Geometric Algebra in 2D - Fundamentals and Another Look at Complex Numbers

+Anon Ymous
Like in other aspects in life, people are set in their ways after a certain age and won't change drastically, which is why opinion on large issues only changes as quickly as the sum of the rate of those of the newer opinion populating academia and those of the older opinion retiring. Yes, oftentimes you will find amateurs such as myself more enthusiastic about GA than the experts, and you will often find people on, e.g. blogs or Math Stackexchange, dismissing our appreciation for this branch of math as disproportionate, but there's never any argument backing it up other than _this is what the experts in our lifetime just so happen to be doing_ and invective, neither of which have anything to do with truth or wisdom or proper pedagogy.
Perhaps you could look into the corpus of David Hestenes, since he's written a book entitled _New Foundations for Classical Mechanics_ or if this isn't what you were thinking about, this might be an interesting project.

The problem with Geometric Algebra is a bit more subtle. All the books neatly avoid the simple act of JUST CALCULATE THE DAMN PRODUCT!!! If you spell out every vector/bivector/trivector/scalar... you find that there are 2n components for every multivector. Multiplying two multivectors, using a bit notation for the presence of a unit vector. say that e1 == e_001, e2 == e_010, e2e1 == e_011, e3 == e_100, etc. So, general multivector multiplication has NO pre-requisites, because it's just distribution. (a b) = (a_00 e_00 + a_01 e _01 + a_10 e_10 + a_11 e_11)(b_00 e_00 + b_01 e_01 + b_10 e_10 + b_11 e_11) ... after this is distributed, you cancel out parallel basis vectors and sort orthogonal vectors and negate for every swap required to sort them into a canonical order. When done this way, special products (dot, wedge, cross, reversion, leftcontract, rightcontract, etc) are already CALCULATED for you; and you don't necessarily need to know them.
Start with this CALCULATION of Geometric product first. Only split it into its cos/sin parts later. If this is done, then it doesn't suddenly become complicated when you get beyond R3.

note that (a b) takes O(2^(2n)) operations when you do it in the brute-force definition method, which even ignores the complexity of sorting the orthogonal basis vectors before adding them (to find the sign). This is a big issue with Geometric Algebra. With GA, you really need a smart compiler to do non-trivial things with it.

@Mathoma, is there a closed form for calculating the sign when using the bit notation? It is a simple xor to figure out where the operands are destined for. ... ie: (e_011 e_110) will write into e_101 because (011 xor 110). (e_011 e_110) == (e2 e1 e3 e2) ... i only can figure how how many swaps it takes by literally expanding the orthogonal vectors and counting how many swaps it takes to put it in order.

@@robfielding8566 Chris Doran has an interesting talk about implementing GA in Haskell at geometry.mrao.cam.ac.uk/wp-content/uploads/2017/10/HaskellExchangeGA.pptx . His swapping count algorithm is pretty neat though still enumerating all swappings. He encountered the same problems of complexity of computation as you but Haskell heavy lifting hides it.

Question how you can insult these algebras as random since randomness implies lack of care.

Apologies. That was a sociological comment on purely mathematical consistancies. An amusing cosmological joke is whether the maths of analysing the inanimate can be applied to sociologically changing frameworks. The invariable factors on which to base an analysis have yet to be defined.

If you need an approach to understanding of sociological expressions and their common roots, try concept analysis using the various definitions from various dictionaries in a concept analysis approach. This can be attempted with topological algebra but I dare not go there since they may make mind bombs out of it.

+processing
Yes, it's a very nice branch of math and isn't difficult to learn especially if you have some experience with linear algebra.

+Nick Okamoto
I actually read that paper just a few days ago, it's funny you mentioned it. Hestenes is a lot of fun to read, as there's a polemical quality to the writing in addition to straight-up math. Another fun paper is the "Mathematical viruses" one because I think I've unfortunately been infected with the "coordinate virus". But, what can I do? I may as well let the virus take its course and build my immunity.

Ah yes, I really enjoyed that paper too. I asked Hestenes about it at a GA conference a few years ago, and he said that article started as a tongue-in-cheek response to critical remarks made by another mathematician (as mentioned in the acknowledgement section at the end of the paper), but I don't recall what the criticism was about. Though it's presented in a humorous tone, I also found the "Mathematical Viruses" paper to be very enlightening.

Mathoma What do you mean by “coordinate virus”? I understand it’s probably meant as a joke, I’m just not sure what you’re getting at specifically

@@raydencreed1524 Well, according to Hestenes, the "coordinate virus" is the fact that many students (and others) imagine vectors as lists of coordinates. In geometric algebra, vectors are treated as geometric objects, as well as bivectors and many other elements. Coordinates are not important. Here is a nice example. We use the Pauli matrices in physics, but they are just 2x2 matrix representation of 3D Euclidean geometric algebra. This means that we can formulate quantum mechanics using vectors, without need for the imaginary unit.

Miroslav Josipović That’s what I was thinking they meant, but it’s good to be sure. Thanks for taking the time to explain that.

+Clove Cinnamon
You're welcome. If you've been watching my quaternion stuff, you'll see that a lot carries over into the geometric algebra of 3D, really because the quaternions live inside G(R^3) and are bivectors.

I second that thought. Schools might start teaching GA once teachers have more freedom (eliminate exams I say! Do journal portfolio assessments instead. Free-up both teachers and students.) But this is not even half of it... please check out the work of the Canadian physicist Cohl Furey (arxiv.org/pdf/1611.09182.pdf), who has used Clifford Algebra to retrieve almost all the symmetries of the standard model of particle physics. So, the algebra of spacetime gives us almost for free the standard model. How? Partly it is because spacetime algebra is just an encoding of the geometry of spacetime. But what about all that complexity in gauge theory and Feynman diagrams etc, surely that can't all just be simple geometry? Well, maybe not, but mix in some topology (wormholes) and you probably have ingredients for explaining most of the particles in physics. Also, Nima Arkani-Hamed has shown a simpler geometric structure dubbed the Amplituhedron can replace Feynman diagrams. And Leonard Susskind has shown how quantum entanglement is really just a wormhole bridge. So a lot of physics looks like it is reducing to geometry. If this pans out, then I think physicists will almost be forced to start ditching Gibbs' vector algebra and start working with Clifford's GA.

Well, this was a very nice objection. Geometric algebra unifies mathematics, brings clarity and geometric intuition. It should be introduced in high-school programs, but we have a problem that it is hard to bring geometric algebra to universities. But there is no doubt, it will prevail, due to its power.

+anthonysegers01
I try to be subtle.

Which conference paper was it?

+Mrbillybobcorndog
Well, if you have any questions, feel free to ask. I may not have all the answers but it's fun talking about these topics. Hopefully my videos occasionally make some sense.

+Bob Kelly
Thanks!

+oberon the first
Thanks!

+no name
The wedge product is closely connected to both matrix determinants and the cross product, so you may have implicitly learned about it. The geometric product, on the other hand, isn't commonly known.

+Mathoma that's true, cross and wedge product have a resemblance. I also liked how by using geometric product you can show that complex numbers or "i" naturally comes up in geometry of 2d that was an "aha" moment

+no name
In fact, the cross product is dual to an associated bivector. Also, the quaternions will show up in 3D as naturally as the complex numbers showed up in 2D, and by similar means. Both of these thoughts will be covered in future videos.

:feelsbadman

Lucky!

+Jonathan Salazar
I forgot to include references in this particular video (I'll get on it) although I have references in most videos in the geometric algebra series. My main text is Lasenby and Doran's _Geometric Algebra for Physicists_. I think it's a nice gentle introduction to the subject and if you're interested in particular aspects of the subject you can always start there and follow the references.

+Ralph Dratman
My pleasure.

+VFB1210
That's very generous of you. Perhaps in a half-year to year's time I'll make an account because I should increase the production quality and series coherence before I feel good about accepting donations. I have a long-term project in mind on nonstandard analysis (infinitesimals and all that) and perhaps only at that point and for similar projects would I accept monetary donations. I genuinely appreciate the enthusiasm but for the time being, simply sharing videos is enough of a donation, as often as you might hear that from RUclips content creators.

Check out the description boxes under the videos for recommendations.

+DonutKop
In short, it's nice because it's the same formula in all dimensions (which actually isn't the formula in this video) and it makes it clear that rotation should be thought of as being done by a two-sided operator, which only reduces to a one-sided operator in special cases (when the vector being rotated is completely in the plane of rotation).

Well, the rotor formalism in geometric algebra is the most powerful formalism that I know. It is universal, simple, intuitive, works without exceptions (ever), etc. It is directly connected to spinors (which we can imagine as rotors multiplied by a scalar).

"Check it and see if it works" is a completely valid concept here. The associativities you mention are generalized formulas; they use placeholder variables and you can substitue whichever numbers you like in there to try and break it. Since the operations involved are all linear, there's no danger of singularities occuring (as there would be if we used a quotient, for example). You're never going to get an undefined division by zero or infinity unless you started with one to begin with.

The wedge (outer) product is associative, it is something that is easy to prove.

+Procrastinator7
The order in which the product is written tells us the orientation. The product e2 ^ e1 has reversed orientation. The scalar sitting in front gives us information on the magnitude of the bivector, how much area it contains.

Yes, I meant that this second product of the result of the calculation describes the other property of the bivector, the rotation/orientation of it.
Great video by the way!

+TheMadmaurice
For your first question, could you point out which statement you're asking about? I suspect the answer to that question won't be any deeper than it's just the way the geometric product is set up. I'm also not sure if I have a good answer for why scalars are 0-dimensional other than saying there's not much else for them to be, seeing as how they don't have direction and don't require any particular number of vectors to be described. When we formed those four objects (one scalar, two vectors, one bivector) we were choosing a certain number of basis elements at a time. For the vectors, of the 2 we pick only 1, and so the number of vectors is 2 choose 1 = 2. For the bivectors, we choose both, so there's 1 bivector. By abstraction, we choose 0 elements and those are the scalars in the geometric algebra.

+TheMadmaurice
Perhaps I should have used the word "grade" instead of "dimension". Probably a blunder on my part.

"We have these one dimensional objects that we're inputting into the geometric product". These "one dimensional objects" apparently being the two 2D vectors u and v.
I'd say scalars are 1 dimensional. The graph for a 1 dimensional vector would be the number line and thus showing the real numbers which are scalars. The direction of a 1d vector would be negative or positive or none at all for 0 (like there wouldn't be a direction of a vector if the vector's length is 0 in pretty much any amount of dimensions). Their describing "vector" would be e_1 = 1. Another way to describe it would be: When a 2 dimensional vector is an element of R^2 (just for the example) then a 1 dimensional vector would be an element of R^1 or R and thus being a scalar.
I didn't really understand what bivectors are yet though which might because of the language barrier. I sadly don't know all mathematical terms in English that I learned in German.

Alright i just looked up bivectors now and i guess this whole thing kinda succeeds my mathematical horizon. But at least on wikipedia they talk about scalars being a "order zero quantity". Maybe that's where I misunderstood.

+TheMadmaurice
As I said above, I probably should have stuck to the word "grade" instead of "dimension". That bivector is just an area element that has magnitude equal to the area swept out and some orientation.

+seen0it
Because it squares to -1.

that's exactly what happens. normal multiplication is actually the same as the complex exponential. this is not possible to see if multiplication is not defined with Geometric Algebra. (u v) = (u . v) + (u ^ v) = |u| |v| ( cos_uv[ theta ] + I_uv sin_uv[ theta ] ) = |u| |v| E^(2*Pi* I_uv *theta) ... the standard notation is ambiguous about which plane I is in, and what plane sin/cos are over. the standard notation is basically wrong. it lacks important information.

Both the scalar 1 and the bivector 𝑰 are defined using the basis vectors e_1 and e_2, so together, all 4 objects define G(R²).

It follows from antisymmetry of the wedge product, i.e. that u∧v = -v∧u but more intuitively it is because the oriented area swept out from a vector to itself is 0.

​@@Math_oma Applying the wedge product on two 3-dimensional vectors 𝒖 and 𝒗, where:
𝒖=a𝒙+b𝒚+c𝒛 and 𝒗=d𝒙+e𝒚+f𝒛
𝒖∧𝒗=(ae-bd)(𝒙∧𝒚)+(af-cd)(𝒙∧𝒛)+(bf-ce)(𝒚∧𝒛)
Is this correct?
I ask because I'm struggling to rationalize how to programmatically represent a bivector given any two arbitrary N-dimensional vectors. I feel there is no greater way to understand the underlying mathematical concepts than to create a library capable of performing such calculations.

@@Tannz0rz Yes. You'll notice the coefficients are the same as those of the cross product of u and v.

+jennifer siagian
Thanks! A little at a time and you'll successfully learn this. Non nobis, Domine.

where there is Life there is hope (circle me google+ SEE what I am saying.) Ps Math IS the Universal language and sooner than later WE will all be speakingi (( again)) g nite. Non nobis - Wikipedia
en.wikipedia.org/wiki/Non_nobis
Non nobis is a short Latin hymn used as a prayer of thanksgiving and expression of humility. ... Non nobis Domine is now known in the form of a 16th-century canon derived from two passages in the motet Aspice Domine (a5) by the South ...

+Richard Alsenz
Yes, geometric algebra appears to be a very natural system for doing physics and one of the big selling points for geometric algebra is that the four Maxwell equations can be compressed and written as a single equation. This is briefly explained here:
en.wikipedia.org/wiki/Mathematical_descriptions_of_the_electromagnetic_field#Geometric_algebra_formulations
However, I'd encourage you to check out the literature to learn more, particularly the work of Doran and Hestenes. The main reference I use for this series is _Geometric Algebra for Physicists_ and this would likely answer your question in the greatest detail.

Thanks.
I also just discovered "Physical Applications of Geometric Algebra" to be very helpful.
geometry.mrao.cam.ac.uk/wp-content/uploads/2015/02/hout01.pdf

Yes

I suspect that you are using "dimension" for "grade".

Geometric dimension ≠ dimension of a linear space.
Grade 1 objects are 1-dimensional subspaces of a larger N-dimensional space, but to describe any given 1-dimensional subspace in an N-dimensional space can require N components, so the linear space of 1-dimensional supspaces in N-dimensions itself has a dimension of N. In any number of dimensions, scalars represent 0-dimensional subspaces, and independently act as a 1-dimensional linear space.
The video seems to be saying "dimension" to refer to the geometric dimension of a given subspace, where as you seem to be saying "dimension" to mean the dimension of the linear spaces that describe said subspaces.

It's equal to -1 not i btw

@@officiallyaninja shhhhh

You may want to look at the "abstract algebra" definition of the geometric product then, which defines the Geometric product as having the properties you describe (everything can be multiplied with anything), and defines the wedge and inner product with respect to the geometric product. It's basically a product that satisfies
1) AB is in the same space (e.g. closure)
2) A(BC) = (AB)C (associativity)
3) 1A = A1 = A (the existence of an identity element)
4) A(B+C) = AB + AC, and also (B + C)A = BA + CA (distributivity)
5) For every vector a, a^2 = a dot a (contraction)
The reason (that I support) for not introducing the geometric product as such is that 1, 2, 3 and 4 are all properties of a 'normal' product and thus introducing them again would be a waste of time and confuses the main purpose: geometric intuition. Moreover, as far as I can tell 5 is equivalent to the Fundamental Identity (e.g. ab = a wedge b + a dot b), which he focused on instead.

Thank you very much