method or whatever

this is probably interesting to you https://en.wikipedia.org/wiki/Spectral_radius#Symmetric_matrices

if you have a norm on the vector space, that induces a matrix norm on nxn matrices that's compatible with the vector norm in the sense that |Ax|<=|A| · |x|. Then if x is an eigenvector |lambda x|=|A x| <=|A| · |x|. Assuming x!=0, you get |lambda|<=|A|

and in the case of the l^2 norm you get equality with the maximum of the absolute values of the eigenvalues

for other eigenvalues you have this

WHY THE HELPER TAG BEING PINGED

because someone needs help?

No they are not following the rule of 15 minutes

they probably dont know the rule

or are just impatient

gershgorin + the fact that they’re real might get you pretty far

advanced-algebra is immune to typos

Somewhere a moderator is thinking, "oh, a challenge ...".

it's known that trace 0 matrices over any PID must be additive commutators, but what do we know about when determinant 1 matrices must be multiplicative commutators?

this doesn't even hold over all fields (consider 2 by 2 matrices over F_2)

it is true however over algebraically closed fields

It holds over F_q if q> 3 though

Actually it holds for any field with more than 3 elements

You can just prove it by hand by writing elementary matrices as commutators of elementary matrices

wouldn't this only give us that every det 1 matrix is a product of commutators

is the Kahler differential $\Omega_{k[[x]]/k}$ what one would expect ($k[[x]] dx$,) or does the fact that $k[[x]]$ is not finitely generated cause this to fall apart?

lexi

https://mathoverflow.net/questions/21189/the-structure-of-the-module-of-kähler-differentials-of-rx-over-r

tl;dr

Hard

that makes sense; the 'sensible' description of the module of kahler differentials of k[x] depends on a derivation being determined by where it sends x

but k[[x]] isn't finitely generated

Oh I thought you wanted to know if Sl_n(K) was perfect, not if every element was literally a commutator

That fails even for Sl_2(R) so I don’t know what kind of statement you’re hoping for

mostly hoping that it would at least hold for SL_n(K) when n > 2 and K is not char 2

and indeed this is stated in the literature (see for example the intro of https://www.jstor.org/stable/1993409) but I can't find a proof

they proved theorem 1 in that paper
you don't have the full paper ?

why does jstor watermark the pdfs you download with your ip and date and time

probably to discourage redistribution