"Restriction" of a fibre product to a subvariety

Question

As in my other question, suppose I have a Cartesian diagram of morphisms of algebraic varieties $$\begin{array}{ccc} A & \to^\alpha & B \\ \downarrow^\beta & & \downarrow^\gamma \\ C & \to^\delta & D \end{array}$$

This time, I'm going to suppose all the varieties are proper surfaces, and that the maps are (as before) finite and flat. Suppose I have a curve $Y \subset C$ (irreducible and nonsingular, if that helps), and I define $Z = \delta(Y)$, $X = \gamma^{-1}(Z)$, and $W = \beta^{-1}(Y)$. [EDIT: We have $W \subseteq \alpha^{-1}(X)$ but equality does not necessarily hold as I erroneously claimed -- thanks Dustin.]

Is it true that the diagram $$\begin{array}{ccc} W & \to^\alpha & X \\ \downarrow^\beta & & \downarrow^\gamma \\ Y & \to^\delta & Z \end{array}$$ obtained by restricting all the morphisms in the previous diagram is also Cartesian?

Answer 1

I believe this should be true: If you factor the map $\delta\mid_Y$ via the inclusion $Z \hookrightarrow D$ as $$ Y \to Z \hookrightarrow D $$ and pull back the map $\gamma$ along each of these maps, you should get your desired diagram as the left-hand side. i.e. you should obtain $$ \begin{matrix} W & \to & X & \to & B \\\\ \downarrow & & \downarrow & & \downarrow \\\\ Y & \to & Z & \hookrightarrow & D \end{matrix} $$ with each of the squares cartesian by definition.