Modular categories, integrality and Egyptian fractions

Bruillard, Paul; Rowell, Eric

doi:10.1090/S0002-9939-2011-11476-X

Modular categories, integrality and Egyptian fractions
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by Paul Bruillard and Eric C. Rowell PDF

Proc. Amer. Math. Soc. 140 (2012), 1141-1150 Request permission

Abstract:

It is a well-known result of Etingof, Nikshych and Ostrik that there are finitely many inequivalent integral modular categories of any fixed rank $n$. This follows from a double-exponential bound on the maximal denominator in an Egyptian fraction representation of $1$. A naïve computer search approach to the classification of rank $n$ integral modular categories using this bound quickly overwhelms the computer’s memory (for $n\geq 7$). We use a modified strategy: find general conditions on modular categories that imply integrality and study the classification problem in these limited settings. The first such condition is that the order of the twist matrix is $2,3,4$ or $6$, and we obtain a fairly complete description of these classes of modular categories. The second condition is that the unit object is the only simple non-self-dual object, which is equivalent to odd-dimensionality. In this case we obtain a (linear) improvement on the bounds and employ number-theoretic techniques to obtain a classification for rank at most $11$ for odd-dimensional modular categories.

References

Bojko Bakalov and Alexander Kirillov Jr., Lectures on tensor categories and modular functors, University Lecture Series, vol. 21, American Mathematical Society, Providence, RI, 2001. MR 1797619, DOI 10.1090/ulect/021
Michael Cuntz, Integral modular data and congruences, J. Algebraic Combin. 29 (2009), no. 3, 357–387. MR 2496312, DOI 10.1007/s10801-008-0139-y
D. R. Curtiss, On $\text {K}$ellogg’s diophantine problem, Amer. Math. Monthly 29 (1922), 380–387.
V. Drinfeld, S. Gelaki, D. Nikshych, and V. Ostrik, Group-theoretical properties of nilpotent modular categories (2010). arXiv:0704.0195
Vladimir Drinfeld, Shlomo Gelaki, Dmitri Nikshych, and Victor Ostrik, On braided fusion categories. I, Selecta Math. (N.S.) 16 (2010), no. 1, 1–119. MR 2609644, DOI 10.1007/s00029-010-0017-z
Pavel Etingof and Shlomo Gelaki, Some properties of finite-dimensional semisimple Hopf algebras, Math. Res. Lett. 5 (1998), no. 1-2, 191–197. MR 1617921, DOI 10.4310/MRL.1998.v5.n2.a5
Pavel Etingof, Dmitri Nikshych, and Viktor Ostrik, On fusion categories, Ann. of Math. (2) 162 (2005), no. 2, 581–642. MR 2183279, DOI 10.4007/annals.2005.162.581
Pavel Etingof, Dmitri Nikshych, and Victor Ostrik, Weakly group-theoretical and solvable fusion categories, Adv. Math. 226 (2011), no. 1, 176–205. MR 2735754, DOI 10.1016/j.aim.2010.06.009
Terry Gannon, Modular data: the algebraic combinatorics of conformal field theory, J. Algebraic Combin. 22 (2005), no. 2, 211–250. MR 2164398, DOI 10.1007/s10801-005-2514-2
Shlomo Gelaki, Deepak Naidu, and Dmitri Nikshych, Centers of graded fusion categories, Algebra Number Theory 3 (2009), no. 8, 959–990. MR 2587410, DOI 10.2140/ant.2009.3.959
Shlomo Gelaki and Dmitri Nikshych, Nilpotent fusion categories, Adv. Math. 217 (2008), no. 3, 1053–1071. MR 2383894, DOI 10.1016/j.aim.2007.08.001
Richard K. Guy, Unsolved problems in number theory, 3rd ed., Problem Books in Mathematics, Springer-Verlag, New York, 2004. MR 2076335, DOI 10.1007/978-0-387-26677-0
Seung-moon Hong and Eric Rowell, On the classification of the Grothendieck rings of non-self-dual modular categories, J. Algebra 324 (2010), no. 5, 1000–1015. MR 2659210, DOI 10.1016/j.jalgebra.2009.11.044
E. Landau, Über die $\text {Klassenzahl}$ der binären quadratischen $\text {Formen}$ von negativer $\text {Discriminante}$, Math. Ann. 50 (1903), 671–676.
D. Naidu and E. C. Rowell, A finiteness property for braided fusion categories, Algebr. Represent. Theory 14 (2011), no. 5, 837–855.
Siu-Hung Ng, Non-commutative, non-cocommutative semisimple Hopf algebras arise from finite abelian groups, Groups, rings, Lie and Hopf algebras (St. John’s, NF, 2001) Math. Appl., vol. 555, Kluwer Acad. Publ., Dordrecht, 2003, pp. 167–177. MR 1995058
Siu-Hung Ng and Peter Schauenburg, Frobenius-Schur indicators and exponents of spherical categories, Adv. Math. 211 (2007), no. 1, 34–71. MR 2313527, DOI 10.1016/j.aim.2006.07.017
Siu-Hung Ng and Peter Schauenburg, Congruence subgroups and generalized Frobenius-Schur indicators, Comm. Math. Phys. 300 (2010), no. 1, 1–46. MR 2725181, DOI 10.1007/s00220-010-1096-6
Online encyclopedia of integer sequences, 2010. http://www.research.att.com/njas/sequences/.
Viktor Ostrik, Fusion categories of rank 2, Math. Res. Lett. 10 (2003), no. 2-3, 177–183. MR 1981895, DOI 10.4310/MRL.2003.v10.n2.a5
Victor Ostrik, Pre-modular categories of rank 3, Mosc. Math. J. 8 (2008), no. 1, 111–118, 184 (English, with English and Russian summaries). MR 2422269, DOI 10.17323/1609-4514-2008-8-1-111-118
Eric C. Rowell, From quantum groups to unitary modular tensor categories, Representations of algebraic groups, quantum groups, and Lie algebras, Contemp. Math., vol. 413, Amer. Math. Soc., Providence, RI, 2006, pp. 215–230. MR 2263097, DOI 10.1090/conm/413/07848
Eric Rowell, Richard Stong, and Zhenghan Wang, On classification of modular tensor categories, Comm. Math. Phys. 292 (2009), no. 2, 343–389. MR 2544735, DOI 10.1007/s00220-009-0908-z
T. Takenouchi, On an indeterminate equation, Proceedings of the Physico-Mathematical Society of Japan 3 (1921), 78–92.
Vladimir G. Turaev, Modular categories and $3$-manifold invariants, Internat. J. Modern Phys. B 6 (1992), no. 11-12, 1807–1824. Topological and quantum group methods in field theory and condensed matter physics. MR 1186845, DOI 10.1142/S0217979292000876