| Quellcodebibliothek Statistik Leitseite products/Sources/formale Sprachen/GAP/pkg/hap/tutorial/ (Algebra von RWTH Aachen Version 4.15.1©) Datei vom 19.6.2025 mit Größe 1 kB |
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Quelle tutorialBredon.xml Sprache: XML |
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<Chapter><Heading>Bredon homology</Heading>
<Section><Heading>Davis complex</Heading> <P/>The following example computes the Bredon homology <P/><M>\underline H_0(W,{\cal R}) = \mathbb Z^{21}</M> <P/> for the infinite Coxeter group <M>W</M> associated to the Dynkin diagram shown in the computatio <Example> <#Include SYSTEM "tutex/8.1.txt"> </Example> <Alt Only="HTML"><img src="images/infcoxdiag.gif" align="center" height="160" alt="Coxet </Alt> <Example> <#Include SYSTEM "tutex/8.2.txt"> </Example> </Section> <Section><Heading>Arithmetic groups</Heading> <P/>The following example computes the Bredon homology <P/><M>\underline H_0(SL_2({\cal O}_{-3}),{\cal R}) = \mathbb Z_2\oplus \mathbb Z^{9}</M> <P/><M>\underline H_1(SL_2({\cal O}_{-3}),{\cal R}) = \mathbb Z</M> <P/>for <M>{\cal O}_{-3}</M> the ring of integers of the number field <M>\mathbb Q(\sqrt{-3})</M>, and <M>\cal R</M> the complex reflection ring. <Example> <#Include SYSTEM "tutex/8.3.txt"> </Example> </Section> <Section><Heading>Crystallographic groups</Heading> <P/>The following example computes the Bredon homology <P/><M>\underline H_0(G,{\cal R}) = \mathbb Z^{17}</M> <P/> for <M>G</M> the second crystallographic group of dimension <M>4</M> in <B>GAP</B>'s library of crystallographic groups, and for <Example> <#Include SYSTEM "tutex/8.4.txt"> </Example> </Section> </Chapter> ¤ Dauer der Verarbeitung: 0.17 Sekunden (vorverarbeitet) ¤*© Formatika GbR, Deutschland |
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2026-03-28