http://orcid.org/0000-0002-0543-476X
References
- Brauer, R. (1937). On algebras which are connected with the semisimple continuous groups. Ann. Math. 38(4):857–872.
- Cao, Y. Z. (2003). On the quasi-heredity and the semi-simplicity of cellular algebras. J. Algebra. 267(1):323–341.
- Cline, E., Parshall, B., Scott, L. (1988). Finite-dimensional algebras and highest weight categories. J. Reine. Angew. Math. 391:85–99.
- Cox, A. G., Visscher, M., Martin, P. P. (2009). The blocks of the Brauer algebra in characteristic zero. Represent. Theory 13(13):272–308.
- Donkin, S. (1998). The q-Schur Algebra. Cambridge: Cambridge University Press.
- Graham, J. J., Lehrer, G. I. (1996). Cellular algebras. Invent. Math. 123(1):1–34.
- Jones, V. (1994). The Potts Model and the Symmetric Group. In: Subfactors. River Edge, NJ: World Science Publishing, pp. 259–267.
- König, S., Xi, C. (2001). A characteristic free approach to Brauer algebras. Trans. Am. Math. Soc. 353(4):1489–1505.
- König, S., Xi, C. (1999). Cellular algebras and quasi-hereditary algebras: a comparison. Electron. Res. Announ. Am. Math. Soc. 5(10):71–75.
- König, S., Xi, C. (1999). When is a cellular algebra quasi-hereditary. Math. Ann. 315(2):281–293.
- Lam, T. Y. (1999). Lectures on Modules and Rings. New York: Springer.
- Lehrer, G. I., Zhang, R. B. (2012). The Brauer category and invariant theory. J Eur Math Soc. 62(10):863–870.
- Li, Y. B. (2014). Cellularity of a new class of diagram algebras. Commun. Algebra. 42(10):4172–4181.
- Li, Y. B., Xiao, Z. K. (2012). On cell modules of metric cellular algebra. Monatsh. Math. 168(1):49–64.
- Li, Y. B., Zhao, D. K. (2014). Projective cell modules of Frobenius cellular algebras. Monatsh. Math. 175(2):283–281.
- Martin, P. P. (1994). Temperley-Lieb algebras for non-planar statistical mechanics-the partition algebra construction. J. Knot. Theory Ramif. 3(1):51–82.
- Martin, P. P., Woodcock, D. (2000). On the structure of the blob algebras. J. Algebra. 225(2):957–988.
- Rui, H., Xi, C. C. (2004). The representation theory of cyclotomic Temperley-Lieb algebras. Comment. Math. Helv. 79(2):427–450.
- Westbury, B. W. (2009). Invariant tensors and cellular categories. J. Algebra. 321(11):3563–3567.
- Westbury, B. W. (2008). Invariant tensors for the spin representation of so(7). Math. Proc. Cambridge Philos. Soc. 114(1):217–240.
- Westbury, B. W. (1995). The representation theory of the Temperley-Lieb algebras. Math. Z. 219(1):539–565.
- Xi, C. C. (2000). On the quasi-heredity of Birman-Wenzl algebras. Adv Math. 154(2):280–298.
- Xi, C. C. (1999). Partition algebras are cellular. Compos Math. 119(1):99–109.