# February 14, 1998 {#week117} A true physicist loves matter in all its states. The phases we all learned about in school - solid, liquid, and gas - are just the beginning of the story! There lots of others: liquid crystal, plasma, superfluid, and neutronium, for example. Today I want to say a little about two more phases that people are trying to create: quark-gluon plasma and strange quark matter. The first almost certainly exists; the second is a matter of much discussion. 1) The E864 Collaboration, "Search for charged strange quark matter produced in 11.5 A GeV/c Au + Pb collisions", _Phys. Rev. Lett._ **79** (1997) 3612--3616, preprint available as [`nucl-ex/9706004`](https://arxiv.org/abs/nucl-ex/9706004). Last week I went to a talk on the search for strange quark matter by one of these collaborators, Kenneth Barish. This talk was based on Barish's work at the E864 experiment at the "AGS", the alternating gradient synchrotron at Brookhaven National Laboratory in Long Island, New York. What's "strange quark matter"? Well, first remember from ["Week 93"](#week93) that in the Standard Model there are bosonic particles that carry forces: | Electromagnetic force | Weak force | Strong force | | :-------------------- | :--------- | :----------- | | photon | W\textsubscript{+}, W\textsubscript{-}, Z | 8 gluons | and fermionic particles that constitute matter: | **Leptons** | | **Quarks** | | | :---------- | :- | :--------- | :- | | electron | electron neutrino | down quark | up quark | | muon | muon neutrino | strange quark | charm quark | | tauon | tauon neutrino | bottom quark | top quark | (There is also the mysterious Higgs boson, which has not yet been seen.) The quarks and leptons come in 3 generations each. The only quarks in ordinary matter are the lightest two, those from the first generation: the up and down. These are the constituents of protons and neutrons, which are the only stable particles made of quarks. A proton consists of two ups and a down held together by the strong force, while a neutron consists of two downs and a up. The up has electric charge $+2/3$, while the down has electric charge $-1/3$. They also interact via the strong and weak forces. The other quarks are more massive and decay via the weak interaction into up and down quarks. Apart from that, however, they are quite similar. There are lots of short-lived particles made of various combinations of quarks. All the combinations we've seen so far are of two basic sorts. There are "baryons", which consist of 3 quarks, and "mesons", which consist of a quark and an antiquark. Both of these should be visualized roughly as a sort of bag with the quarks and a bunch of gluons confined inside. Why are they confined? Well, I sketched an explanation in ["Week 94"](#week94), so you should read that for more details. For now let's just say the strong force likes to "stick together", so that energy is minimized if it stays concentrated in small regions, rather than spreading all over the place, like the electromagnetic field does. Indeed, the strong force may even do something like this in the absence of quarks, forming short-lived "glueballs" consisting solely of gluons and virtual quark-antiquark pairs. (For more on glueballs, see ["Week 68"](#week68).) For reasons I don't really understand, the protons and neutrons in the nucleus do not coalesce into one big bag of quarks. Even in a neutron star, the quarks stay confined in their individual little bags. But calculations suggest that at sufficiently high temperatures or pressures, "deconfinement" should occur. Basically, under these conditions the baryons and mesons either smash into each other so hard, or get so severely squashed, that they burst open. The result should be a soup of free quarks and gluons: a "quark-gluon plasma". To get deconfinement to happen is not easy --- at low pressures, it's expected to occur at a temperature of 2 trillion Kelvin! According to the conventional wisdom in cosmology, the last time deconfinement was prevalent was about 1 microsecond after the big bang! In the E864 experiment, they are accelerating gold nuclei to energies of 11.5 GeV per nucleon and colliding them with a fixed target made of lead, which is apparently *not* enough energy to fully achieve deconfinement --- they believe they are reaching temperatures of about 1 trillion Kelvin. At CERN they are accelerating lead nuclei to 160 GeV per nuclei and colliding them with a lead target. They may be getting signs of deconfinement, but as Jim Carr explained in a recent post to sci.physics, they're being very cautious about coming out and saying so. By mid-1999, the folks at Brookhaven hope to get higher energies with the Relativistic Heavy Ion Collider, which will collide two beams of gold nuclei head-on at 100 GeV per nucleon... see ["Week 76"](#week76) for more on this. One of the hoped-for signs of deconfinement is "strangeness enhancement". The lightest quark besides the up and down is the strange quark, and in the high energies present in a quark gluon plasma, strange quarks should be formed. Moreover, since Pauli exclusion principle prevents two identical fermions from being in the same state, it can be energetically favorable to have strange quarks around, since they can occupy lower-energy states which are already packed with ups and downs. They seem to be seeing strangeness enhancement at CERN: 2) Juergen Eschke, NA35 Collaboration, "Strangeness enhancement in sulphur- nucleus collisions at 200 GeV/N", preprint available as [`hep-ph/9609242`](https://arxiv.org/abs/hep-ph/9609242). As far as I can tell, people are just about as sure that deconfinement occurs at high temperatures as they would be that tungsten boils at high temperatures, even if they've never actually seen it happen. A more speculative possibility is that as quark-gluon plasma cools down it forms "strange quark matter" in the form of "strangelets": big bags of up, down, and strange quarks. This is what they're looking for at E864. Their experiment would only detect strangelets that live long enough to get to the detector. When their experiment is running they get $10^6$ collisions per second. So far they've set an upper bound of $10^{-7}$ charged strangelets per collision, neutral strangelets being harder to detect and rule out. For more on strangelets, try this: 3) E. P. Gilson and R. L. Jaffe, "Very small strangelets", _Phys. Rev. Lett._ **71** (1993) 332--335, preprint available as [`hep-ph/9302270`](https://arxiv.org/abs/hep-ph/9302270). Strange quark matter is also of interest in astrophysics. In 1984 Witten wrote a paper proposing that in the limit of large quark number, strange quark matter could be more stable than ordinary nuclear matter! 4) Edward Witten, "Cosmic separation of phases", _Phys. Rev._ **D30** (1984) 272--285. More recently, a calculation of Farhi and Jaffe estimates that in the limit of large quark number, the energy of strange quark matter is 301 MeV per quark, as compared with 310 Mev/quark for iron-56, which is the most stable nucleus. This raises the possibility that under suitable conditions, a neutron star could collapse to become a "quark star" or "strange star". Let me quote the abstract of the following paper: 5) Dany Page, "Strange stars: Which is the ground state of QCD at finite baryon number?", in _High Energy Phenomenology_ eds. M. A. Perez & R. Huerta (World Scientific), 1992, pp. 347--356, preprint available as [`astro-ph/9602043`](https://arxiv.org/abs/astro-ph/9602043). > Witten's conjecture about strange quark matter ('Strange Matter') > being the ground state of QCD at finite baryon number is presented and > stars made of strange matter ('Strange Stars') are compared to > neutron stars. The only observable way in which a strange star differs > from a neutron star is in its early thermal history and a detailed > study of strange star cooling is reported and compared to neutron star > cooling. One concludes that future detection of thermal radiation from > the compact object produced in the core collapse of SN 1987A could > present the first evidence for strange matter. Here are a couple of books on the subject, which unfortunately I've not been able to get ahold of: 6) _Strange Quark Matter in Physics and Astrophysics: Proceedings of the International Workshop on Strange Quark Matter in Physics and Astrophysics_, ed. Jes Madsen, North-Holland, Amsterdam, 1991. 7) _International Symposium on Strangeness and Quark Matter_, eds. Georges Vassiliadis et al, World Scientific, Singapore, 1995. If anyone out there knows more about the latest theories of strange quark matter, and can explain them in simple terms, I'd love to hear about it. Okay, enough of that. Now, on with my tour of homotopy theory! So far I've mainly been talking about simplicial sets. I described a functor called "geometric realization" that turns a simplicial set into a topological space, and another functor that turns a space into a simplicial set called its "singular simplicial set". I also showed how to turn a simplicial set into a simplicial abelian group, and how to turn one of *those* into a chain complex... or vice versa. As you can see, the key is to have lots of functors at your disposal, so you can take a problem in any given context --- or more precisely, any given category! --- and move it to other contexts where it may be easier to solve. Eventually I want to talk about what all these categories we're using have in common: they are all "model categories". Once we understand that, we'll be able to see more deeply what's going on in all the games we've been playing. But first I want to describe a few more important tricks for turning this into that. Recall from ["Week 115"](#week115) that there's a category $\Delta$ whose objects $0,1,2,\ldots$ are the simplices, with $n$ corresponding to the simplex with $n$ vertices --- the simplex with $0$ vertices being the "empty simplex". We can also define $\Delta$ in a purely algebraic way as the category of finite totally ordered sets, with $n$ corresponding to the totally ordered set $\{0,1,\ldots,n-1\}$. The morphisms in $\Delta$ are then the order-preserving maps. Using this algebraic definition we can do some cool stuff: ------------------------------------------------------------------------ **J.** _The Nerve of a Category._ This is a trick to turn a category into a simplicial set. Given a category $\mathcal{C}$, we cook up the simplicial set $\mathrm{Nerve}(\mathcal{C})$ as follows. The 0-dimensional simplices of $\mathrm{Nerve}(\mathcal{C})$ are just the objects of $\mathcal{C}$, which look like this: $$x$$ The $1$-simplices of $\mathrm{Nerve}(\mathcal{C})$ are just the morphisms, which look like this: $$x\xrightarrow{f}y$$ The $2$-simplices of $\mathrm{Nerve}(\mathcal{C})$ are just the commutative diagrams that look like this: $$ \begin{tikzpicture} \node (x) at (0,0) {$x$}; \node (y) at (1,1.7) {$y$}; \node (z) at (2,0) {$z$}; \draw[thick] (x) to node[fill=white]{$f$} (y); \draw[thick] (x) to node[fill=white]{$h$} (z); \draw[thick] (y) to node[fill=white]{$g$} (z); \end{tikzpicture} $$ where $f\colon x\to y$, $g\colon y\to z$, and $h\colon x\to z$. And so on. In general, the $n$-simplices of $\mathrm{Nerve}(\mathcal{C})$ are just the commutative diagrams in $\mathcal{C}$ that look like $n$-simplices! When I first heard of this idea I cracked up. It seemed like an insane sort of joke. Turning a category into a kind of geometrical object built of simplices? What nerve! What use could this possibly be? Well, for an application of this idea to computer science, see ["Week 70"](#week70). We'll soon see lots of applications within topology. But first, let me give a slick abstract description of this "nerve" process that turns categories into simplicial sets. It's really a functor $$\mathrm{Nerve}\colon\mathsf{Cat}\to\mathsf{SimpSet}$$ going from the category of categories to the category of simplicial sets. First, a remark on $\mathsf{Cat}$. This has categories as objects and functors as morphisms. Since the "category of all categories" is a bit creepy, we really want the objects of $\mathsf{Cat}$ to be all the "small" categories, i.e., those having a mere *set* of objects. This prevents Russell's paradox from raising its ugly head and disturbing our fun and games. Next, note that any partially ordered set can be thought of as a category whose objects are just the elements of our set, and where we say there's a single morphism from $x$ to $y$ if $x\leqslant y$. Composition of morphisms works out automatically, thanks to the transitivity of "less than or equal to". We thus obtain a functor $$i\colon\Delta\to\mathsf{Cat}$$ taking each finite totally ordered set to its corresponding category, and each order-preserving map to its corresponding functor. Now we can copy the trick we played in section F of ["Week 116"](#week116). For any category $\mathcal{C}$ we define the simplicial set $\mathrm{Nerve}(\mathcal{C})$ by $$\mathrm{Nerve}(\mathcal{C})(-) = \operatorname{Hom}(i(-),\mathcal{C})$$ Think about it! If you put the simplex $n$ in the blank slot, we get $\operatorname{Hom}(i(n),\mathcal{C})$, which is the set of all functors from that simplex, *regarded as a category*, to the category $\mathcal{C}$. This is just the set of all diagrams in $\mathcal{C}$ shaped like the simplex $n$, as desired! We can say all this even more slickly as follows: take $$\Delta^{\mathrm{op}}\times\mathsf{Cat} \xrightarrow{i\times1} \mathsf{Cat}^{\mathrm{op}}\times\mathsf{Cat} \xrightarrow{\operatorname{Hom}} \mathsf{Set}$$ and dualize it to obtain $$\mathrm{Nerve}\colon\mathsf{Cat}\to\mathsf{SimpSet}.$$ I should also point out that topologists usually do this stuff with the topologist's version of $\Delta$, which does not include the "empty simplex". ------------------------------------------------------------------------ **K.** _The Classifying Space of Category._ If compose our new functor $$\mathrm{Nerve}\colon\mathsf{Cat}\to\mathsf{SimpSet}$$ with the "geometric realization" functor $$|\cdot|\colon\mathsf{SimpSet}\to\mathsf{Top}$$ defined in section E, we get a way to turn a category into a space, called its "classifying space". This trick was first used by Graeme Segal, the homotopy theorist who later became the guru of conformal field theory. He invented this trick in the following paper: 8) Graeme B. Segal, "Classifying spaces and spectral sequences", _Publ. Math. Inst. des Haut. Etudes Scient._ **34** (1968), 105--112. As it turns out, every reasonable space is the classifying space of some category! More precisely, every space that's the geometric realization of some simplicial set is homeomorphic to the classifying space of some category. To see this, suppose the space $X$ is the geometric realization of the simplicial set $S$. Take the set of all simplices in $S$ and partially order them by saying $x\leqslant y$ if $x$ is a face of $y$. Here by "face" I don't mean just mean a face of one dimension less than that of $y$; I'm allowing faces of any dimension less than or equal to that of $y$. We obtain a partially ordered set. Now think of this as a category, $\mathcal{C}$. Then $\mathrm{Nerve}(\mathcal{C})$ is the "barycentric subdivision" of $S$. In other words, it's a new simplicial set formed by chopping up the simplices of $S$ into smaller pieces by putting a new vertex in the center of each one. It follows that the geometric realization of $\mathrm{Nerve}(\mathcal{C})$ is homeomorphic to that of $S$. There are lots of interesting special sorts of categories, like groupoids, or monoids, or groups (see ["Week 74"](#week74)). These give special cases of the "classifying space" construction, some of which were actually discovered before the general case. I'll talk about some of these more next week, since they are very important in topology. Also sometimes people take categories that they happen to be interested in, which may have no obvious relation to topology, and study them by studying their classifying spaces. This gives surprising ways to apply topology to all sorts of subjects. A good example is "algebraic K-theory", where we start with some sort of category of modules over a ring. ------------------------------------------------------------------------ **L.** _$\Delta$ as the Free Monoidal Category on a Monoid Object._ Recall that a "monoid" is a set with a product and a unit element satisfying associativity and the left and right unit laws. Categorifying this notion, we obtain the concept of a "monoidal category": a category $\mathcal{C}$ with a product and a unit object satisfying the same laws. A nice example of a monoidal category is the category $\mathsf{Set}$ with its usual cartesian product, or the category $\mathsf{Vect}$ with its usual tensor product. We usually call the product in a monoidal category the "tensor product". Now, the "microcosm principle" says that algebraic gadgets often like to live inside categorified versions of themselves. It's a bit like the "homunculus theory", where I have a little copy of myself sitting in my head who looks out through my eyes and thinks all my thoughts for me. But unlike that theory, it's true! For example, we can define a "monoid object" in any monoidal category. Given a monoidal category $A$ with tensor product $\otimes$ and unit object $1$, we define a monoid object $a$ in $A$ to be an object equipped with a "product" $$m\colon a\otimes a\to a$$ and a "unit" $$i\colon 1\to a$$ which satisfy associativity and the left and right unit laws (written out as commutative diagrams). A monoid object in $\mathsf{Set}$ is just a monoid, but a monoid object in $\mathsf{Vect}$ is an algebra, and I gave some very different examples of monoid objects in ["Week 89"](#week89). Now let's consider the "free monoidal category on a monoid object". In other words, consider a monoidal category $A$ with a monoid object $a$ in it, and assume that $A$ has no objects and no morphisms, and satisfies no equations, other than those required by the definitions of "monoidal category" and "monoid object". Thus the only objects of $A$ are the unit object together with $a$ and its tensor powers. Similarly, all the morphism of $A$ are built up by composing and tensoring the morphisms $m$ and $i$. So $A$ looks like this: $$ \begin{tikzcd}[column sep=large] 1 \rar["i" description] & a \rar[shift left=5,"1\otimes i" description] \rar["i\otimes1" description] & a\otimes a \lar[shift left=5,"m" description] \rar[shift left=10,"1\otimes1\otimes i" description] \rar[shift left=5,"1\otimes i\otimes1" description] \rar["i\otimes1\otimes1" description] & a\otimes a\otimes a \quad \ldots \lar[shift left=5,"m\otimes1" description] \lar[shift left=10,"1\otimes m" description] \end{tikzcd} $$ Here I haven't drawn all the morphisms, just enough so that every morphism in $A$ is a composite of morphisms of this sort. What is this category? It's just $\Delta$! The $n$th tensor power of a corresponds to the simplex with $n$ vertices. The morphisms going to the right describe the ways the simplex with n vertices can be a face of the simplex with $n+1$ vertices. The morphisms going to the left correspond to "degeneracies" --- ways of squashing a simplex with $n+1$ vertices down into one with $n$ vertices. So: in addition to its other descriptions, we can define $\Delta$ as the free monoidal category on a monoid object! Next time we'll see how this is fundamental to homological algebra.