Monstrous moonshine
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In mathematics, monstrous moonshine, or moonshine theory, is the unexpected connection between the monster group M and modular functions, in particular, the j function. The term was coined by John Conway and Simon P. Norton in 1979.
It is now known that lying behind monstrous moonshine is a vertex operator algebra called the moonshine module (or monster vertex algebra) constructed by Igor Frenkel, James Lepowsky, and Arne Meurman in 1988, having the monster group as symmetries. This vertex operator algebra is commonly interpreted as a structure underlying a twodimensional conformal field theory, allowing physics to form a bridge between two mathematical areas. The conjectures made by Conway and Norton were proven by Richard Borcherds for the moonshine module in 1992 using the noghost theorem from string theory and the theory of vertex operator algebras and generalized Kac–Moody algebras.
Contents
History[edit]
In 1978, John McKay found that the first few terms in the Fourier expansion of the normalized Jinvariant (sequence A014708 in the OEIS),
with and τ as the halfperiod ratio could be expressed in terms of linear combinations of the dimensions of the irreducible representations of the monster group M (sequence A001379 in the OEIS) with small nonnegative coefficients. Let = 1, 196883, 21296876, 842609326, 18538750076, 19360062527, 293553734298, ... then,
(Since there can be several linear relations between the such as , the representation may be in more than one way.) McKay viewed this as evidence that there is a naturally occurring infinitedimensional graded representation of M, whose graded dimension is given by the coefficients of J, and whose lowerweight pieces decompose into irreducible representations as above. After he informed John G. Thompson of this observation, Thompson suggested that because the graded dimension is just the graded trace of the identity element, the graded traces of nontrivial elements g of M on such a representation may be interesting as well.
Conway and Norton computed the lowerorder terms of such graded traces, now known as McKay–Thompson series T_{g}, and found that all of them appeared to be the expansions of Hauptmoduln. In other words, if G_{g} is the subgroup of SL_{2}(R) which fixes T_{g}, then the quotient of the upper half of the complex plane by G_{g} is a sphere with a finite number of points removed, and furthermore, T_{g} generates the field of meromorphic functions on this sphere.
Based on their computations, Conway and Norton produced a list of Hauptmoduln, and conjectured the existence of an infinite dimensional graded representation of M, whose graded traces T_{g} are the expansions of precisely the functions on their list.
In 1980, A. Oliver L. Atkin, Paul Fong and Stephen D. Smith produced strong computational evidence that such a graded representation exists, by decomposing a large number of coefficients of J into representations of M. A graded representation whose graded dimension is J, called the moonshine module, was explicitly constructed by Igor Frenkel, James Lepowsky, and Arne Meurman, giving an effective solution to the McKay–Thompson conjecture, and they also determined the graded traces for all elements in the centralizer of an involution of M, partially settling the Conway–Norton conjecture. Furthermore, they showed that the vector space they constructed, called the Moonshine Module , has the additional structure of a vertex operator algebra, whose automorphism group is precisely M.
Borcherds proved the Conway–Norton conjecture for the Moonshine Module in 1992. He won the Fields Medal in 1998 in part for his solution of the conjecture.
The monster module[edit]
The Frenkel–Lepowsky–Meurman construction starts with two main tools:
 The construction of a lattice vertex operator algebra V_{L} for an even lattice L of rank n. In physical terms, this is the chiral algebra for a bosonic string compactified on a torus R^{n}/L. It can be described roughly as the tensor product of the group ring of L with the oscillator representation in n dimensions (which is itself isomorphic to a polynomial ring in countably infinitely many generators). For the case in question, one sets L to be the Leech lattice, which has rank 24.
 The orbifold construction. In physical terms, this describes a bosonic string propagating on a quotient orbifold. The construction of Frenkel–Lepowsky–Meurman was the first time orbifolds appeared in conformal field theory. Attached to the –1 involution of the Leech lattice, there is an involution h of V_{L}, and an irreducible htwisted V_{L}module, which inherits an involution lifting h. To get the Moonshine Module, one takes the fixed point subspace of h in the direct sum of V_{L} and its twisted module.
Frenkel, Lepowsky, and Meurman then showed that the automorphism group of the moonshine module, as a vertex operator algebra, is M. Furthermore, they determined that the graded traces of elements in the subgroup 2^{1+24}.Co_{1} match the functions predicted by Conway and Norton (Frenkel, Lepowsky & Meurman (1988)).
Borcherds' proof[edit]
Richard Borcherds' proof of the conjecture of Conway and Norton can be broken into the following major steps:
 One begins with a vertex operator algebra V with an invariant bilinear form, an action of M by automorphisms, and with known decomposition of the homogeneous spaces of seven lowest degrees into irreducible Mrepresentations. This was provided by Frenkel–Lepowsky–Meurman's construction and analysis of the Moonshine Module.
 A Lie algebra , called the monster Lie algebra, is constructed from V using a quantization functor. It is a generalized Kac–Moody Lie algebra with a monster action by automorphisms. Using the Goddard–Thorn "noghost" theorem from string theory, the root multiplicities are found to be coefficients of J.
 One uses the Koike–Norton–Zagier infinite product identity to construct a generalized Kac–Moody Lie algebra by generators and relations. The identity is proved using the fact that Hecke operators applied to J yield polynomials in J.
 By comparing root multiplicities, one finds that the two Lie algebras are isomorphic, and in particular, the Weyl denominator formula for is precisely the Koike–Norton–Zagier identity.
 Using Lie algebra homology and Adams operations, a twisted denominator identity is given for each element. These identities are related to the McKay–Thompson series T_{g} in much the same way that the Koike–Norton–Zagier identity is related to J.
 The twisted denominator identities imply recursion relations on the coefficients of T_{g}, and unpublished work of Koike showed that Conway and Norton's candidate functions satisfied these recursion relations. These relations are strong enough that one only needs to check that the first seven terms agree with the functions given by Conway and Norton. The lowest terms are given by the decomposition of the seven lowest degree homogeneous spaces given in the first step.
Thus, the proof is completed (Borcherds (1992)). Borcherds was later quoted as saying "I was over the moon when I proved the moonshine conjecture", and "I sometimes wonder if this is the feeling you get when you take certain drugs. I don't actually know, as I have not tested this theory of mine."^{[1]}
More recent work has simplified and clarified the last steps of the proof. Jurisich (Jurisich (1998), Jurisich, Lepowsky & Wilson (1995)) found that the homology computation could be substantially shortened by replacing the usual triangular decomposition of the Monster Lie algebra with a decomposition into a sum of gl_{2} and two free Lie algebras. Cummins and Gannon showed that the recursion relations automatically imply the McKay Thompson series are either Hauptmoduln or terminate after at most 3 terms, thus eliminating the need for computation at the last step.
Generalized moonshine[edit]
Conway and Norton suggested in their 1979 paper that perhaps moonshine is not limited to the monster, but that similar phenomena may be found for other groups.^{[2]} While Conway and Norton's claims were not very specific, computations by Larissa Queen in 1980 strongly suggested that one can construct the expansions of many Hauptmoduln from simple combinations of dimensions of irreducible representations of sporadic groups. In particular, she decomposed the coefficients of McKayThompson series into representations of subquotients of the Monster in the following cases:
 T_{2B} and T_{4A} into representations of the Conway group Co_{0}
 T_{3B} and T_{6B} into representations of the Suzuki group 3.2.Suz
 T_{3C} into representations of the Thompson group Th = F_{3}
 T_{5A} into representations of the Harada–Norton group HN = F_{5}
 T_{5B} and T_{10D} into representations of the Hall–Janko group 2.HJ
 T_{7A} into representations of the Held group He = F_{7}
 T_{7B} and T_{14C} into representations of 2.A_{7}
 T_{11A} into representations of the Mathieu group 2.M_{12}
Queen found that the traces of nonidentity elements also yielded qexpansions of Hauptmoduln, some of which were not McKay–Thompson series from the Monster. In 1987, Norton combined Queen's results with his own computations to formulate the Generalized Moonshine conjecture. This conjecture asserts that there is a rule that assigns to each element g of the monster, a graded vector space V(g), and to each commuting pair of elements (g,h) a holomorphic function f(g,h,τ) on the upper halfplane, such that:
 Each V(g) is a graded projective representation of the centralizer of g in M.
 Each f(g,h,τ) is either a constant function, or a Hauptmodul.
 Each f(g,h,τ) is invariant under simultaneous conjugation of g and h in M, up to a scalar ambiguity.
 For each (g,h), there is a lift of h to a linear transformation on V(g), such that the expansion of f(g,h,τ) is given by the graded trace.
 For any , is proportional to .
 f(g,h,τ) is proportional to J if and only if g = h = 1.
This is a generalization of the Conway–Norton conjecture, because Borcherds's theorem concerns the case where g is set to the identity.
Like the Conway–Norton conjecture, Generalized Moonshine also has an interpretation in physics, proposed by Dixon–Ginsparg–Harvey in 1988 (Dixon, Ginsparg & Harvey (1989)). They interpreted the vector spaces V(g) as twisted sectors of a conformal field theory with monster symmetry, and interpreted the functions f(g,h,τ) as genus one partition functions, where one forms a torus by gluing along twisted boundary conditions. In mathematical language, the twisted sectors are irreducible twisted modules, and the partition functions are assigned to elliptic curves with principal monster bundles, whose isomorphism type is described by monodromy along a basis of 1cycles, i.e., a pair of commuting elements.
Conjectured relationship with quantum gravity[edit]
In 2007, E. Witten suggested that AdS/CFT correspondence yields a duality between pure quantum gravity in (2+1)dimensional anti de Sitter space and extremal holomorphic CFTs. Pure gravity in 2+1 dimensions has no local degrees of freedom, but when the cosmological constant is negative, there is nontrivial content in the theory, due to the existence of BTZ black hole solutions. Extremal CFTs, introduced by G. Höhn, are distinguished by a lack of Virasoro primary fields in low energy, and the moonshine module is one example.
Under Witten's proposal (Witten (2007)), gravity in AdS space with maximally negative cosmological constant is AdS/CFT dual to a holomorphic CFT with central charge c=24, and the partition function of the CFT is precisely j744, i.e., the graded character of the moonshine module. By assuming FrenkelLepowskyMeurman's conjecture that moonshine module is the unique holomorphic VOA with central charge 24 and character j744, Witten concluded that pure gravity with maximally negative cosmological constant is dual to the monster CFT. Part of Witten's proposal is that Virasoro primary fields are dual to blackholecreating operators, and as a consistency check, he found that in the largemass limit, the BekensteinHawking semiclassical entropy estimate for a given black hole mass agrees with the logarithm of the corresponding Virasoro primary multiplicity in the moonshine module. In the lowmass regime, there is a small quantum correction to the entropy, e.g., the lowest energy primary fields yield log(196883) ~ 12.19, while the Bekenstein–Hawking estimate gives 4π ~ 12.57.
Later work has refined Witten's proposal. Witten had speculated that the extremal CFTs with larger cosmological constant may have monster symmetry much like the minimal case, but this was quickly ruled out by independent work of Gaiotto and Höhn. Work by Witten and Maloney (Maloney & Witten (2007)) suggested that pure quantum gravity may not satisfy some consistency checks related to its partition function, unless some subtle properties of complex saddles work out favorably. However, Li–Song–Strominger (Li, Song & Strominger (2008)) have suggested that a chiral quantum gravity theory proposed by Manschot in 2007 may have better stability properties, while being dual to the chiral part of the monster CFT, i.e., the monster vertex algebra. Duncan–Frenkel (Duncan & Frenkel (2009)) produced additional evidence for this duality by using Rademacher sums to produce the McKay–Thompson series as 2+1 dimensional gravity partition functions by a regularized sum over global torusisogeny geometries. Furthermore, they conjectured the existence of a family of twisted chiral gravity theories parametrized by elements of the monster, suggesting a connection with generalized moonshine and gravitational instanton sums. At present, all of these ideas are still rather speculative, in part because 3d quantum gravity does not have a rigorous mathematical foundation.
Mathieu moonshine[edit]
In 2010, Tohru Eguchi, Hirosi Ooguri, and Yuji Tachikawa observed that the elliptic genus of a K3 surface can be decomposed into characters of the N=(4,4) superconformal algebra, such that the multiplicities of massive states appear to be simple combinations of irreducible representations of the Mathieu group M24. This suggests that there is a sigmamodel conformal field theory with K3 target that carries M24 symmetry. However, by the Mukai–Kondo classification, there is no faithful action of this group on any K3 surface by symplectic automorphisms, and by work of Gaberdiel–Hohenegger–Volpato, there is no faithful action on any K3 sigmamodel conformal field theory, so the appearance of an action on the underlying Hilbert space is still a mystery.
By analogy with McKay–Thompson series, Cheng suggested that both the multiplicity functions and the graded traces of nontrivial elements of M24 form mock modular forms. In 2012, Gannon proved that all but the first of the multiplicities are nonnegative integral combinations of representations of M24, and Gaberdiel–Persson–Ronellenfitsch–Volpato computed all analogues of generalized moonshine functions, strongly suggesting that some analogue of a holomorphic conformal field theory lies behind Mathieu moonshine. Also in 2012, Cheng, Duncan, and Harvey amassed numerical evidence of an umbral moonshine phenomenon where families of mock modular forms appear to be attached to Niemeier lattices. The special case of the A_{1}^{24} lattice yields Mathieu Moonshine, but in general the phenomenon does not yet have an interpretation in terms of geometry.
Origin of the term[edit]
The term "monstrous moonshine" was coined by Conway, who, when told by John McKay in the late 1970s that the coefficient of (namely 196884) was precisely one more than the degree of the smallest faithful complex representation of the monster group (namely 196883), replied that this was "moonshine" (in the sense of being a crazy or foolish idea).^{[3]} Thus, the term not only refers to the monster group M; it also refers to the perceived craziness of the intricate relationship between M and the theory of modular functions.
The monster group was investigated in the 1970s by mathematicians JeanPierre Serre, Andrew Ogg and John G. Thompson; they studied the quotient of the hyperbolic plane by subgroups of SL_{2}(R), particularly, the normalizer Γ_{0}(p)^{+} of Γ_{0}(p) in SL(2,R). They found that the Riemann surface resulting from taking the quotient of the hyperbolic plane by Γ_{0}(p)^{+} has genus zero if and only if p is 2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 41, 47, 59 or 71. When Ogg heard about the monster group later on, and noticed that these were precisely the prime factors of the size of M, he published a paper offering a bottle of Jack Daniel's whiskey to anyone who could explain this fact (Ogg (1974)).
Notes[edit]
 ^ Roberts, Siobhan (2009), King of Infinite Space: Donald Coxeter, the Man Who Saved Geometry, Bloomsbury Publishing USA, p. 361, ISBN 9780802718327.
 ^ Conway, J. and Norton, S. "Monstrous Moonshine", Table 2a, p.330, http://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.103.3704&rep=rep1&type=pdf
 ^ World Wide Words: Moonshine
References[edit]
 Conway, John Horton; Norton, Simon P. (1979). "Monstrous Moonshine". Bull. London Math. Soc. 11 (3): 308–339. doi:10.1112/blms/11.3.308. MR 0554399.
 Frenkel, Igor B.; Lepowsky, James; Meurman, Arne (1988). Vertex Operator Algebras and the Monster. Pure and Applied Math. 134. Academic Press. MR 0996026.
 Borcherds, Richard (1992), "Monstrous Moonshine and Monstrous Lie Superalgebras" (PDF), Invent. Math., 109: 405–444, Bibcode:1992InMat.109..405B, CiteSeerX 10.1.1.165.2714, doi:10.1007/bf01232032, MR 1172696
 Jurisich, Elizabeth (1998). "Generalized Kac–Moody Lie algebras, free Lie algebras, and the structure of the Monster Lie algebra". Jour. Pure and Appl. Algebra. 126 (1–3): 233–266. arXiv:1311.3258. doi:10.1016/s00224049(96)001429.
 Jurisich, E.; Lepowsky, J.; Wilson, R.L. (1995). "Realizations of the Monster Lie Algebra". Selecta Math. New Series. 1: 129–161. arXiv:hepth/9408037. doi:10.1007/bf01614075.
 Cummins, C. J.; Gannon, T (1997). "Modular equations and the genus zero property of moonshine functions". Invent. Math. 129 (3): 413–443. Bibcode:1997InMat.129..413C. doi:10.1007/s002220050167.
 Gannon, Terry (2006). "Monstrous Moonshine: The first twentyfive years". Bull. London Math. Soc. 38 (1): 1–33. arXiv:math.QA/0402345. doi:10.1112/S0024609305018217. MR 2201600.
 Terry Gannon, Monstrous Moonshine and the Classification of Conformal Field Theories, reprinted in Conformal Field Theory, New NonPerturbative Methods in String and Field Theory, (2000) Yavuz Nutku, Cihan Saclioglu, Teoman Turgut, eds. Perseus Publishing, Cambridge Mass. ISBN 0738202045 (Provides introductory reviews to applications in physics).
 Gannon, Terry (2006), Moonshine beyond the Monster: The Bridge Connecting Algebra, Modular Forms and Physics, ISBN 9780521835312
 Dixon, L.; Ginsparg, P.; Harvey, J. (1989), "Beauty and the Beast: superconformal symmetry in a Monster module", Comm. Math. Phys., 119 (2): 221–241, Bibcode:1988CMaPh.119..221D, doi:10.1007/bf01217740
 Witten, Edward (22 June 2007), ThreeDimensional Gravity Revisited, arXiv:0706.3359, Bibcode:2007arXiv0706.3359W
 Maloney, Alexander; Witten, Edward (2010), "Quantum Gravity Partition Functions In Three Dimensions", J. High Energy Phys., 2010 (2): 29, arXiv:0712.0155, Bibcode:2010JHEP...02..029M, doi:10.1007/JHEP02(2010)029, MR 2672754
 Li, Wei; Song, Wei; Strominger, Andrew (21 July 2008), "CHIRAL GRAVITY IN THREE DIMENSIONS", Journal of High Energy Physics, 2008 (4): 082, arXiv:0801.4566, Bibcode:2008JHEP...04..082L, doi:10.1088/11266708/2008/04/082
 Duncan, John F. R.; Frenkel, Igor B. (2012), Rademacher sums, moonshine and gravity, arXiv:0907.4529, Bibcode:2009arXiv0907.4529D
 Maloney, Alexander; Song, Wei; Strominger, Andrew (2010), "Chiral gravity, log gravity, and extremal CFT", Phys. Rev. D, 81 (6): 064007, arXiv:0903.4573, Bibcode:2010PhRvD..81f4007M, doi:10.1103/physrevd.81.064007
 Koichiro Harada, Monster(1999) Iwanami Pub. ISBN 4000060554, (The first book about the Monster Group written in Japanese).
 Koichiro Harada (2010) "Moonshine" of Finite Groups, European Mathematical Society ISBN 9783037190906 MR2722318
 Mark Ronan, Symmetry and the Monster, Oxford University Press, 2006. ISBN 9780192807236 (Concise introduction for the lay reader).
 Marcus du Sautoy, Finding Moonshine, A Mathematician's Journey Through Symmetry. Fourth Estate, 2008 ISBN 0007214618, ISBN 9780007214617
 Ogg, Andrew P. (1974), "Automorphismes de courbes modulaires" (PDF), Seminaire DelangePisotPoitou. Theorie des nombres, tome 16, no. 1 (1974–1975), exp. no. 7 (in French), MR 0417184
External links[edit]
 Moonshine Bibliography at the Wayback Machine (archived December 5, 2006)