Add to ORKGAbstract. Using topological games we investigate connections between prop-erties of topological spaces and their spaces of continuous functions with the compact-open topology. This leads to new criteria for metrisability of a mani-fold. We show that a manifoldM is metrisable if and only if a winning strategy applies to certain topological games played on Ck(M). We also show thatM is metrisable if and only if Ck(M) is Baire, and even if and only if it is Volterra. 1
Abstract. We consider a natural way of extending the Lebesgue covering dimension to various classes ...
If NONEMPTY has a winning strategy against Empty in the Choquet game on a space, the space is said t...
AbstractIn this paper, we study some two person games and some topological properties defined by the...
Abstract. Using topological games we investigate connections between prop-erties of topological spac...
Abstract. Using topological games we investigate connections between properties of topological space...
Using topological games we investigate connections between properties of topological spaces and thei...
AbstractWe prove that a metric space may be realized as the set of maximal elements in a continuous ...
AbstractWe consider a topological game GΠ involving two players α and β and show that, for a paratop...
This document contains the proofs of the results stated in Frus-tration and Anger in Games. 1 Prelim...
Abstract. The paper proposes a unified description of hypertopologies, i.e. topolo-gies on the nonem...
Current paper aims to introduce new types of compactness in terms of notion of K-cover in topologica...
We establish three games as generalizations of the Banach-Mazur game, the Choquet game and the point...
Manifolds fall naturally into two classes depending on whether they can be fitted with a distance me...
Two different open-point games are studied here, the γ-game (of Bouziad [4]) and the Gp-game (introd...
We characterize the countable dimensionality of metric spaces in terms of a game-theoretic version o...
Abstract. We consider a natural way of extending the Lebesgue covering dimension to various classes ...
If NONEMPTY has a winning strategy against Empty in the Choquet game on a space, the space is said t...
AbstractIn this paper, we study some two person games and some topological properties defined by the...
Abstract. Using topological games we investigate connections between prop-erties of topological spac...
Abstract. Using topological games we investigate connections between properties of topological space...
Using topological games we investigate connections between properties of topological spaces and thei...
AbstractWe prove that a metric space may be realized as the set of maximal elements in a continuous ...
AbstractWe consider a topological game GΠ involving two players α and β and show that, for a paratop...
This document contains the proofs of the results stated in Frus-tration and Anger in Games. 1 Prelim...
Abstract. The paper proposes a unified description of hypertopologies, i.e. topolo-gies on the nonem...
Current paper aims to introduce new types of compactness in terms of notion of K-cover in topologica...
We establish three games as generalizations of the Banach-Mazur game, the Choquet game and the point...
Manifolds fall naturally into two classes depending on whether they can be fitted with a distance me...
Two different open-point games are studied here, the γ-game (of Bouziad [4]) and the Gp-game (introd...
We characterize the countable dimensionality of metric spaces in terms of a game-theoretic version o...
Abstract. We consider a natural way of extending the Lebesgue covering dimension to various classes ...
If NONEMPTY has a winning strategy against Empty in the Choquet game on a space, the space is said t...
AbstractIn this paper, we study some two person games and some topological properties defined by the...