PlanetPhysics/Grassmann Hopf Algebroid Categories and Grassmann Categories
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Grassmann-Hopf Algebroid Categories and Grassmann Categories
[edit | edit source]The categories whose objects are either Grassmann-Hopf al/gebras , or in general algebroids, and whose morphisms are homomorphisms are called Grassmann-Hopf Algebroid Categories .
Although carrying a similar name, a quite different type of Grassmann categories have been introduced previously:
Grassmann Categories (as in [1]) are defined on letters over nontrivial abelian categories Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "http://localhost:6011/en.wikiversity.org/v1/":): {\displaystyle \mathbf{\A}} as full subcategories of the categories Failed to parse (unknown function "\A"): {\displaystyle F_{\mathbf{\A}}(x_1,...,x_k)} consisting of diagrams satisfying the relations: and with additional conditions on coadjoints, coproducts and morphisms.
They were shown to be equivalent to the category of right modules over the endomorphism ring of the coadjoint which is isomorphic to the Grassmann--or exterior--ring over on letters .
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[edit | edit source]References
[edit | edit source]- ↑ 1.0 1.1 Barry Mitchell.Theory of Categories ., Academic Press: New York and London.(1965), pp. 220-221.
- ↑ B. Fauser: A treatise on quantum Clifford Algebras . Konstanz, Habilitationsschrift. (PDF at arXiv.math.QA/0202059).(2002).
- ↑ B. Fauser: Grade Free product Formulae from Grassmann--Hopf Gebras., Ch. 18 in R. Ablamowicz, Ed., Clifford Algebras: Applications to Mathematics, Physics and Engineering , Birkh\"{a}user: Boston, Basel and Berlin, (2004).
- ↑ I.C. Baianu, R. Brown J.F. Glazebrook, and G. Georgescu, Towards Quantum Non-Abelian Algebraic Topology. in preparation , (2008).