summary:Let $X$ be a metric continuum. Let $F_{n}(X)$ denote the hyperspace of nonempty subsets of $X$ with at most $n$ elements. We say that the continuum $X$ has unique hyperspace $F_{n}(X)$ provided that the following implication holds: if $Y$ is a continuum and $F_{n}(X)$ is homeomorphic to $F_{n}(Y)$, then $X$ is homeomorphic to $Y$. In this paper we prove the following results: (1) if $X$ is an indecomposable continuum such that each nondegenerate proper subcontinuum of $X$ is an arc, then $X$ has unique hyperspace $F_{2}(X)$, and (2) let $X$ be an arcwise connected continuum for which there exists a unique point $v\in X$ such that $v$ is the vertex of a simple triod. Then $X$ has unique hyperspace $F_{2}(X)$
For a given continuum X and a natural number n, we consider the hyperspace Fn(X) of all nonempty sub...
Abstract. For a given continuum X and a natural number n, we con-sider the hyperspace Fn(X) of all n...
AbstractWe show that the nth symmetric product of a continuum is unicoherent if n ⩾ 3. We prove that...
summary:Let $X$ be a metric continuum. Let $F_{n}(X)$ denote the hyperspace of nonempty subsets of $...
summary:Let $X$ be a metric continuum. Let $F_{n}(X)$ denote the hyperspace of nonempty subsets of $...
This paper was partially supported by the proyect “Hiperespacios de dendritas locales (118555) ” of ...
Given a metric continuum X, we consider the hyperspace Cn(X) of all nonempty closed subsets of X wit...
AbstractFor a metric continuum X, let C(X) denote the hyperspace of subcontinua of X. The continuum ...
AbstractFor a metric continuum X, let C(X) denote the hyperspace of subcontinua of X. The continuum ...
Given a metric continuum X, we consider the hyperspace Cn(X) of all nonempty closed subsets of X wit...
AbstractLet X be a (nonempty metric) continuum. By the hyperspace of X we mean C(X)={A:A is a nonemp...
AbstractLet X be a metric continuum and let Fn(X) be the nth symmetric product of X (Fn(X) is the hy...
For a given continuum X and a natural number n, we consider the hyperspace Fn(X) of all nonempty sub...
Abstract. For a given continuum X and a natural number n, we consider the hyperspace Fn(X) of all no...
AbstractWe show that the nth symmetric product of a continuum is unicoherent if n ⩾ 3. We prove that...
For a given continuum X and a natural number n, we consider the hyperspace Fn(X) of all nonempty sub...
Abstract. For a given continuum X and a natural number n, we con-sider the hyperspace Fn(X) of all n...
AbstractWe show that the nth symmetric product of a continuum is unicoherent if n ⩾ 3. We prove that...
summary:Let $X$ be a metric continuum. Let $F_{n}(X)$ denote the hyperspace of nonempty subsets of $...
summary:Let $X$ be a metric continuum. Let $F_{n}(X)$ denote the hyperspace of nonempty subsets of $...
This paper was partially supported by the proyect “Hiperespacios de dendritas locales (118555) ” of ...
Given a metric continuum X, we consider the hyperspace Cn(X) of all nonempty closed subsets of X wit...
AbstractFor a metric continuum X, let C(X) denote the hyperspace of subcontinua of X. The continuum ...
AbstractFor a metric continuum X, let C(X) denote the hyperspace of subcontinua of X. The continuum ...
Given a metric continuum X, we consider the hyperspace Cn(X) of all nonempty closed subsets of X wit...
AbstractLet X be a (nonempty metric) continuum. By the hyperspace of X we mean C(X)={A:A is a nonemp...
AbstractLet X be a metric continuum and let Fn(X) be the nth symmetric product of X (Fn(X) is the hy...
For a given continuum X and a natural number n, we consider the hyperspace Fn(X) of all nonempty sub...
Abstract. For a given continuum X and a natural number n, we consider the hyperspace Fn(X) of all no...
AbstractWe show that the nth symmetric product of a continuum is unicoherent if n ⩾ 3. We prove that...
For a given continuum X and a natural number n, we consider the hyperspace Fn(X) of all nonempty sub...
Abstract. For a given continuum X and a natural number n, we con-sider the hyperspace Fn(X) of all n...
AbstractWe show that the nth symmetric product of a continuum is unicoherent if n ⩾ 3. We prove that...