Teaching myself abstract algebra

Next up, non-linear dynamics (while I finish the algebraic topology book).
Then if you want to get the clock, 'Don't be a jerk' shirt, floating globe, or other STEM items like those you see in this video check out stemerch.com :)

I can't believe how well this was timed. Ten minutes ago, I finished my final exam for Algebra covering this exact same textbook. I sat down to take a break and watch some UA-cam, and this video happens to pop up in my subscription feed. How serendipitous!

When I went to college, I failed abstract algebra, made a C in intermediate analysis, made a C in differential equations and dropped complex analysis. I ran out of that as fast as possible and switched my major to computer science. Then the those maths started to click in my mind. I was using some concepts in there to run programs. Was it efficient? Probably not! otherwise they would teach this math in CS. Was it fun? YES!! Truth be told, I don't think I was suppose to start complex analysis in my junior year.
Stupid thing is that I bought all the math books I would need for the major. So I grabbed a book in 2020 and started reading it. It was so simple for me to understand the concepts. I feel stupid that all of this didn't click back in the day. I don't know why I didn't understand it. Although at the time I did take a huge loan out for the first time Then I moved to a cheap apartment close to the college that had bedbugs. It kept me up at night and made me like an OCD person looking at everything that moved on the wall so I wouldn't get bit. I would do rituals to clean my clothes and books so I would not bring them with me to the class. I realized I would have no money by my senior year and I didn't ask for help.
I should have applied for a full ride scholarship. My grades were pretty great before the decision to move to that other apartment. The problem is my parents never had the guidance to show me. I should have talked to someone at the school. I was young and thought that I could do everything alone. That my problems were my own to solve.
I am a different person now. I realize that not everybody is out to see me fail. If I just go out and ask for help there will be people willing to help. My childhood goal was to dual major in physics and mathematics. Then get a PhD in physics and sit the rest of my life in a research facility somewhere. I learned that my life path isn't set in stone it will change. For some reason, starting a plan in double major physics and mathematics, failing and switching to computer science has made me actually pretty good at data science. The stars aligned for me.

I feel the need to point out that the operations in a ring are not any more specific than that of a group. The addition and multiplication of a ring are just names, they are not specific operations. The "addition" of a ring can be any operation in the same way that the binary operation of a group can be anything. The "multiplication" of the ring interacts with the addition of the ring through the distributive property. In other words, the terms addition and multiplication in a ring only specify their role in the distributive property relative to each other, not what the operations innately are.
For example, if we have a nonempty set X, and we look at its power set P(X), the set P(X) with the operation of symmetric difference as "addition" and set intersection as "multiplication" form a ring, simply because intersection distributes over symmetric difference. Those operations aren't addition and multiplication in any innate sense, only relative to each other, and an operation serving as addition in one ring can serve as multiplication in a different ring.

YES I NEEDED THIS, I’m currently on this course and this is the exact book we are using. Going to enjoy the video.

Abstract algebra is awesome dude. Especially the connections with number theory.

It's not that the operations for a ring HAVE TO be addition/subtraction/multiplication in the usual sense; they can be anything, too (with some requirements on how they interact). It's just that we CALL them those names because it's something we're familiar with, and they behave largely in the same way.

Oh man you have to do Galois theory next!

These videos of self learning are really original, and gives a rare opportunity to hear about this from a students/ non expert. Well done!

Zach, your intellectual curiosity is inspiring and helps keep me motivated as I work through my degree. I'm sure many others feel this way too- thanks for the great content!

Thanks so much for igniting the flame for new knowledge! I am nothing into mathematics, but seeing others go through books and learn so much in diverse topics really inspires me!

This semester I had real analysis so I thought how about I go over the course myself during winter and boom I got a notification that you made a video on real analysis. This summer I thought of self studying abstract Algebra, and then I got a notification of this video.
Considering I have topology next semester I wouldn't be surprised to get a video on that pretty soon

I'm a fan of your Zack Stars Himself channel. So I checked this out. I'd just like to commend you for being so relatable and funny in your other channel while being so mind blowingly academically gifted. It's rare to see someone with such diverse intelligence.

I don't know what's different in this video, you seem... more understanding of the topics you're discussing and more in depth which, in turn, feeds the passion with which you're explaining as well. Can't wait for more of this content!

I love the turn this channel has taken lately. You inspire me to study all the things!

I like how his shirt says
"Don't be a jerk"

This was by far my favorite class in undergrad. I used the same book. Just candy for the brain. I think some ideas resonate with some people and others with other people. For whatever reason, I just really loved this class. It was two semesters long and covered almost the entire book. I wish I had time to do what you just did again...

I went through so much brain torture to get a B+ in that class... still was one of my favorites, though I never used this information ever again in my life and I doubt I ever will

This book is a beautiful gem. Love the motivational quotes in the book too. Cheers for the JR Tolkien reference preface.

I cited this book for some math research I just completed. Super awesome to see an overview of the content, you have great summarizations!

My abstract algebra class was my favorite undergrad math class. Love how it has applications in physics as well.

Abstract Algebra was my favorite math class by far. It was difficult for me, way harder than real analysis but the intuition you get from it was amazing. Like you are doing math from the ground up. Axioms and proofs to describe all the numbers. Nothing is off limits. Everything in Abstract Algebra is built off of proofs, definitions and axioms. It was pretty cool

bro it's so awesome how you teach yourself advanced classes and show how you do so. Keep up the great work!

I did every single exercise of this book, it’s a fantastic introductory text on the subject.

I would say, depending on the textbook you're using, linear algebra may be a more important prerequisite than you've suggested here. Michael Artin's textbook, for instance, emphasizes matrix groups (such as the group of invertible nXn matrices with real entries) as a key class of examples, especially of noncommutative groups (and similar sets of matrices as examples of noncommutative rings). Matrices also provide a particularly nice example of group action. I agree that it's not necessarily a true prereq, but I'd advise that people should be cautious depending on the choice of textbook/the professor.

Man this is cool! I'm getting this textbook now thank you Zach

Super fascinating video! Thanks for making this!

Thanks Zack, you've given me motivation to finish my abstract algebra course!

It's an awesome subject! The unsolvability of a general quintic is my favorite part.

Technically, number theory follows from abstract algebra. Those “number theory” concepts are concepts usually first learned in abstract algebra and not the other way around. 🙂
Linear algebra is also usually the first mathematics course where you learn and practice most of your proof skills, and this is because abstract algebra often is taken before the more difficult subject of real analysis.

More than making me want to read and solve this book. This video made me curious on depth of maths. Thank you for this ❤️

THANK YOU FOR REVIEWING THIS BOOK!!!
I have chosen this book after searching for a good one for some time, and since then been hesitating to start to crawl onto Abstract Algebra. Now feeling confident

at 2:17
15x + 57y = 1 has no integer solutions and it can be shown with basic algebra (no modulo operations needed):
15x + 57y = 1
3*5x + 3*19y = 1
3*(5x + 19y) = 1
5x + 19y = 1/3
Since if x and y are integers, then 5x+19y must be an integer. However we see above that 5x + 19y = 1/3, a rational number but not an integer, giving us a contradiction.

I found "A Book of Abstract Algebra" by Charles C. Pinter to be a good, concise introduction to abstract algebra. It's short and easy to understand, even for a self-learner like me whose only previous exposure to group theory was in an inorganic chemistry class. I might look into "Contemporary Abstract Algebra" to expand on the topic a bit.

I really love these videos, despite having covered these topics already, it's made me interested in reading the book(s) suggested (and it gives a new view of these topics!) Not that I'd ever really end up using them much outside of personal interest (bar teaching them to people, when I'm lucky enough to), but hey, that's not a bad thing either(!)

Ah now I understand (vaguely) what the general idea of Abstract Algebra is. I still, however, have no clue what Topology is beyond squishing coffee cups...

Hey what is your next book on your " Reading Textbooks I never read in School " list. Please do share as most people who aren’t in maths degree would not get a feel for it.

I loved abstract algebra in college. We used Printers book, which is phenomenal for developing the subject in a inquiry based way.
I can’t wait to continue studying algebra in grad school

A very important video for my general math knowledge. Thanks for making this!

You look great man, amazing content, always blows my mind

This is awesome! I'm an incoming transfer student to UCB and I hope to take a few of these courses. Math is beautiful, but I'm going CS for those hard job skills. It's inspiring to see someone who is taking on Mathematics of their own accord! The learning is never done!

Good! Thank you for the review ... I own this book and now maybe I'll give it a read

This Video was so good, I screenshoted parts of it to look at again.
Thank you so much for sharing your experience and not gating yourself behind a paywall. =]

Congrats on 800K subscribers!

Thank you for this fantastic video on teaching yourself abstract algebra.

Operations in rings don't actully have to be defined. We just need two operations connected by the distributive property, but its helpful to think and notate them as addition and multiplication.

I just want to add to your separation of Groups Rings/Fields (which I generally agree with):
I am working in the field of calculating so called Feynman integrals. They are integrals that appear in Quantum Field Theoretic processes and are basically impossible to evaluate numerically (they love to diverge) or analytically (only possible in easy cases and too time consuming). Their calculation is crucial for more accurate calculations of elementary particle processes.
However, they can be calculated using algebraic methods that are based on the Weyl-Algebra (basically polynomials in n variables and there respective derivatives) structure of the family of all those integrals. The relevant thing here is it's ring structure and both it's ideals and it's quotient rings. In the specific approach I am working on certain Fields of rational function also appear as localizations of specific rings.
What I find interesting is that the Weyl-Algebra is more or less omnipresent at the Quantum level as it describes the relationship of space and momentum / time and energy; I think the reason that we see few applications of rings in physics is not that there are none. It's that we haven't explored it well enough yet.

I am going through this exact text book right now! That's so cool.

Great video! I really find it quite inspiring that you put have put down so much time and effort into learning abstract algebra and analysis despite not being fascinated by pure math or having to take it for a class. I don't really understand how you found the motivation to study without getting distracted.
I personally love pure math, and a lot of the time it doesn't take effort for me to sit down and work on it. But even though I hate to admit it I realize that I'll probably never in my life have the energy to sit down and try to learn how a biological cell works (even though that's one of the most fasciniating things in the universe), because my brain would rather watch youtube and I don't have the pressure of an exam to make me study.

Abstract algebra is very important to computer science-especially in its relation to category theory. Category theory might be something interesting for you to learn!

You are sooooo amazing!!! I wish i could do what you do. I always loved math but never had enough determination to stick through and just learn it. I'm so jealous!

Taking this class in the Fall, this video made me less anxious haha.

Lol your timing is impeccable, I just started the task of learning algebra from Dummit & Foote like 2 days ago

I came across this today, and surprisingly interested in it. I took Language, logic and discrete mathematics, and i see it bridges a little towards this. Definitely gonna self-learn it

When I listened that class, I understood the meaning with making images in my mind at first and then I studied the details. It was very fun for me.

Im taking a linear algebra course this summer and I've already taken a discrete math course so this seems like a fun thing to do this summer after I finish my condensed courses

As a math student , at first I HATED abstract algebra for how ,well, abstract it was. But step by step I grew to love Group Theory,then Ring theory, then Number theory..I never took the galois class since I focused more on applied math after the 3rd year but hell, if you like brain puzzle exercises I think these classes have some amazing proofs and exercises and will definitely strengthen your math logic

You are an inspiration, Zach :)

Just for example, at my undergrad, the course on abstract algebra (which covered groups, rings, and fields) was called "Group Theory and Introduction to Proof". It was a required course for math majors and directly followed the introductory calculus sequence.

I am really amazed by your dedication. I do like algebra, geometry and analysis, but I am not as dedicated as you are

Teach yourself some category theory and be amazed how interconnected mathematics is.

Dude you are on fire, I have deep respect that you are self learning all these advance math subjects. Even I want to study algebraic topology and Riemannian geometry. But Unlike you I take longer to Grasp the subject bit slow learner.

I just finished up my abstract algebra course in school- it looks like we only went up to Ch.11 (of your text book) in terms of topics covered. I might snag this book myself to brush up and study the rest of the topics!

All your impressions about Abstract Algebra are really impressions about Gallian's text. I would say this is one of the easier texts, in part because it underemphasizes vector space examples and overemphasizes number theory examples. I also learned Abstract Algebra from this text since I couldn't attend lecture due to a schedule conflict. It was easy to learn the basic ideas of Abstract Algebra. It is a good choice for a text if you don't have much in the way of prerequisite coursework. Also, the quotes are super fun.

Excellent post and explanation. Gallian's book is definitely one of the best abstract algebra books on the market.

Zach, what was your schedule when doing this book? Did you commit to a certain number of hours per day or per week, or a certain number of days per week? Did you sit down at a set time of day to do it? Were you working a job with regular hours?
I'm very interested in how you work a project like this or your previous "trips through the textbook", which is very long term but can be highly variable in page-to-page challenge level, into the rest of your life.
I recall in your real analysis project you discussed dealing with really intractable problems that could take hours of effort spread over days or weeks. But how do you keep up the discipline to return to the book day after day and not start letting it slip and eventually lose the continuity you need to finish?

abstract algebra feels like a deep dive in some really random common stuff you never tought about too much and suddenly DAMN, SOMETHING REALLY COOL

As someone who only has a high school level math ability, this video went way over my head 😅

To bound off what you said a bit in the intro of the video, I study mathematical physics and this was a required course. This tends to be especially useful when discussing quantum field theory or even just problems in condensed matter theory, like topological materials and the sort.

This book is lying around in my shelf, I should make time to read it

If you make more of such Pure Mathematics reviews, Imma gonna get a Masters in Mathematics

I’m doing a directed study in algebraic topology right now with my professor and he’s using that textbook as well. The lecture series by Pierre Albin pair very well with the study too, so consider checking those out.

I just finished my algebraic structures course, and I gotta say the class equation was kind of deep o.O. Other than that it was pretty manageable as you were saying, i might go back to revisit some of the stuff that i paid less attention to

I practically forget lots of stuff I learned on courses so going back on it through books is nice. Or studying something before course is nice. Relearning is great.

Physics Major here. In my university it was a required course sequence (Algebra 1 was basically the topics in your book. Algebra 2 was linear algebra---revisited. Algebra 3 was MORE linear algebra). Almost all physicists hated at the time. Then they took Quantum Mechanics and were like "OHHHH! So that is what that is!". Gotta say, one does come to appreciate motivational examples

Hi Zach, would it be possible if you gave a summary of the topics you have taught yourself up to now and the things you're planning on learning in the future as well as what order all these should be learnt in?

Brilliant man, thank you. X. ☺️🤗

That was my textbook! Gallian is one of the most accessible abstract algebra textbooks, and I always recommend it. Students who use Dummet & Foote or other in-depth textbooks tend to really struggle with the course. The thing I found most interesting about the course was how you could prove really basic facts like the uniqueness of identities or inverses, and how 0*x=0 for all x in any ring. It really just showed how fundamental the whole subject was.
One point of nitpick, being closed under the operation is more important for *sub*groups and *sub*rings. Groups and rings will actually be closed by definition, and typically when a text introduces a new group, it is just assumed the operation is closed. When proving the base operation is well-defined (which is only done for cosets in this text), closure is important to prove, but that is not done for the normal addition or multiplication of which we are familiar.

Gallian is a really nice book from what I’ve read, probably my favourite. Pinter is a pretty good book and cheap if you want a physical copy, and for my classes we used Judson’s text, which is a lot shorter but still covers most of the same topics and is still pretty good, and it’s a free pdf

10:25, constructible numbers, that's a concept I'd been looking for! Very interested. 😊

You should do a video on the book concrete mathematics by Knuth, Graham, and patashnik.

I wish you made this video a year ago when I took abstract, i struggled hard but made it out alive lol

im not even on abstract alegabra, only on precalc atm, but you make this stuff sound so intresting somehow

Thanks!

About to take my final for abstract in a week. I hate algebra but love analysis and this is the last course I need to graduate. Wish me luck

Thank you Sir, Im also learning high math from books without any background

4:08 This look a lot like Rubix Cube algorithms
6:20 Oh there we go

I had to learn how Galois fields (finite fields) work (and some related things) in about 1-2 weeks to optimize a combined cipher core and as an EE, they kinda broke me.
It is interesting and was able to directly see why it is useful but my timeframe was just way too short.

Omg! 😭😭 This class was torture. I took abstract algebra I and II 🤯 I was close to changing my major.

Abstract algebra is tightly related to type theory and category theory, a field that makes using computer data structures more composable. Its one of the pillars of typed lambda calculus.

Abstract álgebra is quite important in physics. Quantum mechanics deals with operators, hermitian matrices and that staff. In the Standard model, symmetries play a fundamental role in some particle Properties

I'm taking this next sem pog

Bruh, I always wondered what word the expression on your shirt meant and now that I know a bit of calculus, I finally get it 😂😂

These are your best videos.

Zack star, this is what I like about algebra it's easy and some drains your Brain but it's worth it.

That’s a nice video! Could you do a video explaning biomedical engineering/bioengineering please?

Nathan Jacobson's Basic Algebra I covers groups, rings and modules in its first three chapters in a very nice way

Just learned how particular solutions are cosets of homogenous solutions today in algebra. Blew my heckin mind. Also talked about how the n roots of 1 in the complex plane form a subgroup of the dihedral group, which is a subgroup of the permutation group. Life = changed

i don't know what it's like in the us, but i study CS and all those things except for vector spaces were in my Discrete Mathematics Exam(groups, rings,fields,modular arithmetic,proofs,and graph theory), while i also took another exam which is required for Physics Majors that is called Geometry(vector spaces, matrix, and so on)