MR 2131960 | Zbl 1083.18002 | 1 citation dans Numdam

[1] J. Baez and J. Dolan, Categorification, Contemp. Math. AMS, 230, 1998, 1-36. | MR 1664990 | Zbl 0923.18002

[2] M.A. Batanin, Monoidal globular categories as a natural environment for the theory of weak n-categories, Adv Math., 136, 1998, 39-103. | MR 1623672 | Zbl 0912.18006

[3] M.A. Batanin, On the Penon method of weakening of algebraic structures, J. Pure Appl. Algebra, 172, 2002, 1-23. | MR 1904227 | Zbl 1003.18010

[4] D. Boum, The structural nature of the nerve functor for n-groupoids, Appl. Categorical Structures, 8, 2000, 81-113. | MR 1785839 | Zbl 0976.18007

[5] D. Boum, n-groupoids from n-truncated simplicial objects as a solution to a universal problem, J. Pure Appl. Algebra, 154, 2000, 71-102. | MR 1787591 | Zbl 0969.18012

[6] A. Burroni, T-categories, Cahiers de Topologie et Géom. Diff.,12, 1971, 215-321. | Numdam | MR 308236 | Zbl 0246.18007

[7] A. Burroni, Algebres graphiques (sur un concept de dimension dans les langages formels), Cahiers de Topologie et Géom. Diff., 22, 1981, 249-265. | Numdam | MR 649074 | Zbl 0497.18004

[8] L. Crane Clock and category: is quantum gravity algebraic ?, Jour. Math. Phys., 36, 1995, 6180-6193. | MR 1355904 | Zbl 0848.57035

[9] L. Crane And I. Frenkel, Four dimensional topological quantum field theory, Hopf categories and the canonical bases, Jour. Math. Phys., 35, 1994, 5136-5154. | MR 1295461 | Zbl 0892.57014

[10] T. Leinster, General operads and multicategories, e-print math CT/9810053, 1997.

[11] T. Leinster, Structures in higher dimensional category theory, preprint University of Cambridge, 1998, pp 80.

[12] T. Leinster, A survey of definitions of n-categories, e-print math CT/0107188, 1, 2001.

[13] J. Penon, Approche polygraphique des ∞-catégories non strictes, Cahiers de Topologie et Géom. Diff. ctégoriques, 40, 1999, 31-80. | Numdam | Zbl 0918.18006