On the product of Weak Asplund locally convex spaces

Abstract: For locally convex spaces, we systematize several known equivalent definitions of Fr\'echet (G^ ateaux) Differentiability Spaces and Asplund (Weak Asplund) Spaces. As an application, we extend the classical Mazur's theorem as follows: Let $E$ be a separable Baire locally convex space and let $Y$ be the product $\prod_{\alpha\in A} E_{\alpha}$ of any family of separable Fr\'echet spaces; then the product $E \times Y$ is Weak Asplund. Also, we prove that the product $Y$ of any family of Banach spaces $(E_{\alpha})$ is an Asplund locally convex space if and only if each $E_{\alpha}$ is Asplund. Analogues of both results are valid under the same assumptions, if $Y$ is the $\Sigma$-product of any family $(E_{\alpha})$.