# December 17, 2000 {#week162} Since the winter solstice is coming soon, I'll start with some gift suggestions... for the physicist who has everything. 1) "The Universe Map", National Geographic Society, 2000, NSG \#602011. I've only seen a picture of this $20\times31$ inch map, but I know I want one! In a series of different 3d views, it shows the solar system, nearby stars, the Milky Way, the Local Group and the observable universe as a whole. I'll put it outside my office so my students can figure out just where they stand in the grand scheme of things. 2) Wil Tirion and Roger W. Sinnot, _Sky Atlas 2000.0_, 2nd edition, Cambridge U. Press, 1999. This is a favorite sky atlas among amateur astronomers. It comes in lots of versions, but Kevin Kelly of Whole Earth says that the most useful is the "deluxe version, spiralbound". 3) Lee Smolin, _Three Roads to Quantum Gravity_, Weidenfeld and Nicholson, 2000. This is a nontechnical guide to quantum gravity and the different approaches people have taken to this problem: string theory, loop quantum gravity, and the more radical lines of thought pursued by people whom Smolin calls "the true heroes of quantum gravity", like Alain Connes, David Finkelstein, Chris Isham, Roger Penrose and Raphael Sorkin. I haven't gotten ahold of this book, so I can't describe it in detail yet, but it should be lots of fun. That's enough gift suggestions. Now I want to talk about Jordan algebras and how they show up in projective geometry, quantum logic, special relativity and so on. I'll start by reminding you of some stuff from ["Week 106"](#week106) and ["Week 145"](#week145). Then I'll charge ahead and show you how a Jordan algebra built from the octonions is related to $10$-dimensional Minkowski spacetime.... Projective geometry is a venerable subject that has its origins in the study of perspective by Renaissance painters. As seen by the eye, any pair of parallel lines --- e.g., train tracks --- appear to meet at a "point at infinity". Furthermore, when you change your viewpoint, distances and angles appear to change, but points remain points and lines remain lines. This suggests a modification of Euclidean plane geometry based on a set of points, a set of lines, and relation whereby a point "lies on" a line, satisfying the following axioms: A) For any two distinct points, there is a unique line on which they both lie. B) For any two distinct lines, there is a unique point which lies on both of them. C) There exist four points, no three of which lie on the same line. D) There exist four lines, no three of which have the same point lying on them. Any structure satisfying these axioms is called a "projective plane". But projective geometry is also interesting in higher dimensions. One can define a "projective space" by the following axioms: A) For any two distinct points $p$ and $q$, there is a unique line $pq$ on which they both lie. B) For any line, there are at least three points lying on this line. C) If $a,b,c,d$ are distinct points and there is a point lying on both $ab$ and $cd$, then there is a point lying on both $ac$ and $bd$. Given a projective space and a set $S$ of points in this space, we define the "span" of $S$ to be the set of all points lying on lines $ab$ where $a,b$ are distinct points in $S$. The "dimension" of a projective space is defined to be one less than the smallest number of points that span the whole space. As you would hope, a $2$-dimensional projective space is the same thing as a projective plane! It's a fun exercise to show this straight from the above axioms. If you give up, read this book: 4) Lynn E. Garner, _An Outline of Projective Geometry_, North Holland, New York, 1981. How can we get our hands on some projective spaces? Well, if $\mathbb{K}$ is any field, there is an $n$-dimensional projective space called $\mathbb{KP}^n$ where the points are lines through the origin in $\mathbb{K}^{n+1}$, the lines are planes through the origin in $\mathbb{K}^{n+1}$, and the relation of "lying on" is inclusion. The example relevant to perspective is the real projective plane, $\mathbb{RP}^2$. But it's good to follow Polya's advice: > "Be wise --- generalize!" and study $\mathbb{KP}^n$ for any field and any $n$. In fact, we can define $\mathbb{KP}^n$ even when $\mathbb{K}$ is a mere "skew field": a ring such that every nonzero element has a left and right multiplicative inverse. We just need to be a bit careful about defining lines and planes through the origin in $\mathbb{K}^{n+1}$. To do this, we just take a line through the origin to be any set $$L = {ax \mid a\in\mathbb{K}}$$ where $x$ is nonzero element of $\mathbb{K}^{n+1}$, and take a plane through the origin to be any set $$P = {ax + by \mid a,b\in\mathbb{K}}$$ where $x,y$ are elements of $\mathbb{K}^{n+1}$ such that $ax + by = 0$ implies $a$ and $b$ are zero. Around now, you might be wondering whether *every* projective $n$-space is of the form $\mathbb{KP}^n$ for some skew field $\mathbb{K}$. If so, you must have forgotten ["Week 145"](#week145), where I gave the answer: yes, but only if $n>2$. Projective planes are more subtle! A projective plane comes from a skew field if and only if it satisfies an extra axiom, the "axiom of Desargues". I described this axiom in ["Week 145"](#week145) so I won't do it again here. The main point is that a projective plane coming from a skew field has some extra geometrical properties that a "non-Desarguesian" projective plane will not. Projective geometry was very fashionable in the 1800s, with such worthies as Poncelet, Brianchon, Steiner and von Staudt making important contributions. Later it was overshadowed by other forms of geometry. However, work on the subject continued, and in 1933 Ruth Moufang constructed a remarkable example of a non-Desarguesian projective plane using the octonions: 5) Ruth Moufang, "Alternativkoerper und der Satz vom vollstaendigen Vierseit", _Abhandlungen Math. Sem. Hamburg_ **9**, (1933), 207--222. It turns out that this projective plane deserves the name $\mathbb{OP}^2$, where $\mathbb{O}$ stands for the octonions. The 1930s also saw the rise of another reason for interest in projective geometry: quantum mechanics! Quantum theory is distressingly different from the classical Newtonian physics we have learnt to love. In classical mechanics, observables are described by real-valued functions. In quantum mechanics, they are often described by hermitian $n\times n$ complex matrices. In both cases, observables are closed under addition and multiplication by real scalars. However, in quantum mechanics, observables do not form an associative algebra. Still, one can raise an observable to any power, and from squaring one can define a commutative product: $$x \circ y = \frac12[(x+y)^2 - x^2 - y^2] = \frac12(xy + yx)$$ This product is not associative, but it satisfies the weaker identity $$x\circ (y\circ x^2) = (x\circ y)\circ x^2$$ In 1932, Pascual Jordan attempted to understand this situation better by isolating the bare minimum axioms that an "algebra of observables" should satisfy: 6) Pascual Jordan, "Ueber eine Klasse nichtassociativer hyperkomplexer Algebren", _Nachr. Ges. Wiss. Goettingen_ (1932), 569--575. He invented the definition of what is now called a "formally real Jordan algebra": a commutative (but not necessarily associative) unital algebra over the real numbers such that: $$x\circ (y\circ x^2) = (x\circ y)\circ x^2$$ and also: $$[a^2 + b^2 + c^2 + \ldots = 0] \implies [a = b = c = \ldots = 0].$$ The last condition gives our algebra a partial ordering: if we say that $x$ is "less than or equal to" $y$ when the element $y-x$ is a sum of squares, this condition says that if $x$ is less than or equal to $y$ and $y$ is less than or equal to $x$, then $x = y$. If we drop this last condition, we get the definition of what is now called a "Jordan algebra". In 1934, one year after Moufang published her paper on $\mathbb{OP}^2$, Jordan published a paper with von Neumann and Wigner classifying all formally real Jordan algebras: 7) Pascual Jordan, John von Neumann, Eugene Wigner, "On an algebraic generalization of the quantum mechanical formalism", _Ann. Math._ **35** (1934), 29--64. Their classification is nice and succinct. An "ideal" in the Jordan algebra $A$ is a subspace $B$ such that if $b$ is in $B$, $a\circ b$ lies in $B$ for all $a$ in $A$. A Jordan algebra $A$ is "simple" if its only ideals are $\{0\}$ and $A$ itself. Every formally real Jordan algebra is a direct sum of simple ones. The simple formally real Jordan algebras consist of 4 infinite families and one exception: - The algebra of $n\times n$ self-adjoint real matrices with the product $$x\circ y = \frac12(xy + yx).$$ - The algebra of $n\times n$ self-adjoint complex matrices with the product $$x\circ y = \frac12(xy + yx).$$ - The algebra of $n\times n$ self-adjoint quaternionic matrices with the product $$x\circ y = \frac12(xy + yx).$$ - The algebra $\mathbb{R}^n\oplus\mathbb{R}$ with the product $$(v,a) o (w,b) = (aw + bv, \langle v,w\rangle + ab)$$ where $\langle v,w\rangle$ is the usual inner product of vectors in $\mathbb{R}^n$. This sort of Jordan algebra is called a "spin factor". - The algebra of $3\times3$ self-adjoint octonionic matrices with the product $$x\circ y = \frac12(xy + yx).$$ This is called the "exceptional Jordan algebra". This classification raises some obvious questions. Why does nature prefer the Jordan algebras $h_n(\mathbb{C})$ over all the rest? Or does it? Could the other Jordan algebras --- even the exceptional one --- have some role to play in quantum physics? Despite much research, these questions remain unanswered to this day. The paper by Jordan, von Neumann and Wigner appears to have been uninfluenced by Moufang's discovery of $\mathbb{OP}^2$, but in fact the two are related! A "projection" in a formally real Jordan algebra is defined to be an element $p$ with $p^2 = p$. In the usual case of $h_n(\mathbb{C})$, these correspond to hermitian matrices with eigenvalues $0$ and $1$, so they are used to describe observables that assume only two values --- e.g., "true" and "false". This suggests treating projections in a formally real Jordan algebra as propositions in a kind of "quantum logic". The partial order helps us do this: given projections $p$ and $q$, we say that $p$ "implies" $q$ if $p$ is less than or equal to $q$. We can then go ahead and define "and", "or" and "not" in this context, and most of the familiar rules of Boolean logic continue to hold. However, we no longer have the distributive laws: $$ \begin{gathered} \mbox{$p$ and ($q$ or $r$) = ($p$ and $q$) or ($p$ and $r$)} \\\mbox{$p$ or ($q$ and $r$) = ($p$ or $r$) and ($q$ or $r$)} \end{gathered} $$ The failure of these distributive laws is the hallmark of quantum logic. Now, the relation between Jordan algebras and quantum logic is already interesting in itself: 8) G. Emch, _Algebraic Methods in Statistical Mechanics and Quantum Field Theory_, Wiley-Interscience, New York, 1972. ... but the real fun starts when we note that projections in the Jordan algebra of $n\times n$ self-adjoint complex matrices correspond to subspaces of $\mathbb{C}^n$. This sets up a relationship to projective geometry, since the projections onto $1$-dimensional subspaces correspond to points in $\mathbb{CP}^n$, while the projections onto $2$-dimensional subspaces correspond to lines. Even better, we can work out the dimension of a subspace $V$ from the corresponding projection $p\colon\mathbb{C}^n\to V$ using only the partial order on projections: $V$ has dimension $d$ iff the longest chain of distinct projections $$p_0 < p_1 < \ldots < p_i = p$$ has length $i = d$. In fact, we can use this to define the "dimension" of any projection in *any* formally real Jordan algebra. We can then try to construct a projective space whose points are the $1$-dimensional projections and whose lines are the $2$-dimensional projections, with the relation of "lying on" given by the partial order in our Jordan algebra. If we try this starting with the Jordan algebra of $n\times n$ self-adjoint matrices with real, complex or quaternionic entries, we succeed when $n$ is $2$ or more --- and we obtain the projective spaces $\mathbb{RP}^n$, $\mathbb{CP}^n$ and $\mathbb{HP}^n$, respectively. If we try this starting with the spin factor $\mathbb{R}^n\oplus\mathbb{R}$ we succeed when $n$ is $2$ or more --- and we obtain a series of 1-dimensional projective spaces related to Minkowskian geometry, which I'll talk about in a minute. Finally, in 1949 Jordan discovered that if we try this construction starting with the exceptional Jordan algebra, we get the projective plane discovered by Ruth Moufang --- $\mathbb{OP}^2$! 9) Pascual Jordan, "Ueber eine nicht-desarguessche ebene projektive Geometrie", _Abhandlungen Math. Sem. Hamburg_ **16** (1949), 74--76. Physicists have tried for a long time to find some use for the quantum logic corresponding to the exceptional Jordan algebra. So far they have not succeeded. Jordan hoped this stuff would be related to nuclear physics. Feza Gursey and Murat Gunaydin hoped it was related to quarks, since $3\times3$ hermitian octonionic matrices should describe observables in some 3-state quantum system: 10) Murat Gunaydin and Feza Gursey, "An octonionic representation of the Poincare group", _Lett. Nuovo Cim._ **6** (1973), 401--406. 11) Murat Gunaydin and Feza Gursey, "Quark structure and octonions", _Jour. Math. Phys._ **14** (1973), 1615--1667. 12) Murat Gunaydin and Feza Gursey, "Quark statistics and octonions", _Phys. Rev._ **D9** (1974), 3387--3391. 13) Murat Gunaydin, $Octonionic Hilbert spaces, the Poincare group and \mathrm{SU}(3)$, _Jour. Math. Phys._ **17** (1976), 1875--1883. 14) M. Gunaydin, C. Piron and H. Ruegg, "Moufang plane and octonionic quantum mechanics", _Comm. Math. Phys._ **61** (1978), 69--85. Alas, these ideas never quite worked out, so most physicists discarded the exceptional Jordan algebra as a lost cause. However, the exceptional Jordan algebra is secretly related to string theory, so there's a sense in which it's still lurking in the collective subconscious. Now, you probably want me to explain this, but I'm not ready to. So I won't say what $3\times3$ hermitian octonionic matrices have to do with string theory. If you want to know that, read these: 15) E. Corrigan and T. J. Hollowood, "The exceptional Jordan algebra and the superstring", _Commun. Math. Phys._ **122** (1989), 393. Also available at [`http://projecteuclid.org/`](http://projecteuclid.org/DPubS?service=UI&version=1.0&verb=Display&handle=euclid.cmp/1104178468) 16) E. Corrigan and T. J. Hollowood, "A string construction of a commutative nonassociative algebra related to the exceptional Jordan algebra", _Phys. Lett._ **B203** (1988), 47. 17) G. Sierra, "An application of the theories of Jordan algebras and Freudenthal triple systems to particles and strings", _Class. Quant. Grav._ **4** (1987), 227. Instead, I'll just say what $2\times2$ hermitian octonionic matrices have to do with $10$-dimensional Minkowski spacetime. Since superstrings live in 10 dimensions, that's at least a start. First, we need to think about spin factors. In case you forgot, spin factors were the fourth infinite family of simple formally real Jordan algebras on my list up there. I gave a lowbrow definition of these guys, but now let's try a highbrow one. Given an $n$-dimensional real inner product space $V$, the "spin factor" $J(V)$ is the Jordan algebra generated by $V$ with the relations $$v\circ w = \langle v,w\rangle$$ This should remind you of the definition of a Clifford algebra, and indeed, they're related --- they have the same representations! This sets up a connection to spinors, which is why these Jordan algebras are called "spin factors". But anyway: if you think about it a while, you'll see that $J(V)$ is isomorphic to the direct sum $V\oplus\mathbb{R}$ equipped with the product $$(v,a)\circ(w,b) = (aw + bv, \langle v,w\rangle + ab)$$ which is basically the lowbrow definition of a spin factor. Though Jordan algebras were invented to study quantum mechanics, the spin factors are also deeply related to special relativity: we can think of $J(V) = V\oplus\mathbb{R}$ as "Minkowski spacetime", with $V$ as space and $\mathbb{R}$ as time. The reason is that $J(V)$ is naturally equipped with a dot product: $$(v,a)\cdot(w,b) = \langle v,w\rangle - ab$$ which is just the usual Minkowski metric in slight disguise. This makes it tempting to borrow an idea from special relativity and define the "lightcone" to consist of all nonzero $x$ in $J(V)$ with $$x\cdot x = 0$$ A $1$-dimensional subspace of $J(V)$ spanned by an element of the lightcone is called a "light ray", and the space of all light rays is called the "heavenly sphere" $S(V)$. We can identify the heavenly sphere with the sphere of unit vectors in $V$, since every light ray is spanned by an element of $J(V)$ of the form $(v,1)$ where $v$ is a unit vector in $V$. What's the physical meaning of the heavenly sphere? Well, if you were a resident of the spacetime $J(V)$ and gazed up at the sky at night, the stars would seem to lie on this sphere. If you took off in a spaceship and whizzed along at close to the speed of light, all the constellations would look distorted, but all *angles* would be preserved, since the Lorentz group acts as conformal transformations of the heavenly sphere. Now, when $V$ is at least $2$-dimensional, we can build a projective space from $J(V)$ using the construction I described for any simple formally real Jordan algebra. If we do this, what do we get? Well, you can easily check that aside from the elements $0$ and $1$, all projections in $J(V)$ are of the form $p = \frac12(v,1)$ where v is a unit vector in V. These projections will be the points of our projective space, but as we've seen, they also correspond to points of the heavenly sphere. So our projective space is really just the heavenly sphere! This is cool, because it means points on the heavenly sphere can also be thought of as *propositions* in a certain sort of quantum logic. Now, what does this have to do with the exceptional Jordan algebra? Well, we have to sneak up carefully on this wild beast, so first let's think about a smaller Jordan algebra: the $2\times2$ hermitian octonionic matrices. In fact, we can kill four birds with one stone, and think about $2\times2$ hermitian matrices with entries in any $n$-dimensional normed division algebra, say $\mathbb{K}$. There are not that many normed division algebras, so I really just mean: - the real numbers, $\mathbb{R}$, if $n = 1$, - the complex numbers, $\mathbb{C}$, if $n = 2$, - the quaternions, $\mathbb{H}$, if $n = 4$, - the octonions, $\mathbb{O}$, if $n = 8$. The space $\mathrm{h}_2(\mathbb{K})$ of hermitian $2\times2$ matrices with entries in $\mathbb{K}$ is a Jordan algebra with the product $$x\circ y = \frac12(xy + yx)$$ Moreover, this Jordan algebra is secretly a spin factor! There is an isomorphism $$f\colon \mathrm{h}_2(\mathbb{K}) \to J(\mathbb{K}\oplus\mathbb{R}) = \mathbb{K}\oplus\mathbb{R}\oplus\mathbb{R}$$ which sends the hermitian matrix $$ \left( \begin{array}{cc} a+b&k \\k^*&a-b \end{array} \right) $$ to the element $(k,b,a)$ in $K\oplus\mathbb{R}\oplus\mathbb{R}$. Furthermore, the determinant of matrices in $\mathrm{h}_2(\mathbb{K})$ is just the Minkowski metric in disguise, since the determinant of $$ \left( \begin{array}{cc} a+b&k \\k^*&a-b \end{array} \right) $$ is $$a^2-b^2-\langle k,k\rangle.$$ These facts have a number of nice consequences. First of all, since the Jordan algebras $J(\mathbb{K}\oplus\mathbb{R})$ and $\mathrm{h}_2(\mathbb{K})$ are isomorphic, so are their associated projective spaces. We have seen that the former space is the heavenly sphere $S(\mathbb{K}\oplus\mathbb{R})$; unsurprisingly, the latter is the projective line $\mathbb{KP}^1$. It follows that these are the same! This shows that: - $\mathrm{h}_2(\mathbb{R})$ is 3d Minkowski spacetime, and $\mathbb{RP}^1$ is the heavenly sphere $S^1$; - $\mathrm{h}_2(\mathbb{C})$ is 4d Minkowski spacetime, and $\mathbb{CP}^1$ is the heavenly sphere $S^2$; - $\mathrm{h}_2(\mathbb{H})$ is 6d Minkowski spacetime, and $\mathbb{HP}^1$ is the heavenly sphere $S^4$; - $\mathrm{h}_2(\mathbb{O})$ is 10d Minkowski spacetime, and $\mathbb{OP}^1$ is the heavenly sphere $S^8$. Secondly, it follows that the determinant-preserving linear transformations of $\mathrm{h}_2(\mathbb{K})$ form a group isomorphic to $\mathrm{O}(n+1,1)$. How can we find some transformations of this sort? For $\mathbb{K}=\mathbb{R}$, it's easy: when $g$ lies in $\mathrm{SL}(2,\mathbb{R})$ and $x$ is in $\mathrm{h}_2(\mathbb{R})$, we have $gxg^*$ in $\mathrm{h}_2(\mathbb{R})$ again, and $$\det(gxg*) = \det(x).$$ This gives a homomorphism from $\mathrm{SL}(2,\mathbb{R})$ to $\mathrm{O}(2,1)$. It's easy to see that this makes $\mathrm{SL}(2,\mathbb{R})$ into a double cover of the Lorentz group $\mathrm{SO}_0(2,1)$. The exact same construction works for $\mathbb{K}=\mathbb{C}$, so $\mathrm{SL}(2,\mathbb{C})$ is a double cover of the Lorentz group $\mathrm{SO}_0(3,1)$ --- which you probably knew already, if you made it this far! For the other two normed division algebras the above calculation involving determinants breaks down, and it even becomes tricky to define the group $\mathrm{SL}(2,\mathbb{K})$, so we'll start by working at the Lie algebra level. We say a $2\times2$ matrix with entries in the normed division algebra $\mathbb{K}$ is "traceless" if the sum of its diagonal entries is zero. Any such traceless matrix acts as a real-linear operator on $\mathbb{K}^2$. When $\mathbb{K}$ is commutative and associative, the space of operators coming from $2\times2$ traceless matrices with entries in $\mathbb{K}$ is closed under commutators, but otherwise it is not, so we'll define $\mathfrak{sl}(2,\mathbb{K})$ to be the Lie algebra of operators on $\mathbb{K}^2$ *generated* by operators of this form. This Lie algebra in turn generates a Lie group of real-linear operators on $\mathbb{K}^2$, which we call $\mathrm{SL}(2,\mathbb{K})$. Now, $\mathfrak{sl}(2,\mathbb{K})$ has an obvious representation on $\mathbb{K}^2$, called the "fundamental representation". If we tensor this representation with its dual we get a representation of $\mathfrak{sl}(2,\mathbb{K})$ on the space of $2\times2$ matrices with entries in $\mathbb{K}$, which is given by $$a\colon x \mapsto ax + xa^*$$ whenever $a$ is actually a $2\times2$ traceless matrix with entries in $\mathbb{K}$. Since $ax + xa^*$ is hermitian whenever $x$ is, this representation restricts to a representation of $\mathfrak{sl}(2,\mathbb{K})$ on $\mathrm{h}_2(\mathbb{K})$. This in turn gives a rep of the group $\mathrm{SL}(2,\mathbb{K})$. A little calculation at the Lie algebra level shows that this action of $\mathrm{SL}(2,\mathbb{K})$ on $\mathrm{h}_2(\mathbb{K})$ preserves the determinant, so we have a homomorphism $$\mathrm{SL}(2,\mathbb{K}) \to \mathrm{SO}_0(n+1,1).$$ This is two-to-one and onto, so it follows pretty easily that: - $\mathrm{SL}(2,\mathbb{R})$ is the double cover of the Lorentz group $\mathrm{SO}_0(2,1)$; - $\mathrm{SL}(2,\mathbb{C})$ is the double cover of the Lorentz group $\mathrm{SO}_0(3,1)$; - $\mathrm{SL}(2,\mathbb{H})$ is the double cover of the Lorentz group $\mathrm{SO}_0(5,1)$; - $\mathrm{SL}(2,\mathbb{O})$ is the double cover of the Lorentz group $\mathrm{SO}_0(9,1)$. and thus: - $\mathrm{SL}(2,\mathbb{R})$ acts as conformal transformations of the sphere $S^1 = \mathbb{RP}^1$; - $\mathrm{SL}(2,\mathbb{C})$ acts as conformal transformations of the sphere $S^2 = \mathbb{CP}^1$; - $\mathrm{SL}(2,\mathbb{H})$ acts as conformal transformations of the sphere $S^4 = \mathbb{HP}^1$; - $\mathrm{SL}(2,\mathbb{O})$ acts as conformal transformations of the sphere $S^8 = \mathbb{OP}^1$. In the complex case, these conformal transformations are often called "Moebius transformations". For more on the octonionic case, try this: 15) Corinne A. Manogue and Tevian Dray, "Octonionic Moebius transformations", _Mod. Phys. Lett._ **A14** (1999) 1243--1256, available as [`math-ph/9905024`](https://arxiv.org/abs/math-ph/9905024). To round off the story, it helps to bring in spinors: 16) Anthony Sudbery, "Division algebras, (pseudo)orthogonal groups and spinors", _Jour. Phys._ **A17** (1984), 939--955. The fundamental rep of $\mathrm{SL}(2,\mathbb{K})$ on $\mathbb{K}^2$ is secretly one of the spinor reps of the double cover of the Lorentz group $\mathrm{SO}_0(n+1,1)$. Moreover, we can get points on the heavenly sphere from these spinors! This has been nicely explained by Penrose in the complex case, but it works the same way for the other normed division algebras. It goes like this: Suppose $$\vert\psi\rangle = (x,y)$$ is a unit spinor, i.e. an element of $\mathbb{K}^2$ with norm one. Then $$ \vert\psi\rangle\langle\psi\vert = \left( \begin{array}{cc} xx^*&xy^* \\yx^*&yy^* \end{array} \right) $$ is a projection in $\mathrm{h}_2(\mathbb{K})$ which is not $0$ or $1$ --- or in other words, a point on the heavenly sphere. If we identify the heavenly sphere with $\mathbb{KP}^1$, this point corresponds to the line through the origin in $\mathbb{K}^2$ containing the spinor $\vert\psi\rangle$. To go further, I would want to say more about why this connection between quantum logic, Lorentzian geometry, and spinors is interesting, and what you can do with it. And then I would want to take everything we've seen about $\mathbb{OP}^1$ and $\mathrm{h}_2(\mathbb{O})$ and see how it fits inside the bigger, more interesting story of $\mathbb{OP}^2$ and $\mathrm{h}_3(\mathbb{O})$. But alas, I'm running out of steam here, so I'll just give you a little reading list about the octonionic projective plane and the exceptional Jordan algebra: 20) Hans Freudenthal, "Zur ebenen Oktavengeometrie", _Indag. Math._ **15** (1953), 195--200. Hans Freudenthal, "Beziehungen der $\mathfrak{e}_7$ und $\mathfrak{e}_8$ zur Oktavenebene": I, II, _Indag. Math._ **16** (1954), 218--230, 363--368. III, IV, _Indag. Math._ **17** (1955), 151--157, 277--285. V -- IX, _Indag. Math._ **21** (1959), 165--201, 447--474. X, XI, _Indag. Math._ **25** (1963) 453--471, 472--487. Hans Freudenthal, "Lie groups in the foundations of geometry", _Adv. Math._ **1** (1964), 145--190. Hans Freudenthal, "Oktaven, Ausnahmegruppen und Oktavengeometrie", _Geom. Dedicata_ **19** (1985), 7--63. 21) Jacques Tits, "Le plan projectif des octaves et les groupes de Lie exceptionnels", _Bull. Acad. Roy. Belg. Sci._ **39** (1953), 309--329. Jacques Tits, Le plan projectif des octaves et les groupes exceptionnels $\mathrm{E}_6$ et $\mathrm{E}_7$, _Bull. Acad. Roy. Belg. Sci._ **40** (1954), 29--40. 22) Tonny A. Springer, "The projective octave plane, I-II", _Proc. Koninkl. Akad. Wetenschap._ **A63** (1960), 74--101. Tonny A. Springer, "On the geometric algebra of the octave planes, I-III", _Proc. Koninkl. Akad. Wetenschap._ **A65** (1962), 413--451. 23) J. R. Faulkner and J. C. Ferrar, "Exceptional Lie algebras and related algebraic and geometric structures", _Bull. London Math. Soc._ **9** (1977), 1--35. Finally, for a really good overview of Jordan algebras and related things like "Jordan pairs" and "Jordan triple systems", try this: 24) Kevin McCrimmon, "Jordan algebras and their applications", _AMS Bulletin_ **84** (1978), 612--627.