On the computation of the Nielsen numbers and the converse of the Lefschetz coincidence theorem

Peter Wong

Displaying similar documents to “On the computation of the Nielsen numbers and the converse of the Lefschetz coincidence theorem”

Connectedness and local connectedness of topological groups and extensions

Ofelia Teresa Alas, Mihail G. Tkachenko, Vladimir Vladimirovich Tkachuk, Richard Gordon Wilson (1999)

Commentationes Mathematicae Universitatis Carolinae

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It is shown that both the free topological group $F (X)$ and the free Abelian topological group $A (X)$ on a connected locally connected space $X$ are locally connected. For the Graev’s modification of the groups $F (X)$ and $A (X)$ , the corresponding result is more symmetric: the groups $F Γ (X)$ and $A Γ (X)$ are connected and locally connected if $X$ is. However, the free (Abelian) totally bounded group $F T B (X)$ (resp., $A T B (X)$ ) is not locally connected no matter how “good” a space $X$ is. The above results imply that every non-trivial continuous...

A generalization of amenability and inner amenability of groups

Ali Ghaffari (2012)

Czechoslovak Mathematical Journal

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Let $G$ be a locally compact group. We continue our work [A. Ghaffari: $Γ$ -amenability of locally compact groups, Acta Math. Sinica, English Series, 26 (2010), 2313–2324] in the study of $Γ$ -amenability of a locally compact group $G$ defined with respect to a closed subgroup $Γ$ of $G \times G$ . In this paper, among other things, we introduce and study a closed subspace $A_{Γ}^{p} (G)$ of $L^{\infty} (Γ)$ and then characterize the $Γ$ -amenability of $G$ using $A_{Γ}^{p} (G)$ . Various necessary and sufficient conditions are found for a locally compact...

Linear extensions of relations between vector spaces

Árpád Száz (2003)

Commentationes Mathematicae Universitatis Carolinae

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Let $X$ and $Y$ be vector spaces over the same field $K$ . Following the terminology of Richard Arens [Pacific J. Math. 11 (1961), 9–23], a relation $F$ of $X$ into $Y$ is called linear if $λ F (x) \subset F (λ x)$ and $F (x) + F (y) \subset F (x + y)$ for all $λ \in K ∖ {0}$ and $x, y \in X$ . After improving and supplementing some former results on linear relations, we show that a relation $Φ$ of a linearly independent subset $E$ of $X$ into $Y$ can be extended to a linear relation $F$ of $X$ into $Y$ if and only if there exists a linear subspace $Z$ of $Y$ such that $Φ (e) \in Y | Z$ for all $e \in E$ . Moreover, if...

A $β$ -normal Tychonoff space which is not normal

Eva Murtinová (2002)

Commentationes Mathematicae Universitatis Carolinae

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$α$ -normality and $β$ -normality are properties generalizing normality of topological spaces. They consist in separating dense subsets of closed disjoint sets. We construct an example of a Tychonoff $β$ -normal non-normal space and an example of a Hausdorff $α$ -normal non-regular space.

Displaying similar documents to “On the computation of the Nielsen numbers and the converse of the Lefschetz coincidence theorem”

Connectedness and local connectedness of topological groups and extensions

A generalization of amenability and inner amenability of groups

Linear extensions of relations between vector spaces

A β -normal Tychonoff space which is not normal

A $β$ -normal Tychonoff space which is not normal