Abstract
Secondary homotopy operations called box bracket operations were defined in the homotopy theory of an arbitrary 2-category with zeros by Hardie, Marcum and Oda (Rend Ist Mat Univ Trieste, 33:19–70 2001). For the topological 2-category of based spaces, based maps and based track classes of based homotopies, the classical Toda bracket is a particular example of a box bracket operation and subsequent development of the theory has refined, clarified and placed in this more general context many of the properties of classical Toda brackets. In this paper, and for the topological case only, we use an inductive definition to extend the theory to long box brackets. As is well-known, the necessity to manage higher homotopy coherence is a complicating factor in the consideration of such higher order operations. The key to our construction is the definition of an appropriate triple box bracket operation and consequently we focus primarily on the properties of the triple box bracket. We exhibit and exploit the relationship of the classical quaternary Toda bracket to the triple box bracket. As our main results we establish some computational techniques for triple box brackets that are based on composition methods. Some specific computations from the homotopy groups of spheres are included.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Cohen, J.M.: The decomposition of stable homotopy. Ann. of Math. (2) 87, 305–320 (1968)
Gray, B.: The odd components of the unstable homotopy groups of spheres. Duplicated Notes, Univ. of Illinois at Chicago Circle (1967)
Hardie, K.A., Kamps, K.H., Marcum, H.J.: Computing homotopy groups of a homotopy pullback. Quaestiones Math. 14, 179–199 (1991)
Hardie, K.A., Kamps, K.H., Marcum, H.J.: A categorical approach to matrix Toda brackets. Trans. Amer. Math. Soc. 347, 4625–4649 (1995)
Hardie, K.A., Kamps, K.H., Marcum, H.J.: The Toda bracket in the homotopy category of a track bicategory. J. Pure Appl. Algebra 175, 109–133 (2002)
Hardie, K.A., Kamps, K.H., Marcum, H.J., Oda, N.: Triple brackets and lax morphism categories. Appl. Categ. Structures 12, 3–27 (2004)
Hardie, K.A., Marcum, H.J., Oda, N.: Bracket operations in the homotopy theory of a 2-category. Rend. Ist. Mat. Univ. Trieste 33, 19–70 (2001)
Marcum, H.J.: Parameter constructions in homotopy theory. An. Acad. Brasil. Ciênc. 48, 387–402 (1976)
Marcum, H.J.: Fibrations over double mapping cylinders. Ill. J. Math. 24, 344–358 (1980)
Marcum, H.J.: Two results on cofibers. Pacific J. Math. 95, 133–142 (1981)
Marcum, H.J.: Functorial properties of the Hopf invariant. I. Quaestiones Math. 19, 537–584 (1996)
Marcum, H.J., Oda, N.: Composition properties of box brackets. J. Math. Soc. Japan (2009, in press)
Oda, N.: Unstable homotopy groups of spheres. Bull. Inst. Adv. Res. Fukuoka Univ. 44, 49–152 (1979)
Ôguchi, K.: A generalization of secondary composition and its applications. J. Fac. Sci. Univ. Tokyo 10, 29–79 (1963)
Ôguchi, K.: Generators of 2-primary components of homotopy groups of spheres, unitary groups and symplectic groups. J. Fac. Sci. Univ. Tokyo 11, 65–111 (1964)
Sagave, S.: Universal Toda brackets of ring spectra. Trans. Amer. Math. Soc. 360, 2767–2808 (2008)
Spanier, E.: Higher order operations. Trans. Amer. Math. Soc. 109, 509–539 (1963)
Toda, H.: Composition Methods in Homotopy Groups of Spheres. Annals of Mathematics Studies 49. Princeton University, Princeton (1962)
Walker, G.: Long Toda brackets. Proc. Adv. Study Inst. Alg. Top. Aarhus III, 612–631 (1970)
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Marcum, H.J., Oda, N. Long Box Bracket Operations in Homotopy Theory. Appl Categor Struct 19, 137–173 (2011). https://doi.org/10.1007/s10485-009-9186-3
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s10485-009-9186-3
Keywords
- 2-Category
- Suspension functor
- Toda bracket (quaternary, long)
- Box bracket (triple, long)
- Homotopy groups of spheres