Advanced search
Publication Cover
Experimental Mathematics Volume 28, 2019 - Issue 3
Submit an article Journal homepage
171
Views
2
CrossRef citations to date
0
Altmetric
Original Articles

Computing Kazhdan Constants by Semidefinite Programming

Koji FujiwaraDepartment of Mathematics, Kyoto University, Japan
&
Yuichi KabayaDepartment of Mathematics, Kyoto University, JapanCorrespondence[email protected]
Pages 301-312 | Published online: 29 Nov 2017

References

  • [Bacher and Harpe 94] R. Bacher and P. de la Harpe. “Exact Values of Kazhdan Constants for Some Finite Groups.” J. Algebra 163 (1994), 495–515.
  • [Bader et al. XX] U. Bader, P.-E. Caprace, and J. Lecureux. “On the Linearity of Lattices in Affine Buildings and Ergodicity of the Singular Cartan Flow.” arXiv:1608.06265
  • [Bagno 04] E. Bagno. “Kazhdan Constants of Some Colored Permutation Groups.” J. Algebra 282 (2004), 205–231.
  • [Ballmann and Świątkowski 97] W. Ballmann and J. Świątkowski. “On L2-cohomology and Property (T) for Automorphism Groups of Polyhedral Cell Complexes.” Geom. Funct. Anal. 7:4 (1997), 615–645.
  • [Bekka et al. 08] B. Bekka, P. de la Harpe, and A. Valette. Kazhdan’s Property (T), New Mathematical Monographs, 11. pp. xiv+472. Cambridge: Cambridge University Press, 2008.
  • [Bekka et al. 98] M. Broué, G. Malle, and R. Rouquier. “Complex Reflection Groups, Braid Groups, Hecke Algebras.” J. Reine Angew. Math. 500 (1998), 127–190.
  • [Brown and Ozawa 08] N. P. Brown and N. Ozawa. C*-Algebras and Finite-Dimensional Approximations, Graduate Studies in Mathematics, vol. 88. Providence, RI: American Mathematical Society, 2008.
  • [Cartwright et al. 93a] D. I. Cartwright, A. M. Mantero, T. Steger, and A. Zappa. “Groups Acting Simply Transitively on the Vertices of a Building of type A˜2, I.” Geom. Dedicata 47:2 (1993a), 143–166.
  • [Cartwright et al. 93b] D. I. Cartwright, A. M. Mantero, T. Steger, and A. Zappa. “Groups Acting Simply Transitively on the Vertices of a Building of Type A˜2, II: The cases q = 2 and q = 3.” Geom. Dedicata 47:2 (1993b), 167–223.
  • [Cartwright et al. 94] D. I. Cartwright, W. Młotkowski, and T. Steger. “Property (T) and A˜2 Groups.” Ann. Inst. Fourier (Grenoble) 44 (1994), 213–248.
  • [Essert 13] J. Essert. “A Geometric Construction of Panel-Regular Lattices for Buildings of Types A˜2 and C˜2.” Algebr. Geom. Topol. 13:3 (2013), 1531–1578.
  • [Floyd and Parry 97] W. Floyd and W. Parry. “The Growth of Nonpositively Curved Triangles of Groups.” Invent. Math. 129:2 (1997), 289–359.
  • [Kassabov 05] M. Kassabov. “Kazhdan Constants for SLn(Z).” Internat. J. Algebra Comput. 15:5–6 (2005), 971–995.
  • [Kassabov 11] M. Kassabov. “Subspace Arrangements and Property T.” Groups Geom. Dyn. 5:2 (2011), 445–477.
  • [Kawakami 15] R. Kawakami. “Kazhdan’s Property(T) and Semi-Definite Programming.” Master Thesis paper, Kyoto University, 2015.
  • [Köhler et al. 84a] P. Köhler, T. Meixner, and M. Wester. “Triangle Groups.” Comm. Algebra 12:13–14 (1984a), 1595–1625.
  • [Köhler et al. 84b] P. Köhler, T. Meixner, and M. Wester. “The Affine Building of Type A˜2 over a Local Field of Characteristic Two.” Arch. Math. (Basel) 42:5 (1984b), 400–407.
  • [Ozawa 16] N. Ozawa. “Noncommutative Real Algebraic Geometry of Kazhdan’s Property (T).” J. Inst. Math. Jussieu 15:1 (2016), 85–90. arXiv:1312.5431.
  • [Milnor 71] J. Milnor. Introduction to Algebraic K-Theory. Annals of Mathematics Studies, No. 72. Princeton, NJ: University of Tokyo Press, Tokyo, xiii+184 pp.
  • [Netzer and Thom 15] T. Netzer and A. Thom. “Kazhdan’s Property (T) via Semidefinite Optimization.” Exp. Math. 24:3 (2015), 371–374. http://arxiv.org/abs/1411.2488, arXiv:1411.2488.
  • [Pansu 98] P. Pansu. “Formules de Matsushima, de Garland et propriété (T) pour des groupes agissant sur des espaces symétriques ou des immeubles.” Bull. Soc. Math. France 126:1 (1998), 107–139.
  • [Ronan 84] M. A. Ronan. “Triangle geometries.” J. Combin. Theory Ser. A 37:3 (1984), 294–319.
  • [Shalom 99] Y. Shalom. “Bounded Generation and Kazhdan’s Property (T).” Publications Mathématiques de l’IHÉS 90 (1999), 145–168.
  • [Shephard and Todd 54] G. Shephard and J. Todd. “Finite Unitary Reflection Groups.” Canadian J. Math. 6 (1954), 274–304.
  • [Speyer 13] D. Speyer. “How feasible is it to prove Kazhdan’s property (T) by a computer?, an answer to MathOverflow question.” Available online (http://mathoverflow.net/a/154459)
  • [Stallings 90] J. R. Stallings. Non-Positively Curved Triangles of Groups, Group theory from a geometrical viewpoint (Trieste, 1990), 491–503, River Edge, NJ: World Sci. Publ, 1991.
  • [Tits 85] J. Tits. “Buildings and Group Amalgamations.” Proceedings of groups–St. Andrews 1985, 110–127, London Math. Soc. Lecture Note Ser., 121, Cambridge Univ. Press, Cambridge, 1986.
  • [Zuk 96] A. Zuk. “La propriété (T) de Kazhdan pour les groupes agissant sur les polyèdres,” C. R. Acad. Sci. Paris 323, Serie I (1996), 453–458.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.