Visualizing the Riemann zeta function and analytic continuation

Video Statistics and Information

Video

Captions Word Cloud

Reddit Comments

Skip to 9:35 for the best part.

👍︎︎ 1 👤︎︎ u/self-confidence 📅︎︎ Dec 12 2016 🗫︎ replies

His series on linear algebra was top notch too.

👍︎︎ 1 👤︎︎ u/rhapsblu 📅︎︎ Dec 13 2016 🗫︎ replies

Captions

The Riemann zeta function. This is one of those objects in modern math that a lot of you might have heard of, but which can be really difficult to understand. Don't worry, I'll explain that animation that you just saw in a few minutes. A lot of people know about this function because there's a one-million-dollar prize out for anyone who can figure out when it equals 0. An open problem known as the Riemann hypothesis. Some of you may have heard of it in the context of the divergent sum 1 + 2 + 3 + 4... on and on up to infinity. You see there's a sense in which the sum equals -1/12, which seems nonsensical if not obviously wrong. But a common way to define what this equation is actually saying uses the Riemann zeta function. But as any casual Math enthusiast who started to read into this knows its definition references this one idea called analytic continuation which has to do with complex-valued functions and this idea can be frustratingly opaque and unintuitive, so what I'd like to do here is just show you all what this zeta function actually looks like and to explain what this idea of analytic continuation is in a visual and more intuitive way. I'm assuming that you know about complex numbers and that you're comfortable working with them, and I'm tempted to say that you should know calculus since analytic continuation is all about derivatives but for the way I'm planning to present things I think you might actually be fine without that. So to jump right into it let's just define what this zeta function is for a given input where we commonly use the variable 's' the function is 1 over one to the 's' (which is always 1) + 1 over 2 to the 's' + 1 over 3 to the 's' + 1 over 4 to the 's' on and on and on summing up over all natural numbers. So for example let's say you plug in a value like : s = 2 you get 1 + (1 over 4) + (1 over 9) + 1/16 and as you keep adding more and more reciprocals of squares this just so happens to approach pi squared over 6 which is around 1.645 there's a very beautiful reason for why pi shows up here and I might do a video on a later date but that's just the tip of the iceberg for why this function is beautiful. You can do the same thing for other inputs 's' like three or four and sometimes you get other interesting values and so far everything feels pretty reasonable you're adding up smaller and smaller amounts and these sums approach some number... Great, no craziness here! Yet if you were to read about it you might see some people say that zeta of negative 1 equals -1/12 But looking at this infinite sum that doesn't make any sense... when you raise each term to the negative 1 flipping each fraction you get 1 + 2 + 3 + 4 on an on over all natural numbers and obviously that doesn't approach anything certainly not -1/12, right ? And, as any mercenary looking into the Riemann hypothesis knows this function is said to have trivial zeros at negative even numbers so for example that would mean that zeta of negative 2 = 0, but when you plug in -2 it gives you 1 + 4 + 9 + 16 on and on, which again obviously doesn't approach anything much less 0, right ? Well we'll get to negative values in a few minutes but for right now let's just say the only thing that seems reasonable this function only makes sense when 's' is greater than one which is when this sum converges so far it's simply not defined for other values. Now with that said Bernhard Riemann was somewhat of a father to complex analysis which is the study of functions that have complex numbers as inputs and outputs. So rather than just thinking about how this sum takes a number 's' on the real number line to another number on the real number line his main focus was on understanding what happens when you plug in a complex value for 's', so for example maybe instead of plugging in 2, you would plug in 2 + i now if you've never seen the idea of raising a number to the power of a complex value you can feel kind of strange at first because it no longer has anything to do with repeated multiplication but mathematicians found that there is a very nice and very natural way to extend the definition of exponents beyond their familiar territory of real numbers and into the realm of complex values. It's not super crucial to understand complex exponents for where I'm going with this video but I think it'll still be nice if we just summarize the gist of it here the basic idea is that when you write something like one half to the power of a complex number you split it up as one-half to the real part times one-half to the pure imaginary part we're good on one half to the real part there's no issues there but what about raising something to a pure imaginary number? Well the result is going to be some complex number on the unit circle in the complex plane as you let that pure imaginary input walk up and down the imaginary line the resulting output walks around that unit circle For a base like one half the output walks around the unit circle somewhat slowly but for a base that's farther away from one like 1/9 then as you let this input walk up and down the imaginary axis the corresponding output is going to walk around the unit circle more quickly. If you've never seen this and you're wondering what on earth this happens I've left a few links to good resources in the description for here i'm just going to move forward with the what without the why. The main takeaway is that when you raise something like 1/2 to the power of 2 + i which is one-half squared times one-half to the i that one-half to the i part is going to be on the unit circle meaning it has an absolute value of one. So when you multiply it it doesn't change the size of the number it just takes that one fourth and rotates at somewhere. So if you were to plug in 2 + i to the zeta function one way to think about what it does is to start off with all of the terms raised to the power of 2 which you can think of is piecing together lines whose length of the reciprocals of squares of numbers which like I said before converges to pi² over six then when you change that input from two up 2 + i each of these lines gets rotated by some amount but importantly the lengths of those lines won't change so the sum still converges it just does so in a spiral to some specific point on the complex plane. Here let me show what it looks like when I vary the input is represented with this yellow dot on the complex plane where this spiral sum is always going to be showing the converging value for zeta of s what this means is that zeta(s) defined as this infinite sum is a perfectly reasonable complex function as long as the real part of the input is greater than one meaning the input 's' sits somewhere on this right half of the complex plane again this is because it's the real part of s that determines the size of each number while the imaginary part just dictate some rotation. So now what I want to do is visualize this function it takes in inputs on the right half of the complex plane and spits out outputs somewhere else in the complex plane a super nice way to understand complex functions is to visualize them as transformations meaning you look at every possible input to the function and just let it move over to the corresponding output... for example let's take a moment and try to visualize something a little bit easier than the zeta function : say f(s) = s² When you plug in s = 2 you get 4 so we'll end up moving that point at two over to the point at four when you plug in -1 you get 1 so the point over here at negative 1 is going to end up moving over to the point at 1. When you plug in i by definition its square is -1 so it's going to move over here to negative 1 now I'm going to add on a more colorful grid and this is just because things are about to start moving and it's kind of nice to have something to distinguish grid lines during that movement. From here I'll tell the computer to move every single point on this grid over to its corresponding output under the function f(s) = s² Here's what it looks like I can be a lot to take in so I'll go ahead and play it again and this time focus on one of the marked points and notice how it moves over to the point corresponding to its square. It can be a little complicated to see all of the points moving all at once but the reward is that this gives us a very rich picture for what the complex function is actually doing and it all happens in just two dimensions... so back to the zeta function we have this infinite sum which is a function of some complex number s and we feel good and happy about plugging in values of s whose real part is greater than one and getting some meaningful output via the converging spiral cell so to visualize this function i'm going to take the portion of the grid sitting on the right side of the complex plane here where the real part of numbers is greater than one and I'm gonna tell the computer to move each point of this grid to the appropriate output it actually helps if I add a few more grid lines around the number one since that region gets stretched out by quite a bit alright so first of all let's just appreciate how beautiful that is I mean damn that doesn't make you want to learn more about complex functions you have no heart. But also this transformed grid is just begging to be extended a little bit for example let's highlight these lines here which represent all of the complex numbers with imaginary part i or -i after the transformation these lines make such lovely arcs before they just abruptly stopped don't you want to just you know continue those arcs in fact you can imagine how some altered version of the function with the definition that extends into this left half of the plane might be able to complete this picture with something that's quite pretty well this is exactly what mathematicians working with complex functions do! They continue the function beyond the original domain where was defined now as soon as we branch over into inputs where the real part is less than 1 this infinite sum that we originally used to define the function doesn't make sense anymore you'll get nonsense like adding 1 + 2 + 3 + 4 on a non up to infinity But just looking at this transformed version of the right half of the plane where the some does make sense it's just begging us to extend the set of points that were considering as inputs even if that means defining the extended function in some way that doesn't necessarily use that sum of course that leaves us with the question how would you define that function on the rest of the plane? You might think that you could extend it any number of ways maybe you define an extension that makes it so the point at say... s = -1 moves over to -1/12 but maybe you squiggle on some extension that makes it land on any other value I mean as soon as you open yourself up to the idea of defining the function differently for values outside that domain of convergence that is not based on this infinite sum the world is your oyster and you can have any number of extensions right? Well not exactly I mean yes you can give any child a marker and have them extend these lines any which way but if you add on the restriction that this new extended function has to have a derivative everywhere it locks us into one and only one possible extension I know I know... I said that you wouldn't need to know about derivatives for this video and even if you do know calculus maybe you have yet to learn how to interpret derivatives for complex functions but luckily for us there is a very nice geometric intuition that you can keep in mind for when I say a phrase like has a derivative everywhere here to show you what I mean let's look back at that f(s) = s² example again we think of this function as a transformation moving every point s of the complex plane over to the point s² for those of you who know calculus you know that you can take the derivative of this function at any given input but there's an interesting property of that transformation that turns out to be related and almost equivalent to that fact if you look at any two lines in the input space that intersect at some angle and consider what they turn into after the transformation they will still intersect each other at that same angle. The lines might get curved and that's okay but the important part is that the angle at which they intersect remains unchanged and this is true for any pair of lines that you choose! So when I say a function has a derivative everywhere I want you to think about this angle preserving property that anytime two lines intersect the angle between them remains unchanged after the transformation at a glance this is easiest to appreciate by noticing how all of the curves that the gridlines turn into still intersect each other at right angles. Complex functions that have a derivative everywhere are called analytic so you can think of this term analytic as meaning angle preserving admittedly i'm lying to a little here but only a little bit a slight caveat for those of you who want the full details is that inputs where the derivative of a function is 0 instead of angle being preserved they get multiplied by some integer, but those points are by far the minority and for almost all inputs to an analytic function angles are preserved so when I say analytic you think angle preserving I think that's a fine intuition to have now if you think about it for a moment and this is the point that i really want you to appreciate this is a very restrictive property the angle between any pair of intersecting lines has to remain unchanged and yet pretty much any function out there that has a name turns out to be analytic the field of complex analysis which Riemann helped to establish in its modern form is almost entirely about leveraging the properties of analytic functions to understand results in patterns and other fields of math and science. The zeta function defined by this infinite sum on the right half of the plane is an analytic function notice how all of these curves that the gridlines turn into still intersect each other at right angles so the surprising fact about complex functions is that if you want to extend an analytic function beyond the domain where was originally defined for example extending this zeta function into the left half of the plane then if you require that the new extended function still be analytic that is that it still preserves angles everywhere it forces you into only one possible extension if one exists at all it's kind of like an infinite continuous jigsaw puzzle for this requirement of preserving angles walks you into one and only one choice for how to extend it this process of extending an analytic function in the only way possible that still analytic is called as you may have guessed "analytic continuation" so that's how the full Riemann's zeta function is defined for values of s on the right half of the plane where the real part is greater than one just plug them into this sum and see where it converges and that convergence might look like some kind of spiral since raising each of these terms to a complex power has the effect of rotating each one then for the rest of the plane we know that there exists one and only one way to extend this definition so that the function will still be analytic that is so that it still preserves angles at every single point so we just say that by definition the zeta function on the left half of the plane is whatever that extension happens to be and that's a valid definition because there's only one possible analytic continuation notice that's a very implicit definition it just says use the solution of this jigsaw puzzle which through more abstract derivation we know must exist but it doesn't specify exactly how to solve it mathematicians have a pretty good grasp on what this extension looks like but some important parts of that remain a mystery a million-dollar mystery in fact let's actually take a moment and talk about the Riemann hypothesis the million-dollar problem the places where this function equals zero turn out to be quite important that is which points get mapped onto the origin after the transformation one thing we know about this extension is that the negative even numbers get map to 0 these are commonly called the trivial zeros the name here stems from a long-standing tradition of mathematicians to call things trivial when they understand quite well even when it's a fact that is not at all obvious from the outset we also know that the rest of the points that get map to 0 sit somewhere in this vertical strip called the critical strip and the specific placement of those non-trivial zeros encodes a surprising information about prime numbers it's actually pretty interesting why this function carry so much information about primes and I definitely think i'll make a video about that later on but right now things are long enough so I'll leave it unexplained Riemann hypothesized that all of these non-trivial zeros sit right in the middle of the strip on the line of numbers s who's real part is one-half this is called the critical line if that's true it gives us a remarkably tight grasp on the pattern of prime numbers as well as many other patterns in math stem from this now so far when I shown what the zeta function looks like I've only shown what it does to the portion of the grid on the screen and that kind of under sells its complexity so if I were to highlight this critical line and apply the transformation it might not seem to cross the origin at all however use with the transformed version of more and more of that line looks like notice how its passing through the number zero many many times if you can prove that all of the non-trivial zeros sit somewhere on this line the clay math Institute gives you 1 million dollars and you'd also be proving hundreds if not thousands of modern math results that have already been shown contingent on this hypothesis being true another thing we know about this extended function is that map's the point -1 over to negative -1/12 and if you plug this into the original sum it looks like we're saying 1 + 2 + 3 + 4 on and on up to infinity equals -1/12 now they might seem disingenuous to still call this is a sum since the definition of the zeta function on the left half of the plane is not defined directly from this sum instead it comes from analytically continuing this own beyond the domain where it converges that is solving the jigsaw puzzle that began on the right half of the plane that said you have to admit that the uniqueness of this analytic continuation the fact that the jigsaw puzzle has only one solution is very suggestive of some intrinsic connection between these extended values and the original sum the last animation and this is actually pretty cool i'm going to show you guys what the derivative of the zeta function looks like but before that it matters to me to let you guys know who's making these videos possible first and foremost there's the viewers like you supporting directly on patreon and this particular video was also supported in part by audible.com which provides audio books and other audio materials actually use audible almost every day and I have for a while now if you don't already have listening to literature as one of your habits whether that's why you're commuting or jogging or cooking or whatever it can be a real life-changer one particularly good book that i recently listen to is the art of learning by Josh Waitzkin which I got due to a very emphatic recommendation of my brother and it's one that I think you guys would like a lot Josh Waitzkin the author was a national chess champion throughout his childhood and later in life he took up the martial art tai-chi-chuan and became a world champion in just a few years so the man knows what it takes to learn and I found a lot of what he says about chest and taichi translates pretty meaningfully to learning math as well especially what he says about starting with the endgame you can listen to the art of learning or any other audio book for free by visiting audible.com/3blue1brown going to that URL gives you a one month free trial and it lets audible know that you came from me which encourages them to support future videos like this one again it's a product i've used for a while now and it's one that i am more than happy to recommend alright here's that final animation what the derivative of the zeta function looks like

Info

Channel: 3Blue1Brown

Views: 2,994,629

Rating: 4.9482465 out of 5

Keywords: analytic continuation, complex analysis, three brown one blue, zeta function, Riemann hypothesis, three, mathematics, Riemann zeta function, math, brown, 3 brown 1 blue, 3b1b, Riemann, blue, 3brown1blue, one

Id: sD0NjbwqlYw

Channel Id: undefined

Length: 20min 28sec (1228 seconds)

Published: Fri Dec 09 2016