Let $X$ be a Baire space, $Y$ be a compact Hausdorff space and $\varphi :X\to C_p\left(Y\right)$ be a quasi-continuous mapping. For a proximal subset $H$ of $Y\times Y$ we will use topological games ${𝒢}_1\left(H\right)$ and ${𝒢}_2\left(H\right)$ on $Y\times Y$ between two players to prove that if the first player has a winning strategy in these games, then $\varphi$ is norm continuous on a dense $G_{\delta }$ subset of $X$. It follows that if $Y$ is Valdivia compact, each quasi-continuous mapping from a Baire space $X$ to $C_p\left(Y\right)$ is norm continuous on a dense $G_{\delta }$ subset of $X$.

Let be the class of Banach spaces X for which every weakly quasi-continuous mapping f: A → X defined on an α-favorable space A is norm continuous at the points of a dense $G_{\delta }$ subset of A. We will show that this class is stable under c₀-sums and ${\ell }^p$-sums of Banach spaces for 1 ≤ p < ∞.