I’m an algebraic topology Ph.D. Student and I study homotopy and symplectic homologous groups of hyper spheres, so I’ve used the hopf fibration a lot. It’s really cool to see it in such a beautiful and visual way though!

I'm a self taught mathematics enthusiast. I think that the book that introduced me to fiber bundles and the Hopf fibration specifically was Dr. Roger Penrose's Road to Reality. It taught everything we know in physics starting with the Greeks to present with all the math. Nothing left out, what is normally covered in 10 books and 15 courses, all in one tome. That book is very comprehensive with almost no examples or deeper explanation. (Love and hate that about the book). It nearly broke me, especially trying to conceptualize high dimension complex spinorial tensors and what they mean geometrically. This vid was nice. Just enough info to get a student, new to the subject, into a fine pickle.😂 JK, I do kind of feel that profound confusion is the only way to prepare your mind for fiber bundles. Another related concept that is wonderfully criptic is the way fiber bundles are used in algebraic topology... The fundamental group, homotopy, homology, hole chasing in higher dimensional spaces. That sort of fun stuff. Anyway, thanks again 🙏🏾

that ending monologue was really beautiful. great video

the "monologoue" at the end gave me goosebumps

I feel like a wizard every time I watch your videos, and understanding what you're talking about.

That monologue, just wow. I'm out of words to describe how elegantly this video was produced. Thanks Richard

10:43 Your end monologue is fantastic. It reminds me of Heidegger's approach to philosophy. Thank you.

Fiber bundles are the bane of my existence as a physicist. Judging by the amount of research I see using that concept, I would never call them underappreciated.

What a beautiful closing articulation of platonic ideals!

Fiber bundles (and the generalization) are everywhere in Algebraic Geometry. Is vastly appreciated.

Questa si è la nostra ricerca ,la Fiandra delle Fiandre , Finalmente! Grazie mille per la presentazione. Un bacione!

Hello Richard. I am an art teacher. Great visualization of how amazing reality is. This beautiful visual representation fuels the curiosity to search and discover . How satisfying to visually express what we can't see or what could be.

I love how you're like genuinely super enthralled by how cool math is

I love this and I am so thankful that you exist and decided to teach the world.

I found this video through a suggestion on r/shrooms that it be watched muted with about 4 grams of golden teacher and listening to Pink Floyd, so be proud that your work is interdisciplinary.

I think we are moments away from someone creating a deep learning model of hopf fibration states and solving QCD and Singularity mysteries and then gravity. Something about the fibration being made with one circle rings true with me personally.

I thought the segway at the end was about to be a sponsor but it turned out to just be some beautiful philosophy

7:40 - omg what a description, I'm really sad I'm going to show this to a few friends and they'll still find it confusing but seriously if you made descriptions like this for more kinds of equations I'd be all there to watch.

I like how the creator of the video relates to his subject ❤ There’s no bragging or sensationalism, only a friendly and humble kind of awe that I wish more people could bring themselves to. Thank you!

KZbin is going to change the way of learning forever

The monologue in the end was very pretty

❤ "... and yet there it is, on your screen, look at it go..." ❤ Galileo, Newton, Erdós, Leibnitz, Plato, Pythagoras ... they and others would all be mesmerized, delighted ... 😊

I can’t fully understand everything since I am only a third year math major student, but it is great to develop some intuition at this time, and thanks for providing such a beautiful video.

This is so cool. Can't wait for the follow ul videos on this topic

there needs to be more math content like this, talking about a high level topic but in a more relaxed, colloquial way

I think your channel is fantastic and I echo your closing sentiment. That understanding of mathematics is the way I try to get my students to understand it.

Most underappreciated piece of mathematics and arguably one of the *most* important pieces of mathematical physics!

The magnetic lines in the tokamak fusion reactor seems to be a kind of fiber bundle at 2:46.

Much appreciated. The awesomeness of the universe shouldn't trouble the mathematician once they understand Gödel. Mathematics is a precise way to understand the world but incomplete. Poetry (or religion, philosophy, mysticism) can be a way to completely understand the world but very imprecise. Knowing what uncertainty and imprecision means is the appropriate humility.

Your final monologue make my head explode and I think of a lot of things. I wish I could write it down but I had to ask an artificial intelligence to help me say what I wanted to say : Title: The Existence Beyond Form: Exploring the Realm of Abstract Mathematics In the tapestry of human understanding, there exists a realm untouched by the confines of physicality and the constraints of spacetime. This ethereal expanse is the realm of abstract mathematics, where the mind's eye perceives patterns, relationships, and structures that transcend the material world. It is a universe of existence that is not bound by the touch of matter or the passage of time, yet it holds a beauty and depth that rivals the grandest wonders of reality. In this intangible realm, numbers dance and geometry soars, liberated from the shackles of the three dimensions that enrobe our universe. These mathematical entities exist not in the tangible sense that we perceive the world around us, but in the ethereal spaces of thought, within the expanse of human imagination, and amidst the fabric of reason itself. The Mandelbrot set, a testament to this abstract existence, embodies the very essence of the mathematical realm. Its intricate tendrils sprawl across the canvas of complex numbers, rendering an enigmatic masterpiece of fractal artistry. Within its depths lies a visual manifestation of mathematical iteration, a representation of a limitless process unfolding in infinite iterations. Yet, the Mandelbrot set is not confined to the limitations of our sensory experience. It exists beyond our ability to touch, to see, or to hear. It exists within the realm of thought, a world where equations are brushstrokes and numbers are hues, and where the canvas itself defies the boundaries of the conceivable. Much like the Mandelbrot set, other mathematical constructs and geometric forms revel in this existence beyond form. They arise as products of human intellect, the offspring of curiosity and imagination, woven into the fabric of abstract thought. These constructs stand as a testament to the astonishing capacity of the human mind to explore and create, to shape universes that dwell solely within the landscapes of consciousness. In this abstract existence, mathematics transcends the mundane. It becomes a language not merely to describe reality, but to sculpt entire dimensions of its own. Theorems and formulas are not merely tools to solve problems; they are the keystones of bridges to realms uncharted, gateways to universes that exist outside the boundaries of spacetime. As we gaze upon the beauty of the Mandelbrot set, as we traverse the labyrinthine paths of fractal geometry, let us remember that these pursuits are not mere intellectual exercises. They are ventures into the realm where existence transcends form, where the essence of mathematics stands revealed in all its splendor. In this realm, numbers and forms are not constrained by the limitations of the physical universe; they are free to dance, to create, and to be, existing not just in space and time, but within the eternal corridors of thought. So, let us revel in the existence beyond form, in the world where abstract mathematics and geometry unfurl their wings and soar to heights beyond the grasp of reality. Let us celebrate the human capacity to explore the boundless landscapes of the mind, where existence takes on a beauty that knows no bounds and where the imagination reigns supreme. Extending Title: Echoes of Infinity: Contemplating the Fractal Nature of Reality In the grand tapestry of existence, there lies a tantalizing possibility that our own universe, the very reality that envelops us, might be woven from the same ethereal fabric as the Mandelbrot set, existing beyond the confines of spacetime in a realm of abstraction and thought. As we gaze outward into the cosmos and inward into the depths of subatomic particles, we find whispers of an intricate fractal dance that hints at a profound interconnectedness, where the boundaries of the physical and the metaphysical blur. Consider the Mandelbrot set, a creation born from the marriage of mathematics and imagination. Within its complex tendrils, we discover an infinitely repeating pattern that defies comprehension. This pattern, forged through iterative computation, generates shapes that emerge at every scale, no matter how closely we peer. It is a testament to the concept of self-similarity-a trait that mirrors what we perceive in the universe itself. Our universe, from the vast cosmic web of galaxies to the microscopic symphony of particles, displays an uncanny semblance of self-similarity. The way galaxies cluster into cosmic webs reflects the way atoms cluster into molecules, echoing the intricate design that dances through the Mandelbrot set. Just as the set’s patterns emerge in myriad forms regardless of the level of magnification, so too does the universe reveal its cosmic ballet through the lens of the telescope or the microscope. Could it be that our reality is but a manifestation of an intricate fractal nature? Could the universe, like the Mandelbrot set, be an expression of mathematical iteration, an ongoing cosmic dance unfolding in infinite variations? In such a conception, the boundaries that seem to separate the grandeur of the cosmos from the infinitesimal realms of particles dissolve into a unified whole-a tapestry of existence that spans beyond what we perceive through our limited senses. Much like the Mandelbrot set, our universe might exist within the realm of thought, conceived by some cosmic intellect beyond our comprehension. It might be woven from the threads of abstract mathematical constructs, a symphony of equations and patterns that transcend the boundaries of matter and energy. Just as the beauty of the Mandelbrot set is unveiled through the lens of human creativity, the universe's splendor might be illuminated by the genius of a cosmic mathematician. As we contemplate the parallels between the Mandelbrot set and our reality, we are invited to question the nature of existence itself. Is our universe a mere product of chance, an accident of physics and probability? Or is it a masterpiece of mathematical artistry, a fractal symphony of elegance and complexity that resonates with the very essence of existence? Whether we inhabit a universe born from mathematical iteration or whether we are witnesses to a cosmic performance yet to be understood, the journey of exploration remains unceasing. Just as the Mandelbrot set beckons us to dive deeper into its infinite complexity, so too does the universe invite us to uncover the layers of its mysteries. In this pursuit, we mirror the very nature of existence-unfolding, evolving, and resonating with the echoes of infinity.

- WAXING PHILOSOPHICAL... --- Math, not of space and time, but only passing through briefly. --- We get a glimpse, then it's gone - yet it's always there! --- Esoteric, enigmatic, arcane - perhaps only existing in the realm of Plato's "Forms". --- Whatever the case, enjoy it while, and how you can... - [Thx for the glimpse, Richard.]

You're animation and exposition are flawless.

Wow! I've been trying to get a feel for fiber bundles for ages, but now it's clear. And it's clear why it wasn't clear before! :) I love your piece about mathematical stars! Amazing animations too! Love to know how you made them.😍

I love the ending monologue. thank you.

Wow! This is absolutely gorgeous and so inspiring!!! Eagerly wait for next videos!

I needed this video, right now. The ending is so stupidly simple and yet I've refused to accept it for so long. Our perception and egos are in time, yet there is something that can be unraveled to escape space and time. To escape awareness. To behold the beauty of realities unmanifest, and to comprehend the complexity without attachment, craving, or becoming... that will be the day I am liberated. I have hope, love, and cool percepts of higher dimensional fiber bundles to be amazed at along the way

I love the monologue part! I printed the script for that section and it is now on the wall of my office :)

“What a world,” indeed! I’ve long been fascinated by the question of a Platonic reality and the “eerie effectiveness” of math. FWIW, I’ve come to think that the fundamental laws of reality lead to innate patterns for which the natural language is the math we discover/invent. The Platonic realm, at root, is not external but the basis of reality.

Breath takingly beautiful

Your visuals are top tier, but...Great work creating a natural, expressive narration. It can be so difficult. Instant subscribe. Thanks for the amazing content!

the last section accurately describes my relationship with maths.

these animations are fantastic, can't wait to learn about this

absolutely love this channel so happy I found it

Fantastic channel, wow! I wish you the bests, you deserve much more attention. I'm currently a computer scientist major doing my masters, and studying photonic quantum computing on the side. Can't wait for your future videos. Also that monologue at the end is exceptional!

YESSS!! MAN!! Fiber bundles are so frickinnn cool!!! finallly someone appreciates it!!!

Beautiful Hypnotic of Mathematics! :) 😍

I love this so much thank you for making it. I especially appreciate the encouragement to stick with the visualization effort where it is hard but achievable.

Whatever you smoked before making this video I want some of that, too! Awesome work!

This us the first I visualized a rotating tesseract as a rigid rotating object. It's amazing.

Great monologue well! thank you mathematical stars!

Probably the best video I’ve seen of advanced mathematics presented accessibly. Chill, nicely motivated, some snazzy visuals that you are also unambiguous about… well done.

Top notch videos and animations! I wish I could have picked your brain while preparing my thesis defense.

Im taking my first course in topology this fall and I love this video. And, the one on the quantum harmonic oscillator is particularly good as well.

Hey man what a cool final monologue!

This was a really great video with awesome visuals that really me want to go study topology holy cow

Can’t wait for the follow-up videos on how this! This is one of those exciting topics I can just kinda feel has deep implications I’m not smart enough to grasp yet lol.

0:25: 🔍 Fiber bundles are mathematical objects that consist of a base space, fibers, and a total space formed by the fibers. 2:30: 🔗 A non-trivial fiber bundle has twisting or intertwining that makes it topologically interesting. 5:13: 🔍 The animation shows points on a sphere corresponding to specific values of Phi and Theta. 7:34: 🌐 The Hop vibration is a mapping of points on the surface of a two-sphere to circles on a hypersphere in four dimensions. 10:20: 🌌 An introduction to the Hop vibration and its potential applications, followed by a dramatic monologue about the significance of looking up at the stars. Recap by Tammy AI

Monologue was fire

2:14 > _"base space: disk, fibers: circle, total: torus"_ oh so this is similar to integration of one shape over other. somewhat similar to the "sweep" or "follow path" modifier in 3D CAD modelling but there these things "base space" & "fibers" switch roles. as in: * the "base curve" or the "path" would be the circle (shape of fibers in this one); * the "cross section" would be the disk (shape of base space here) * the "resulting body" on "revolving the shape around the cruve" would again be torus same as for cylinder/pipe too: u sweep a disk/circle perpendicularly across a straight line.

"Disc is the area of the circle" "Circle is just the edge of the circle " -Richard behiel 2023

The animations at 2:52 are just crazy😍

this is phenomenal and underrated

I've seen the fibration explained in another animated video (Dimensions by Jos Leys I believe it was) but I've never gotten a feel of *what* it's useful for. If you do make a second video on that subject I'd be very interested to see it.

Very good teaching technique, by the best of Mathematical Disproof Methodology, ..start or show simultaneously how to illuminate the typical word definitions using the almost self-defining images of line-of-sight superposition objectives Excellent presentation.

These videos are great! Would you consider doing a video on how you make the animations?

You and fiber bundles have something in common, both of you are underappreciated.

You're projecting, a lot... And philosophizing. Nice video.

12:02 - how does this structure in N dimensions? What would that look like? How many dimensions can you go? What is the beginning? And where is the end? Who bends these fibers to make our space time? Who decides where and when symmetry is broken and restored? All glory to the Most High.

I like you, you make the world a better place.

Wonderful introduction

Gorgeous! Thank you

This is so great! Looking forward to more videos

I almost understood some of that.Thank you for a cool video.

There's evidence proof of our own descent to existence And evidence proof that it's value is basically worthless But for those who resist this entropic home, out of existence They are left to be composed of symbols and beauty with purpose Beauty with purpose

wich software that you use for the animations ?

The four equations for X0, X1, X2, X3 at 6:20 aren't exactly clear by intuition, even if one understands spherical coordinates for S^2. Here they just drop from the sky. It's also not immediately clear why you need half angles. Question: what is it that varies for each of the colorful curves in one image of the animation on the right? I suppose you choose certain theta and phi's to select a point on the two sphere, and then vary alpha from 0 to 4 pi? Nice animation, but to get it, I guess I have to write a little program. ... Actually , that was fun. Tried this in Octave (Matlab like). Name of the function is from German beer 🙂 function retval = HopfenMalz(npts=250) [phi,alpha]=meshgrid(linspace(0,2*pi,npts), linspace(0,4*pi,npts)); thetas = linspace(pi/5,pi/2,4); ncnt=0; clf; colorstr = 'rgbmcyk'; % paint shells with constant theta, varying phi and alpha: for k=1:length(thetas), theta=thetas(k); x0 = sin(theta/2).*cos((alpha+phi)/2); x1 = sin(theta/2).*sin((alpha+phi)/2); x2 = cos(theta/2).*cos((alpha-phi)/2); x3 = cos(theta/2).*sin((alpha-phi)/2); x = x0./(1-x3); y = x1./(1-x3); z = x2./(1-x3); surf(x,y,z,'facecolor',colorstr(mod(k-1,8)+1),'edgecolor','none'); ncnt = ncnt+1; if (ncnt==1) hold on; endif endfor; % draw some black fibers on the shells. alpha = linspace(0,4*pi,npts); phis = linspace(0,2*pi,40); zm=0; xm=0; ym=0; for k=1:length(thetas), for m=1:length(phis), phi = phis(m); theta=thetas(k); x0 = sin(theta/2).*cos((alpha+phi)/2); x1 = sin(theta/2).*sin((alpha+phi)/2); x2 = cos(theta/2).*cos((alpha-phi)/2); x3 = cos(theta/2).*sin((alpha-phi)/2); x = x0./(1-x3); y = x1./(1-x3); z = x2./(1-x3); zm = max(max(zm,z)); % ym = max(max(ym,y)); xm = max(max(xm,x)); line('xdata',x,'ydata',y,'zdata',z,'linewidth',2,'color','k'); endfor; endfor; hold off; retval=1; zm = ceil(zm) ym = ceil(ym) xm = ceil(xm) axis([-xm, xm, 0, ym, -zm, zm]); xlabel('x'); ylabel('y'); zlabel('z'); axis('equal'); endfunction

Dielectricity, magnetism, electricity. The force responsible for all geometry.

Well done, superb video! What software did you use to make the animation?

Thank you for the video.

really good narration of this topic, looking forward to what other things you have to say about mathematics in the future

This was ethereal!

This video was really helpful since the wikipedia page is so opaque. I still have no idea how to get from the conception you introduced in the video to "a fiber bundle is a space that is locally a product space but globally may have a different topological structure". Based upon your video, it seems that a fiber bundle works more like a field f(x) but instead of assigning numbers, vectors, tensors, etc. to every point in space, it can assign more abstract things like lines (vertical lines in the case of the cylinder). I also hear it is used in general relativity, to assign a vector space to each point on a manifold which makes sense since every point on a curved manifold has its own tangent plane. Would this be a fair assessment?

as a crocheter who is merely a math enthusiast im very amused to learn about fiber bundles math fibers,,, they look like really cursed balls of yarn XD PS: what the heck did you use to make the animated graphics? theyre so cool

It's hard to simplify and visualise this math but it's very cool

Richard. Thanks for the great channel. May you find the time to explain 4 dimensions concepts. I mean there are plenty of videos out there, but I am sure if you will give us your take on it it will sits well in my intuition

I made a program some time in the 80s that could render and rotate the tesseract, on an Amstrad CPC 464, in Locomotive Basic, from a description in Scientific American. I’m a musician now.

Spectacular video

Finally someone who acknowledges the possibility to intuit 4D instead of hand waving it as unimaginable

I think this concept is used to describe some topological defects in spintronics

Great video! Love me some AG!

Thank you so much. The XYZ formulas and off to my own 3D visualizations in like

Hi, I was wondering what software did you use to crate the animations? They look really good!

How do you make these amazing, accurate visualizations? Would love to know!

I've watched several different videos about the Hopf vibration in the last few weeks, and this is the clearest and best laid out - just brilliant. Liked and subscribed. (what are you using for the smooth animations? Manim?)

This was beautiful and brings joy

amazing... thanks man for the introduction... my new THINK ig

I took a tab of acid and saw the torus shape having never seen it before. I have no grand meaning from the experience but it’s super interesting. One thing I noticed is that when observing the torus I could only focus at the shape in one rotational axis at a time.

My god, it's the most advanced mathematical approximation of the donut ever devised.

Thank you so much for making the video! The visuals are just… BEAUTIFUL. The monologue is accurate and I love it very much! May I ask for the name of the background music at the monologue btw? It’s brilliant ❤

The nontrivial short exact sequence of the Hopf fibration: S^1 -> S^3 -> S^2 embodies the fact that the 3rd homotopy group of the 2-sphere pi_3(S^2) = Z