- Project description: Finite type invariants and grope constraints on braids and string links.
- [1] J. C. Baez and J. Dolan. Categorification. in "Higher Category Theory", eds. E. Getzler and M. Kapranov, Contemp. Math. 230 , American Mathematical Society, 1-36, 1998.
- New Hopf Structures on Binary Trees Stefan Forcey,1
- Project Summary: Geometric combinatorial Hopf algebras and modules. Greater understanding leads to greater utility. Electric lighting existed prior to the theory of
- QUOTIENTS OF THE MULTIPLIHEDRON AS CATEGORIFIED ASSOCIAHEDRA
- Journal of Homotopy and Related Structures, vol. 1(1), 2006, pp.138 OPERADS IN ITERATED MONOIDAL CATEGORIES
- HIGHER PRODUCTS FOR YOUNG DIAGRAMS STEFAN FORCEY
- Suppose we are given the following data: (1) A 2-fold monoidal category C, with tensor products 1 and 2 and inter-
- OPERAD BIMODULE CHARACTERIZATION OF ENRICHMENT. V2 STEFAN FORCEY
- Project description: Enrichment and its relationship to classifying spaces 1. Introduction
- 2-DENDROIDAL SETS STEFAN FORCEY
- Operads of cellular automata and little n-cubes October 25, 2005
- Project Summary: Finite type invariants and grope constraints on braids and string links.
- GEOMETRIC COMBINATORIAL ALGEBRAS: CYCLOHEDRON AND STEFAN FORCEY AND DERRIELL SPRINGFIELD
- Project description: Geometric combinatorial Hopf algebras and modules 1. Introduction
- 1. Statement of Work: Chaos and Crystals: Student Research opportunities.
- CLASSIFICATION OF BRAIDS WHICH GIVE RISE TO INTERCHANGE
- Convex Hull Realizations of the Multiplihedra Stefan Forcey1,2
- 1. Project description: Geometric combinatorial Hopf algebras: Summary This proposal is about combinatorial algebra, with a geometrical flavor. Together with students
- [1] E. Artin. Theory of braids. Annals of Mathematics (2) 48 (1947), 101-126. [2] D. Bar-Natan. On the Vassiliev knot invariants. Topology 34 (1995) no. 2, 423-472.
- arXiv:0807.4159v1[math.QA]25Jul2008 MARKED TUBES AND THE GRAPH MULTIPLIHEDRON
