The Banach-Mazur game on a nonempty space $X$ is defined as follows: two players, $I$ and $II$, alternately choose nonempty open sets \begin{matrix} I & U_0 && U_1 && \cdots \\ II & & V_0 && V_1 && \cdots \end{matrix} such that $U_0 \supseteq V_0 \supseteq U_1 \supseteq V_1 \dots$. Player $II$ wins the run $\langle U_0, V_0, U_1, V_1, \dots \rangle$ of the Banach-Mazur game on $X$ iff $\bigcap_{n\in\omega}V_n \not = \emptyset$. Is there a description of the class of spaces in which $II$ has a winning strategy in the Banach-Mazur game, in terms of continuous maps? For example: $II$ has a winning strategy in the Banach-Mazur game on $X$ iff $X$ is the image of space from $\mathsf{P}$ under map from $\mathsf{L}$. Where $\mathsf{P}$ and $\mathsf{L}$ are some classes of spaces and maps, respectively.