Agnieszka Kowalik scite author profile

Agnieszka Kowalik

4Publications

2Citation Statements Received

74Citation Statements Given

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Affiliations

Cracow University of Technology, AGH University of Krakow

Publications

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On the homeomorphism groups of manifolds and their universal coverings

Kowalik

Rybicki

2011

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Let H c (M ) stand for the path connected identity component of the group of all compactly supported homeomorphisms of a manifold M . It is shown that H c (M ) is perfect and simple under mild assumptions on M . Next, conjugation-invariant norms on H c (M ) are considered and the boundedness of H c (M ) and its subgroups is investigated. Finally, the structure of the universal covering group of H c (M ) is studied.

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Quasi-Simplicity of Some Homeomorphism and Diffeomorphism Groups

Kowalik¹,

Michalik²

2010

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On the structure of certain nontransitive diffeomorphism groups on open manifolds

Kowalik¹,

Lech²,

Michalik³

2012

OpMath

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Quasi-simplicity of some homeomorphism and diffeomorphism groups

Kowalik¹,

Michalik²

2010

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Abstract. The notion of quasi-simplicity of groups is introduced. It is proven that for a group of homeomorphisms G which is fixed point free and factorizable the commutator subgroup [G, G] is quasi-simple. Several examples of quasi-simple but non-simple homeomorphism groups are presented. IntroductionIn paper [8] Ling showed that for a factorizable and fixed point free group G the commutator subgroup [G, G] is the least subgroup of G, normalized by [G, G], which acts without any fixed point. In this note we introduce the notion of a quasi-simple group. This notion enables us to give a new formulation of Ling's theorem and a completely new proof of it. In the last section we present various examples of quasi-simple homeomorphism and diffeomorphism groups which are non-simple.Ling's theorem is a generalization of the following theorem of Epstein [4]: Theorem 1.1. Let X be a paracompact space, let G be a group of homeomorphisms of X and let U be a basis of open sets of X satisfying the following axioms:Axiom 3. Let g ∈ G, U ∈ U and let B ⊆ U be a covering of X. Then there exist an integer n, elements g 1 , . . . , g n ∈ G and V 1 , . . . , V n ∈ B such that g = g n g n−1 . . . g 1 , supp(g i ) ⊂ V i and supp(g i ) ∪ (g i−1 . . . g 1 (U )) = X for 1 i n.Then [G, G], the commutator subgroup of G, is simple.2000 Mathematics Subject Classification: 22A05, 22E65, 57S05.

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