Groupoids, root systems and weak order I
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This is the first of a series of papers which define and study structures called rootoids, which are groupoids equipped with a representation in the category of Boolean rings and with an associated 1-cocycle. The axioms for rootoids are abstracted from formal properties of Coxeter groups with their root systems and weak orders. They imply that each of the weak orders of a rootoid embeds as an order ideal in a complete ortholattice. This first paper is concerned only with the most basic definitions, facts and examples; the main results, which are new even for Coxeter groups, will be stated and proved in subsequent papers. They involve certain categories of rootoids and especially a notion of functor rootoid.
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Root Systems, Tits Cones and Imaginary Cones of Brink-Howlett Groupoids
Extends root systems, Tits cones and imaginary cones to Brink-Howlett groupoids, establishing formal analogies with Borcherds-Kac-Moody root systems and a correspondence between positive roots and reflection subgroups.
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