Are there any example of math olympiad problems that can be solved by modern math like category theory, commutative algebra, nonlinear algebra, algebraic geometry etc. ?

*examples

πŸ‘︎ 133
πŸ’¬︎
πŸ‘€︎ u/Realistic-Sea-971
πŸ“…︎ Oct 27 2021
🚨︎ report
Meme of a baby reading Commutative Algebra

Does anyone have the meme of a baby reading Atiyah Commutative Algebra? I saw that about few months ago and tried to look for it but couldnt find. Thanks a lot!!!

πŸ‘︎ 5
πŸ’¬︎
πŸ‘€︎ u/FourWatermelons
πŸ“…︎ Oct 12 2021
🚨︎ report
polynomial in non-commutative algebra

In the book 'Skew Fields' on pages 48-49 professor Cohn assumed that in non-commutative algebra we can introduce maps alpha:A->A and delta:A->A such that at=t alpha(a)+delta(a). Map alpha is endomorphism and map beta is derivation. However there is no clear expression for these maps. Does somebody know how to represent these maps (for instance) in quaternion algebra or matrix algebra or in any other algebra

πŸ‘︎ 2
πŸ’¬︎
πŸ‘€︎ u/aleks_kleyn
πŸ“…︎ Jul 30 2021
🚨︎ report
New-ish resources to learn commutative algebra

Here are some (relatively) recent books on commutative algebra beyond the usual resources of Atiyah-Macdonald, Eisenbud, Matsumura, or Reid. I have not read these, but I do want to bring them a bit more attention as they could be quite useful for those trying to get into CA/AG.

And for the most recent one, which doesn't even have reviews yet, here is

Additionally, some free notes on the subject:

The following also cover some algebraic geometry in what seems to be a similar vain as the classic text on CA+AG of Kunz.

... keep reading on reddit ➑

πŸ‘︎ 22
πŸ’¬︎
πŸ‘€︎ u/autoditactics
πŸ“…︎ Jun 08 2021
🚨︎ report
An introductory course in commutative algebra

Hello reddit!

I wonder if theres a way to make an introductory course in commutative algebra for school kids in my local math school for gifted kids. I'm reading Atya & McDonald book and having a great time, I'm sure these kids are able to understand first few chapters. But this book is kind of dry and I i would like to add some connections to other areas of math and some applications. So my question is: where can i find these connections and applications that do not rely on very advanced math?

πŸ‘︎ 13
πŸ’¬︎
πŸ‘€︎ u/pahlavaje
πŸ“…︎ May 23 2021
🚨︎ report
[Uni. MATH: ALGEBRA] Mathematical proof of the commutative property of multiplication?
πŸ‘︎ 2
πŸ’¬︎
πŸ‘€︎ u/mandrakejr
πŸ“…︎ Apr 30 2021
🚨︎ report
Commutative Algebra Textbook Recommendations

Hello math reddit! I’m a first year graduate student taking my first commutative algebra course this semester. We are using Eisenbud, but I personally find it dense and somewhat difficult to follow. I was hoping to find other references to help me because I am really beginning to struggle with this class. If you guys could recommend any books, online lecture notes, or even youtube videos, I’d really appreciate it! Thanks in advance.

πŸ‘︎ 3
πŸ’¬︎
πŸ‘€︎ u/madcattter1
πŸ“…︎ Mar 02 2021
🚨︎ report
We are doing modules in Commutative Algebra right now. Which book/playlist would you recommend for our syllabus right now?

We're doing modules in this particular order:

  • Definition of a module

  • Definition of a submodule

  • Definition of a quotient module

  • Definition of a generated submodule

  • Definition of a (homo)morphism of modules

  • Definition of a cokernel

  • Definition of the linear independence of a subset for a module

  • Definition of a module's base

  • Definition of a free module

  • Definition of the rank of a module

  • Definition of an exact sequence

  • Definition of a zero divisor of a module

  • Definition of an anihilator

  • Definition of a simple module

  • Definition of a quotient/product of modules

  • Theorems of isomorphisms of quotients/products of modules

  • Definition of a direct sum of submodules

  • Definition of a coproduct of a family of modules

  • Definition of a product of a family of modules

  • Definition of a projective module

  • Nakayama Lemma

  • Definition of a chain of modules

  • Jordan-Holder Theorem

  • Definition of a ring/field of fractions

  • Ring localization theorem

  • Definition of an extended ideal

  • Definition of a contracted ideal

  • Module localization theorem

  • Definition of a tensor product

  • Theorem about the existence of a tensor product

  • Definition of a simple tensor

I hope I translated it properly haha.

The reason I ask is because all of that was done in our last two lectures where he had to rush through the presentation and had no time to explain the motivation, intuition and interpretation of all of that.

I'm looking forward for your suggestions

πŸ‘︎ 4
πŸ’¬︎
πŸ“…︎ Apr 17 2021
🚨︎ report
What are your book recommendations and tips for Commutative Algebra?

That's a subject I'm gonna have in the next semester and I'd like to prepare myself a little bit for that

What books are good on this topic? What are in general your tips and advice for this subject?

πŸ‘︎ 5
πŸ’¬︎
πŸ“…︎ Feb 11 2021
🚨︎ report
(Abstract algebra) Can a commutative ring with unity have zero divisors ?

I don’t need a proof, but I’m just a little confused about the statement. If a ring has unity 1, then x1=x. But if x is a zero divisor, then x1=0 for x=/=0, so there wouldn’t exist a unity. Am I thinking about this correctly ?

πŸ‘︎ 3
πŸ’¬︎
πŸ‘€︎ u/ravt13
πŸ“…︎ Apr 10 2021
🚨︎ report
Looking for someone to study Combinatorial Commutative Algebra with

I've just started to work through the book by Sturmfels and Miller in preparation for my PhD and I'd be interested In someone to discuss concepts with and bounce ideas off

πŸ‘︎ 8
πŸ’¬︎
πŸ‘€︎ u/bdobba
πŸ“…︎ Feb 15 2021
🚨︎ report
commutative algebra mnemonic devices

I'm doing a few heavily algebraic courses right now (AG,ANT,RT), and they draw on a very wide variety of results from commutative algebra.

I find it hard to remember basic properties and their implications for rings and modules, so I'm always spending time looking them up. Things like which types of rings are PID/UFD/local/integrally closed, which modules are finitely generated/free over which types of rings, how these pass through quotients, etc. Are there mnemonic devices or similar that people find helpful for this? Besides just doing it for enough years to remember everything.

πŸ‘︎ 15
πŸ’¬︎
πŸ‘€︎ u/SirJektive
πŸ“…︎ Oct 01 2020
🚨︎ report
If we consider an ideal I of a commutative ring R to be an R-module, why isn't I ⨂ I β‰ˆ IΒ² ? (where the tensor product is over R)[College Abstract Algebra]

Essentially, I was asked to prove that in a more specific context, the canonical map f(x ⨂ y) = xy is not injective. It is, however, surjective in general. This doesn't make much sense to me, though, since the tensor product is taken over R so any simple tensor x ⨂ y can be written as xy ⨂ 1 so that any element of I ⨂ I can be written as βˆ‘x_i y_i ⨂ 1 for elements x_i, y_i of I. Wouldn't the map f which is given here by x ⨂ 1 maps to x*1 = x define an isomorphism, then? I am very confused.

Thank you in advance for all your help.

πŸ‘︎ 2
πŸ’¬︎
πŸ‘€︎ u/Menacingly
πŸ“…︎ Feb 23 2021
🚨︎ report
Reading group for commutative algebra and algebraic geometry

Greetings! I am looking for (self-motivated) people who would be interested in studying commutative algebra and algebraic geometry. I am planning to focus on 3 books. 1)Atiyah and Macdonald for commutative algebra 2) Fulton- Algebraic curves 3) shafarevich basic algebraic geometry

My aim is to do most of the exercises from these books(something that I have not done in the past). Also, we can work together on some expository works as well so that reading is not completely dry.

I feel studying together (in terms of having discussions and exchange of ideas) is much more better than keeping everything to yourself. Also, I would like to make special request to persevering, interested guys to join me. It will also include some accountability to finish things and not take a very relaxed approach (which creeps in when you are studying on your own). Thanks!

πŸ‘︎ 24
πŸ’¬︎
πŸ‘€︎ u/Bourbaki22034
πŸ“…︎ May 18 2020
🚨︎ report
[Commutative Algebra] Noether's Normalization Lemma, small application isn't making sense to me.

Noether's Normalization Theorem: (or a version of it I believe)

Let F be a field. If F is a finitely generated K-algebra then F is an algebraic extension of K.

Let's take a simple example. Let F be the Q-algebra finitely generated by {1,πœ‹}. I think that's Q(πœ‹) right? Then the theorem implies Q(πœ‹) is an algebraic extension of πœ‹. Which it isn't. Therefore I made a mistake.

Is the mistake that I don't know the definition of finitely generated Q-algebra? It should the smallest Q-algebra containing 1 and πœ‹. But since Q-algebras allow products between any elements including πœ‹, then the (Q-algebra finitely generated by {1,πœ‹}) should contain 1,πœ‹,πœ‹^(2),πœ‹^(3),...,. Implying it should be equal to Q(πœ‹). The rest of the argument should follow.

EDIT: IT ISN'T A FIELD. NEVER MIND.

πŸ‘︎ 2
πŸ’¬︎
πŸ‘€︎ u/HardlyCoherentLee
πŸ“…︎ Jun 16 2020
🚨︎ report
Introduction to Algebraic Geometry and Commutative Algebra swayam.gov.in/nd1_noc20_m…
πŸ‘︎ 4
πŸ’¬︎
πŸ‘€︎ u/AWorlock
πŸ“…︎ Jan 30 2020
🚨︎ report
[Commutative Algebra] Do all non-stupid reductions of finite algebraic dependent set have the same cardinality? (in LA that cardinality corresponds to the dimension)

In Linear Algebra it's typical to have linearly dependent set and reduce it to a linearly independent set. Here I want to reduce an algebraic dependent set to an algebraic independent one. Is there such a reduction algorithm?

I'll give an example of what I mean in linear algebra.

For example, imagine we have a vector space. And a set of vectors:

S={ (2,0), (3,0), (0,1)}.

We'd like to reduce this set, element by element, until we arrive at a linearly independent set. But in a non stupid way. An example of a stupid way would be to remove elements until we arrive at a linearly independent set. For example, first we could remove (0,1) from S. But S(0,1) isn't linearly independent so we'd remove (3,0). Obtaining {(2,0)}.

There are non stupid ways to reduce S. Pick v in S and ask: "Do <S\v> and <v> intersect non-trivially?". If yes then remove v, if not keep v. Repeat this until S is linearly independent.

This is because in a sense "Do <S\v> and <v> intersect non-trivially?" is equivalent to asking "Are S\v and v independent in linear sense?".

............................................................

Is there a similar concept in algebra? One example would be to ask: "Do the algebraic closure of K(S\v) and of K(v) intersect non-trivially?". By intersecting trivially we mean that the intersection is K.

Does this work? Is this independent of the way in which we reduce our set? It'd be odd if a reduction had cardinality 3 and another reduction had cardinality 4.

πŸ‘︎ 2
πŸ’¬︎
πŸ‘€︎ u/HardlyCoherentLee
πŸ“…︎ Jul 10 2020
🚨︎ report
Commutative Algebra: Module isomorphisms analogous to integer division and multiplication.
πŸ‘︎ 2
πŸ’¬︎
πŸ‘€︎ u/DeepakSireeshan
πŸ“…︎ Aug 06 2020
🚨︎ report
Exercises for self teaching commutative algebra

I’m reading Aatiyah Macdonald’s commutative algebra text and I have no clue which exercises to do. Does anyone have a link to a class which has used this as the main text with exercises assigned from the book or any recommendations on exercises to pick?

πŸ‘︎ 9
πŸ’¬︎
πŸ‘€︎ u/vsamazon
πŸ“…︎ May 06 2018
🚨︎ report
A false proof in commutative algebra

Say that a commutative ring R is coherent if every finitely generated ideal in R is finitely presented. (I.e., if I is a finitely generated ideal of R, then there is an exact sequence R^m -> R^n -> I -> 0.)

Claim: Every commutative ring is coherent.

Proof: Let R be a commutative ring, and let I be an ideal of R, say generated by f*1, ..., fk. Any commutative ring is a direct limit of Noetherian rings Rπœ†: R is the direct limit of subrings finitely generated over Z (namely rings of the form Z[x1, ..., xi] for x1, ..., xi* in R), and such rings are Noetherian by the Hilbert basis theorem. Moreover, there is some such subring which contains f*1, ..., fk, namely Z[f1, ..., fk], and in fact the set of such subrings of R is cofinal in the set of all subrings finitely generated over Z. (If S is a subring of R finitely generated over Z, then so is S[f1, ..., fk*].)

But now Noetherian rings are obviously coherent, so if R*πœ†* contains f*1, ..., fk, then there is some exact sequence Rπœ†^m -> Rπœ†^n -> (f1, ..., fk)Rπœ†* -> 0. But now taking direct limits is exact and direct limits commute with direct sums, so this gives an exact sequence R^m -> R^n -> (f*1, ..., fk*)R -> 0, so indeed the ideal is finitely presented and R is coherent. QED

However, the claim is not true (see http://math.stanford.edu/~vakil/216blog/incoherent.pdf), so of course the proof is also not true. Can you find the mistake? Can you add (nontrivial) hypotheses on the claim to make the (main idea of the) proof work?

πŸ‘︎ 6
πŸ’¬︎
πŸ‘€︎ u/ReginaldJ
πŸ“…︎ Apr 01 2019
🚨︎ report
A Commutative Algebra Meme
πŸ‘︎ 38
πŸ’¬︎
πŸ‘€︎ u/agosagos
πŸ“…︎ Nov 11 2019
🚨︎ report
A clever false proof in commutative algebra math.stackexchange.com/qu…
πŸ‘︎ 108
πŸ’¬︎
πŸ‘€︎ u/sdjvhs
πŸ“…︎ May 05 2018
🚨︎ report
I desperaately need some advice regarding commutative algebra

This semester I am taking a commutative algebra course at my university, and I find it ridicilously hard. I have all the prerequisities, but still I find it very tough. We use Miles Reid's book, and also some parts of Introduction to Commutative Algebra by Atiyha and MacDonald. However, I find neither book to be very reader-friendly, and as I prefer self-study, I am pretty much lost...

Do any of you have any advice? I mean, study notes, other books, just anything.

To put things into perspective, I find chapter 1 of Miles Reids book very hard, particularily the classification of the maximal ideals in Z[x], and many other things. I got an A in the Algebra course offered at my uni, so I know fairly well general stuff such as groups and basics about fields and rings.

(Edit: Typos)

πŸ‘︎ 2
πŸ’¬︎
πŸ‘€︎ u/userman122
πŸ“…︎ Sep 19 2016
🚨︎ report
[University Algebra] Commutative Monoids

I need help with the following. Can someone explain where the Ξ¨ went?

Let G be a commutative monoid, and x1, ... , xn elements of G. Let Ξ¨ be a bijection of the set of integers (1 , ... , n) onto itself. Then

image

The chapter was pretty intuitive up to this point, but now I'm lost.

πŸ‘︎ 3
πŸ’¬︎
πŸ“…︎ Jun 13 2019
🚨︎ report
Abstract Algebra: Field of fractions of a Commutative Ring with 1β‰ 0

Hello everyone!

I am currently studying the construction of the field of fractions of a commutative ring.

We saw that basically the construction is inspired by the construction of Q from Z. This justifies the equivalence relation that we consider and the operations we define on this field.

We constructed the field with a morphism from R to RxD where R is the ring in question and D is a subset that doesn't contain ant zero divider.

I think I understand the construction but I can't grasp why we necessarily have to take D as a subset that doesn' contain any zero divider. I get that if we come back to the analogy with Q, this would be tantamount to dividing by zero but when I stay in the abstract construction I can't figure out where the problem is!

Thank you for your help!

Edit: Change 'Field of fractions' for 'Ring of fractions' in the title

πŸ‘︎ 14
πŸ’¬︎
πŸ‘€︎ u/Bistalba
πŸ“…︎ Mar 24 2018
🚨︎ report
Anybody interested in a Commutative Algebra reading group?

Update: Looks like we've a satisfactory number of people to form the group. Now, the next things to decide are:

  • platform for the group (a new subreddit, piazza, slack or something?)
  • the reading materials (textbooks, online lecture notes etc.)
  • content and schedule
  • prerequisites to cover for refreshers (example: a short intro to category theory would be useful, if we are interested in the category theoretic approach)
  • discussion methods

Let's discuss about these. Most importantly, we need a platform ASAP.

Update 2:

Hello again, everyone! Seems like we have two choices for the group: slack and subreddit. Personally slack seemed more feature rich and robust to me. So, I've already created our slack domain commalg.slack.com. PM me your email so that I can send you an invitation. A post to discuss our knowledge of abstract algebra so that we can get everybody on the same page is already there.

I'm mentioning here whoever has shown interest till now, PM me your email. /u/RidderJanssen /u/murpwp /u/Haranu /u/JSURATA /u/ThisIsMyOkCAccount /u/CraftyBarbarianKingd /u/yoloed /u/Alozzk /u/MatheiBoulomenos /u/marcelluspye /u/PupilofMath /u/SourAuclair /u/sagarcia11 /u/gshfr /u/CliffordAlgebra /u/tactics /u/dogeatsmoths /u/NullStellen /u/Bobech /u/prime_idyllic /u/AseOdin Hope I've not missed anybody. PM me if you happen to see this post just now and you're interested.

Possibly, we'll be needing one more team admin at slack. And Finally, if slack doesn't work for us, by today, we'll land on a subreddit.

πŸ‘︎ 18
πŸ’¬︎
πŸ‘€︎ u/banksyb00mb00m
πŸ“…︎ Aug 20 2016
🚨︎ report
[Self-taught linear algebra] - How commutative is matrix multiplication?

In computer graphics, let's imagine that I have a matrix, P, of points that make a shape, such that P is:

X1  X2  X3
Y1  Y2  Y2

I can multiply P by another matrix, S, such that S x P results in the shape being resized. If f is the factor by which to resize, then S is:

f  0
0  f

I can also multiply P by a matrix, R, such that R x P results in the shape being rotated. If a is the angle by which I want to rotate the shape, the R is:

cos(a)  -sin(a)
sin(a)   cos(a)

If I want a composite matrix which both resizes or rotates the shape, it seems like I can create that composite matrix by either calculating S x R, or R x S, i.e matrix multiplication is commutative.

But how true is that, generally? Obviously it will only work for matrices where the width of one is the same as the height of the other and vice versa, but my intuition is telling me that it wouldn't be true for all square matrices. Is there are way to know when it's true? If it's not true, is there a way to know in which order the matrices should be multiplied?

Thanks!

πŸ‘︎ 3
πŸ’¬︎
πŸ‘€︎ u/LondonPilot
πŸ“…︎ Jul 31 2017
🚨︎ report
What is your favorite result from commutative algebra and why?
πŸ‘︎ 42
πŸ’¬︎
πŸ‘€︎ u/tkk262
πŸ“…︎ Nov 03 2017
🚨︎ report
[abstract algebra] Proving that two binary operations are commutative.

Let (A, *_1) and (B, *_2) be two binary structures. We let f: A &rarr; B be an isomorphism. Prove *_1 is commutative if and only if *_2 is commutative.


I'm not sure of how to go about proving this. This is what I have thus far:

*_1 is commutative &rarr; *_2 is commutative

f(a *_1 b) = f(a) *_2 (b)

f(b *_1 a) = f(b) *_2 (a)

πŸ‘︎ 13
πŸ’¬︎
πŸ‘€︎ u/RecceRanger
πŸ“…︎ Oct 01 2018
🚨︎ report
clear video lectures on Hopf algebras & combinatorics βŠ• polytopes βŠ• matroids βŠ• enumerative combinatorics βŠ• combinatorial commutative algebra βŠ• Coxeter groups youtube.com/user/federico…
πŸ‘︎ 27
πŸ’¬︎
πŸ‘€︎ u/Lors_Soren
πŸ“…︎ Mar 30 2017
🚨︎ report
Importance of commutative algebra in modern mathematics?

I once audited a classical AG course so I knew that commutative algebra (CA) was quite heavily used in AG. I am also going to take an advanced comm. alg. course in the fall, given that if I could finish Atiyah & MacDonald during the summer.

I'm interested in number theory, graph theory, and algorithms. From what I have studied, these fields usually do not involve a lot of algebra (other than the first one), so I was wondering that (from a higher perspective) what was usually the role of CA in modern mathematics? Would it help my research in any way if I study these in grad school?

Thanks!

πŸ‘︎ 2
πŸ’¬︎
πŸ‘€︎ u/hedgehog0
πŸ“…︎ Mar 25 2019
🚨︎ report
[Linear Algebra] Why does it seems like the dot product isn't commutative?

Look at this image of the dot product visualization: https://i.imgur.com/xJ2RUkB.png

The left part is what I found in the wolfram website, but I don't see why the right couldn't also be right. I know the dot product is commutative, but why does this picture make it look like it isn't?

I feel like I'm missing something pretty basic here. Any help is appreciated.

πŸ‘︎ 4
πŸ’¬︎
πŸ‘€︎ u/Qhirz
πŸ“…︎ Sep 06 2018
🚨︎ report
[Linear Algebra] Vector spaces are associative and commutative under scalar multiplication, right? If so, why aren't they usually included in the list of properties of vector spaces? If not, why not?

Would really appreciate any help on this, thank you.

πŸ‘︎ 3
πŸ’¬︎
πŸ‘€︎ u/Microwave_on_HIGH
πŸ“…︎ May 09 2017
🚨︎ report
Fun with abstract algebra: I tried to draw a commutative diagram of Galois connections. Instead, I accidentally drew a lobster.
πŸ‘︎ 252
πŸ’¬︎
πŸ‘€︎ u/rolfr
πŸ“…︎ May 16 2013
🚨︎ report
[Linear Algebra] How do you show the commutative law holds for a space of functions?

The functions satisfy boundary conditions. At the boundaries I could show they're commutative, but what about inside the boundaries? I'm out of ideas.

πŸ‘︎ 2
πŸ’¬︎
πŸ‘€︎ u/ryud0
πŸ“…︎ Nov 20 2017
🚨︎ report
[Commutative Algebra] Tensor Algebra Help

So as you can see from my username, I made this account because of how frustrated I am with this problem: Show T(Z/nZ) is isomorphic to Z[x]/(nx), where T(M) is the tensor algebra of M.

I know the elements of the ring Z[x]/(nx) are polynomials a_0 + (a_1)x + (a_2)x^2 +...+ (a_n)(x^n) where a_0 is in Z and the a_1,...,a_n are in Z/nZ.

Going from the definition of a tensor algebra, I think T(Z/nZ) is Z βŠ• (Z/nZ) βŠ• (Z/nZ βŠ— Z/nZ) βŠ• (Z/nZ βŠ— Z/nZ βŠ— Z/nZ) βŠ•... If I'm not mistaken, Z/nZ βŠ— Z/nZ = Z/nZ, so would this just be Z βŠ• an infinite number of copies of Z/nZ?

This is from a problem set I've already turned in but I'd still like to figure it out so any hints would be appreciated. Thanks much!

πŸ‘︎ 4
πŸ’¬︎
πŸ“…︎ Mar 09 2018
🚨︎ report
[Commutative algebra] Localisation at a prime ideal

A question is asking for an example of a ring R and a prime ideal p such that the localisation of R at p is a field. I said the integers with the zero ideal, is that correct?

πŸ‘︎ 2
πŸ’¬︎
πŸ“…︎ May 21 2018
🚨︎ report
Please explain the theory of Commutative Algebra and Algebraic Geometry
πŸ‘︎ 8
πŸ’¬︎
πŸ“…︎ Jul 14 2017
🚨︎ report

Please note that this site uses cookies to personalise content and adverts, to provide social media features, and to analyse web traffic. Click here for more information.