Results 161 to 170 of about 15,709 (204)
Effectiveness of de-implementation of low-value healthcare practices: an overview of systematic reviews. [PDF]
Implement SciKien C +9 more
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Multicomponent chiral plasmonic hybrid nanomaterials: recent advances in synthesis and applications. [PDF]
Nanoscale AdvYang G, Sun L, Zhang Q.
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How to Prevent or Reduce Prescribing Errors: An Evidence Brief for Policy. [PDF]
Front Pharmacol, 2019 de Araújo BC +4 more
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Point Configurations and Blow-ups of Coxeter Complexes
, 2005 Suzanne M. Armstrong +5 more
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Reflection triangles and parallel walls in Coxeter complexes
, 2005 Pierre‐Emmanuel Caprace
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Generic chain complexes and finite Coxeter groups.
Journal für die reine und angewandte Mathematik (Crelles Journal), 1985 Let G(q) denote the \(F_ q\)-rational points of a connected reductive algebraic group. A generic approach to the complex representation theory of the family of groups G(q) was first developed by N. Iwahori who showed that the Hecke algebras H(G(q),B(q)), which describe the endomorphism algebras of the permutation representations of G(q) on the cosets ...
C. W. Curtis, G Lehrer
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A q-Analog of the Coxeter Complex
Journal of Algebra, 1994 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Andrew Mathas
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Geometriae Dedicata, 1994
The author addresses the problem of which walls in a Coxeter complex are themselves Coxeter complexes. In the case of finite complexes, a complete answer is given. More generally, a sufficient condition is given; it depends on the entries in the Coxeter matrix of the complex (basically, for the \(i\)-th wall, all entries \(m_{ij}\) are even).
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The author addresses the problem of which walls in a Coxeter complex are themselves Coxeter complexes. In the case of finite complexes, a complete answer is given. More generally, a sufficient condition is given; it depends on the entries in the Coxeter matrix of the complex (basically, for the \(i\)-th wall, all entries \(m_{ij}\) are even).
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