Add to ORKGAnswering a question of Telgársky in the negative, it is shown that there is a space which is ß-favorable in the strong Choquet game, but all of its nonempty Wd-subspaces are of the second category in themselves
AbstractWe study topological games motivated by selection procedures for families of open sets. We e...
We examine the class of spaces in which the second player has a winning strategy in the open-open ga...
We investigate Noetherian families. By using a special Noetherian $\pi$-base, we give a result which...
In the main result, partially answering a question of Telg´arsky,the following is proven: if X is a ...
We prove that player α has a winning strategy in the Banach–Mazur game on a space X if and only if X...
For a normal space X, a (i.e. the nonempty player) having a winning strategy (resp. winning tactic) ...
New results on the Baire product problem are presented. It is shown that an arbitrary product of alm...
Let X be a completely metrizable space. Then the space of nonempty closed subsets of X endowed with ...
AbstractThe Banach–Mazur game as well as the strong Choquet game are investigated on the Wijsman hyp...
Using topological games we investigate connections between properties of topological spaces and thei...
The Banach–Mazur game as well as the strong Choquet game are investigated on theWijsman hyperspace f...
A topological game "Dense Gδσ-sets" (also denoted by DG) is introduced as follows: for any n ω at th...
Inspired by work of Scheepers and Tall, we use properties defined by topological games to provide bo...
Inspired by work of Scheepers and Tall, we use properties defined by topological games to provide bo...
It is well-known, that if X ×Y is a Baire space, then X, Y are Baire as well, and the converse is no...
AbstractWe study topological games motivated by selection procedures for families of open sets. We e...
We examine the class of spaces in which the second player has a winning strategy in the open-open ga...
We investigate Noetherian families. By using a special Noetherian $\pi$-base, we give a result which...
In the main result, partially answering a question of Telg´arsky,the following is proven: if X is a ...
We prove that player α has a winning strategy in the Banach–Mazur game on a space X if and only if X...
For a normal space X, a (i.e. the nonempty player) having a winning strategy (resp. winning tactic) ...
New results on the Baire product problem are presented. It is shown that an arbitrary product of alm...
Let X be a completely metrizable space. Then the space of nonempty closed subsets of X endowed with ...
AbstractThe Banach–Mazur game as well as the strong Choquet game are investigated on the Wijsman hyp...
Using topological games we investigate connections between properties of topological spaces and thei...
The Banach–Mazur game as well as the strong Choquet game are investigated on theWijsman hyperspace f...
A topological game "Dense Gδσ-sets" (also denoted by DG) is introduced as follows: for any n ω at th...
Inspired by work of Scheepers and Tall, we use properties defined by topological games to provide bo...
Inspired by work of Scheepers and Tall, we use properties defined by topological games to provide bo...
It is well-known, that if X ×Y is a Baire space, then X, Y are Baire as well, and the converse is no...
AbstractWe study topological games motivated by selection procedures for families of open sets. We e...
We examine the class of spaces in which the second player has a winning strategy in the open-open ga...
We investigate Noetherian families. By using a special Noetherian $\pi$-base, we give a result which...