Higher homotopy commutativity and the resultohedra
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概要
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We define a higher homotopy commutativity for the multiplication of a topological monoid. To give the definition, we use the resultohedra constructed by Gelfand, Kapranov and Zelevinsky. Using the higher homotopy commutativity, we have necessary and sufficient conditions for the classifying space of a topological monoid to have a special structure considered by Félix, Tanré and Aguadé. It is also shown that our higher homotopy commutativity is rationally equivalent to the one of Williams.
- 2011-04-01
著者
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Hemmi Yutaka
Department Of Mathematics And Information Science Faculty Of Science Kochi University @page 159-165
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Kawamoto Yusuke
Department Of Mathematics Faculty Of Science Hiroshima University
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Kawamoto Yusuke
Department Of Mathematics National Defense Academy
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Kawamoto Yusuke
Department Of Bioregulatory Medicine Ehime University Graduate School Of Medicine
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