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Fundamenta Mathematicae

2007 | 197 | 1 | 271-287
Tytuł artykułu

Measure-preserving homeomorphisms of noncompact manifolds and mass flow toward ends

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EN
Abstrakty
EN
Suppose M is a noncompact connected n-manifold and ω is a good Radon measure of M with ω(∂M) = 0. Let ℋ(M,ω) denote the group of ω-preserving homeomorphisms of M equipped with the compact-open topology, and $ℋ_{E}(M,ω)$ the subgroup consisting of all h ∈ ℋ(M,ω) which fix the ends of M. S. R. Alpern and V. S. Prasad introduced the topological vector space 𝓢(M,ω) of end charges of M and the end charge homomorphism $c^{ω}: ℋ_{E}(M,ω) → 𝓢(M,ω)$, which measures for each $h ∈ ℋ_{E}(M,ω)$ the mass flow toward ends induced by h. We show that the map $c^{ω}$ has a continuous section. This induces the factorization $ℋ_{E}(M,ω) ≅ Ker c^{ω} × 𝓢(M,ω)$ and implies that $Ker c^{ω}$ is a strong deformation retract of $ℋ_{E}(M,ω)$.
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Tom
Numer
Strony
271-287
Opis fizyczny
Daty
wydano
2007
Twórcy
autor
• Division of Mathematics, Faculty of Engineering and Design, Kyoto Institute of Technology, Matsugasaki, Sakyoku, Kyoto 606-8585, Japan
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