About: Iterated monodromy group

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In geometric group theory and dynamical systems the iterated monodromy group of a covering map is a group describing the monodromy action of the fundamental group on all iterations of the covering. A single covering map between spaces is therefore used to create a tower of coverings, by placing the covering over itself repeatedly. In terms of the Galois theory of covering spaces, this construction on spaces is expected to correspond to a construction on groups. The iterated monodromy group provides this construction, and it is applied to encode the combinatorics and symbolic dynamics of the covering, and provide examples of .

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dbo:abstract	In geometric group theory and dynamical systems the iterated monodromy group of a covering map is a group describing the monodromy action of the fundamental group on all iterations of the covering. A single covering map between spaces is therefore used to create a tower of coverings, by placing the covering over itself repeatedly. In terms of the Galois theory of covering spaces, this construction on spaces is expected to correspond to a construction on groups. The iterated monodromy group provides this construction, and it is applied to encode the combinatorics and symbolic dynamics of the covering, and provide examples of . (en)
dbo:wikiPageExternalLink	http://mad.epfl.ch/%7Elaurent/pub/rabbit/index.html https://www.ams.org/bookstore-getitem/item=surv-117 http://www.arxiv.org/find/grp_physics,grp_nlin,grp_math/1/abs:+EXACT+iterated%5fmonodromy%5fgroup/0/1/0/all/0/1%3Fskip=0&query_id=02226432472b51fb http://mathworld.wolfram.com/MonodromyGroup.html
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rdfs:comment	In geometric group theory and dynamical systems the iterated monodromy group of a covering map is a group describing the monodromy action of the fundamental group on all iterations of the covering. A single covering map between spaces is therefore used to create a tower of coverings, by placing the covering over itself repeatedly. In terms of the Galois theory of covering spaces, this construction on spaces is expected to correspond to a construction on groups. The iterated monodromy group provides this construction, and it is applied to encode the combinatorics and symbolic dynamics of the covering, and provide examples of . (en)
rdfs:label	Iterated monodromy group (en)
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