# March 15, 1997 {#week99} Life here at the Center for Gravitational Physics and Geometry is tremendously exciting. In two weeks I have to return to U. C. Riverside and my mundane life as a teacher of calculus, but right now I'm still living it up. I'm working with Ashtekar, Corichi, and Krasnov on computing the entropy of black holes using the loop representation of quantum gravity, and also I'm talking to lots of people about an interesting $4$-dimensional formulation of the loop representation in terms of "spin foams" --- roughly speaking, soap-bubble-like structures with faces labelled by spins. Here are some papers I've come across while here: 1) Lee Smolin, "The future of spin networks", in _The Geometric Universe: Science, Geometry, and the Work of Roger Penrose_, eds. S. Hugget, Paul Tod, and L.J. Mason, Oxford University Press, 1998. Also available as [`gr-qc/9702030`](https://arxiv.org/abs/gr-qc/9702030). I've spoken a lot about spin networks here on This Week's Finds. They were first invented by Penrose as a radical alternative to the usual way of thinking of space as a smooth manifold. For him, they were purely discrete, purely combinatorial structures: graphs with edges labelled by "spins" $j = 0, 1/2, 1, 3/2, \ldots$, and with three edges meeting at each vertex. He showed how when these spin networks become sufficiently large and complicated, they begin in certain ways to mimic ordinary 3-dimensional Euclidean space. Interestingly, he never got around to publishing his original paper on the subject, so it remains available only if you know someone who knows someone who has it: 2) Roger Penrose, "Theory of quantized directions", unpublished manuscript. In case you're wondering, I don't have a copy. Someone here has an $n$th-generation xerox copy, which I read, but $n$ was sufficiently large that the $(n+1)$st generation copy would have been unreadable. I will get ahold of it somehow, though! Anyway, Smolin's paper is a kind of tribute to Penrose, and it traces the curiously twisting history of spin networks from their origin up to the present day, where they play a major role in topological quantum field theory and the loop representation --- now more appropriately called the spin network representation! --- of quantum gravity. (See ["Week 55"](#week55) for more on spin networks.) Note however that the title of the paper refers to the *future* of spin networks. Smolin argues that spin networks are a major clue about the future of physics, and he paints a picture of what this future might be... which I urge you to look at. For more on this, try: 3) Fotini Markopoulou and Lee Smolin, "Causal evolution of spin networks", preprint available as [`gr-qc/9702025`](http://arxiv.org/abs/gr-qc/9702025). Fotini Markopoulou is a student of Chris Isham at Imperial College, but now she's visiting the CGPG and working with Lee Smolin on spin networks. In this paper they describe some theories in which spin networks evolve in time in discrete steps. The evolution is "local" in the sense that in a given step, any vertex of the spin network changes in a way that only depends on its immediate neighbors --- vertices connected to it by an edge. It is also "causal" in the sense that history of spin network evolving according to their rules gives a causal set, i.e. a set equipped with a partial ordering which we think of as saying which points come "before" which other points. This ties their work to the work of Rafael Sorkin on causal sets, e.g.: 4) Luca Bombelli, Joohan Lee, David Meyer and Rafael D. Sorkin, "Space-time as a causal set", _Phys. Rev. Lett._ **59** (1987), 521. Unlike the related work of Reisenberger and Rovelli (see ["Week 96"](#week96)), Markopolou and Smolin do not attempt to "derive" their rules from general relativity by standard quantization techniques. Instead, they hope that some theory of the sort they consider will approximate general relativity in the large-scale limit. To check this will require some new techniques akin to the "renormalization group" approach to studying the large-scale limits of statistical mechanical systems defined on a lattice. This is a bit daunting, but it seems likely that no matter how one proceeds to pursue a spin-network-based theory of quantum gravity, one will need to develop such techniques at some point. ------------------------------------------------------------------------ Now I'd like to switch gears and return to... THE TALE OF $n$-CATEGORIES! Recall that in our last episode, in ["Week 92"](#week92), we had worked our way up to $2$-categories, and we were beginning to see what they had to do with $2$-dimensional physics and toplogy. I described how to get monads from adjunctions, and what this has to do with matrix multiplication, Yang-Mills theory, and the 4-color theorem. Next week I want to get serious and start talking about $n$-categories for arbitrary $n$. One reason is that at the end of this month there's a conference on $n$-categories and physics that I want to report on: 5) _Workshop on Higher Category Theory and Physics_, March 28-30, 1997, Northwestern University, Evanston, Illinois. Organized by Ezra Getzler and Mikhail Kapranov; program available at `http://math.nwu.edu/~getzler/conf97.html` But before doing this, I want to say a bit about what category theory has to do with quantum mechanics! First remember the big picture: $n$-category theory is a language to talk about processes that turn processes into other processes. Roughly speaking, an $n$-category is some sort of structure with objects, morphisms between objects, $2$-morphisms between morphisms, and so on up to n-morphisms. A 0-category is just a set, with its objects usually being called "elements". Things get trickier as $n$ increases. For a precise definition of $n$-categories for $n = 1$ and $2$, see ["Week 73"](#week73) and ["Week 80"](#week80), respectively. Most familiar mathematical gadgets are sets equipped with extra bells and whistles: groups, vector spaces, Hilbert spaces, and so on all have underlying sets. This is why set theory plays an important role in mathematics. However, we can also consider fancier gadgets that are *categories* equipped with extra bells and whistles. Some of the most interesting examples are just "categorifications" of well-known gadgets. For example, a "monoid" is a simple gadget, just a set equipped with an associative product and multiplicative identity. An example we all know and love is the complex numbers: the product is just ordinary multiplication, and the multiplicative identity is the number $1$. We may categorify the notion of "monoid" and define a "monoidal category" to be a *category* equipped with an associative product and multiplicative identity. I gave the precise definition back in ["Week 89"](#week89); the point here is that while they may sound scary, monoidal categories are actually very familiar. For example, the category of Hilbert spaces is a monoidal category where the product of Hilbert spaces is the tensor product and the multiplicative identity is $\mathbb{C}$, the complex numbers. If one systematically studies categorification one discovers an amazing fact: many deep-sounding results in mathematics are just categorifications of stuff we all learned in high school. There is a good reason for this, I believe. All along, mathematicians have been unwittingly "decategorifying" mathematics by pretending that categories are just sets. We "decategorify" a category by forgetting about the morphisms and pretending that isomorphic objects are equal. We are left with a mere set: the set of isomorphism classes of objects. I gave an example in ["Week 73"](#week73). There is a category FinSet whose objects are finite sets and whose morphisms are functions. If we decategorify this, we get the set of natural numbers! Why? Well, two finite sets are isomorphic if they have the same number of elements. "Counting" is thus the primordial example of decategorification. I like to think of it in terms of the following fairy tale. Long ago, if you were a shepherd and wanted to see if two finite sets of sheep were isomorphic, the most obvious way would be to look for an isomorphism. In other words, you would try to match each sheep in herd $A$ with a sheep in herd $B$. But one day, along came a shepherd who invented decategorification. This person realized you could take each set and "count" it, setting up an isomorphism between it and some set of "numbers", which were nonsense words like "one, two, three, four,..." specially designed for this purpose. By comparing the resulting numbers, you could see if two herds were isomorphic without explicitly establishing an isomorphism! According to this fairy tale, decategorification started out as the ultimate stroke of mathematical genius. Only later did it become a matter of dumb habit, which we are now struggling to overcome through the process of "categorification". Okay, so what does this have to do with quantum mechanics? Well, a Hilbert space is a set with extra bells and whistles, so maybe there is some gadget called a "2-Hilbert space" which is a *category* with analogous extra bells and whistles. And maybe if we figure out this notion we will learn something about quantum mechanics. Actually the notion of 2-Hilbert space didn't arise in this simple-minded way. It arose in some work by Daniel Freed on topological quantum field theory: 5) "Higher algebraic structures and quantization", by Dan Freed, _Comm. Math. Phys._ **159** (1994), 343--398, preprint available as [`hep-th/9212115`](https://arxiv.org/ps/hep-th/9212115); see also ["Week 48"](#week48). Later, Louis Crane adopted this notion as part of his program to reduce quantum gravity to $n$-category theory: 6) Louis Crane: "Clock and category: is quantum gravity algebraic?", _Jour. Math. Phys._ **36** (1995), 6180--6193, preprint available as [`gr-qc/9504038`](https://arxiv.org/ps/gr-qc/9504038). These papers made is clear that 2-Hilbert spaces are interesting things and that one should go further and think about "$n$-Hilbert spaces" for higher $n$, too. However, neither of them gave a precise definition of 2-Hilbert space, so at some point I decided to do this. It took a while for me to learn enough category theory, but eventually I wrote something about it: 7) John Baez, "Higher-dimensional algebra II: 2-Hilbert spaces", to appear in _Adv. Math._, preprint available as [`q-alg/9609018`](https://arxiv.org/ps/q-alg/9609018) or at `http://math.ucr.edu/home/baez/` To understand this requires a little category theory, so let me explain the basic ideas here. I'll concentrate on finite-dimensional Hilbert spaces, since the infinite-dimensional case introduces extra complications. To define 2-Hilbert spaces we need to start by categorifying the various ingredients in the definition of Hilbert space. These are: 1. the zero element, 2. addition, 3. subtraction, 4. scalar multiplication, and 5. the inner product. The first four have well-known categorical analogs. The fifth one, which is really the essence of a Hilbert space, may seem a bit more mysterious at first, but as we shall see, it's really the key to the whole business. 1) The analog of the zero vector is a 'zero object'. A zero object in a category is an object that is both initial and terminal. That is, there is exactly one morphism from it to any object, and exactly one morphism to it from any object. Consider for example the category $\mathsf{Hilb}$ having finite-dimensional Hilbert spaces as objects, and linear maps between them as morphisms. In $\mathsf{Hilb}$, any zero-dimensional Hilbert space is a zero object. Note: there isn't really a unique zero object in the "strict" sense of the term. Instead, any two zero objects are canonically isomorphic. The reason is that if you have two zero objects, say $0$ and $0'$, there is a unique morphism $f\colon 0\to 0'$ and a unique morphism $g\colon 0'\to 0$. These morphisms are inverses of each other so they are isomorphisms. Why are they inverses? Well, $fg\colon 0\to 0'$ must be the identity morphism $1_0\colon 0 \to 0$, because there is only one morphism from $0$ to $0$! Similarly, $gf$ is the identity on $0'$. (Note that I am using category theorist's notation, where the composite of $f\colon x\to y$ and $g\colon y\to z$ is denoted $fg\colon x\to z$.) This is typical in category theory. We don't expect stuff to be unique; it should only be unique up to a canonical isomorphism. 2) The analog of adding two vectors is forming the "coproduct" of two objects. Coproducts are just a fancy way of talking about direct sums. Any decent quantum mechanic knows about the direct sum of Hilbert spaces. But in fact, we can define this notion very generally in any category, where it goes under the name of a "coproduct". (I give the definition below; if I gave it here it would scare people away.) As with zero objects, coproducts are typically not unique, but they are always unique up to canonical isomorphism, which is what matters. It's a good little exercise to show this. 3) The analog of subtracting vectors is forming the "cokernel" of a morphism $f\colon x\to y$. If $x$ and $y$ are Hilbert spaces, the cokernel of $f$ is just the orthogonal complement of the range of $f$. In other words, for Hilbert spaces we have "direct differences" as well as direct sums. However, the notion of cokernel makes sense in any category with a zero object. I won't burden you with the precise definition here. An important difference between zero, addition and subtraction and their categorical analogs is that these operations represent extra *structure* on a set, while having a zero object, coproducts of two objects, or cokernels of morphisms is merely a *property* of a category. Thus these concepts are in some sense more intrinsic to categories than to sets. On the other hand, we've seen one pays a price for this: while the zero element, sums, and differences are unique in a Hilbert space, the zero object, coproducts, and cokernels are typically unique only up to canonical isomorphism. 4) The analog of multiplying a vector by a complex number is tensoring an object by a Hilbert space. Besides its additive properties (zero object, binary coproducts, and cokernels), $\mathsf{Hilb}$ is also a monoidal category: we can multiply Hilbert space by tensoring them, and there is and a multiplicative identity, namely the complex numbers $\mathbb{C}$. In fact, $\mathsf{Hilb}$ is a "ring category", as defined by Laplaza and Kelly. We expect $\mathsf{Hilb}$ to play a role in 2-Hilbert space theory analogous to the role played by the ring $\mathbb{C}$ of complex numbers in Hilbert space theory. Thus we expect 2-Hilbert spaces to be "module categories" over $\mathsf{Hilb}$, as defined by Kapranov and Voevodsky. An important part of our philosophy here is that $\mathbb{C}$ is the primordial Hilbert space: the simplest one, upon which the rest are modelled. By analogy, we expect $\mathsf{Hilb}$ to be the primordial 2-Hilbert space. This is part of a general pattern pervading higher-dimensional algebra; for example, there is a sense in which the $(n+1)$-category of all (small) $n$-categories, $n\mathsf{Cat}$, is the primordial $(n+1)$-category. The real significance of this pattern remains mysterious. 5) Finally, what is the categorification of the inner product in a Hilbert space? It's the '$\operatorname{Hom}$ functor'! The inner product in a Hilbert space eats two vectors $v$ and $w$ and spits out a complex number $$\langle v,w \rangle$$ Similarly, given two objects $v$ and $w$ in a category, the $\operatorname{Hom}$ functor gives a *set* $$\operatorname{Hom}(x,y)$$ namely the set of morphisms from $x$ to $y$. Note that the inner product $\langle v,w \rangle$ is linear in $w$ and conjugate-linear in $y$, and similarly, the $\operatorname{Hom}$ functor $\operatorname{Hom}(x,y)$ is covariant in $y$ and contravariant in $x$. This hints at the category theory secretly underlying quantum mechanics. In quantum theory the inner product $\langle v,w \rangle$ represents the *amplitude* to pass from $v$ to $w$, while in category theory $\operatorname{Hom}(x,y)$ is the *set* of ways to get from $x$ to $y$. In Feynman path integrals, we do an integral over the set of ways to get from here to there, and get a number, the amplitude to get from here to there. So when physicists do Feynman path integration --- just like a shepherd counting sheep --- they are engaged in a process of decategorification! To understand this analogy better, note that any morphism $f\colon x\to y$ in $\mathsf{Hilb}$ can be turned around or "dualized" to obtain a morphism $f^*\colon y\to x$. This is usually called the "adjoint" of $f$, and it satisfies $$\langle fv,w \rangle = \langle v,f^*w \rangle$$ for all $v$ in $x$, and $w$ in $y$. This ability to dualize morphisms is crucial to quantum theory. For example, observables are represented by self-adjoint morphisms, while symmetries are represented by unitary morphisms, whose adjoint equals their inverse. However, it should now be clear --- at least to the categorically minded --- that this sort of adjoint is just a decategorified version of the "adjoint functors" so important in category theory. As I explained in ["Week 79"](#week79), a functor $F^*\colon\mathcal{D}\to\mathcal{C}$ is a "right adjoint" of $F\colon\mathcal{C}\to\mathcal{D}$ if there is, not an equation, but a natural isomorphism $$\operatorname{Hom}(Fc,d) \cong \operatorname{Hom}(c,F^*d)$$ for all objects $c$ in $\mathcal{C}$, and $d in $\mathcal{D}$. Anyway, in the paper I proceed to use these ideas to give a precise definition of 2-Hilbert spaces, and then I prove all sorts of stuff which I won't describe here. Let me wrap up by explaining the definition of "coproduct". This is one of those things they should teach all math grad students, but for some reason they don't. It's a bit dry but it'll be good for you. A coproduct of the objects $x$ and $y$ is an object $x+y$ equipped with morphisms $$i\colon x \to x+y$$ and $$j\colon y \to x+y$$ that is universal with respect to this property. In other words, if we have any *other* object, say $z$, and morphisms $$i'\colon x \to z$$ and $$j'\colon y \to z$$ then there is a unique morphism $f\colon x+y \to z$ such that $$i' = if$$ and $$j' = jf.$$ This kind of definition automatically implies that the coproduct is unique up to canonical isomorphism. To understand this abstract nonsense, it's good to check that the coproduct of sets or topological spaces is just their disjoint union, while the coproduct of vector spaces or Hilbert spaces is their direct sum. To continue reading the "Tale of $n$-Categories", see ["Week 100"](#week100).