You are right. The paper is describing the wrong model in (1). In order to get (2), the model should be \begin{align} P(S,c) &= \prod_z P(c = c_z) P(x = x_z | c = c_z) P(y = y_z | c = c_z) \\ P(S) ...

\newcommand{\spec}{\operatorname{Spec}}I just want to expand on Pece's answer a bit to try to make it more explicit. Consider some affine open subset U = \operatorname{Spec} B \subseteq X ...

If (X,d_1) and (Y-d_2) are metric spaces, then d((x,y),(x'y'))=d_1(x,y')+d_2(y,y') is a metric on X\times Y. Note that this does not give the standard metric on e.g. \mathbb R^2=\mathbb R \times\mathbb R ...

As Martin says in the comments, one way to rephrase the question is that you want an example of a concrete category (C, U) where C has binary products but the forgetful functor U : C \to \text{Set} ...

Draw a picture. Pick p \in X -A, q \in Y-B, and use that for x \notin A, the set Y_x = \{x\} \times Y lies in X\times Y - A \times B and is connected as a homeomorph of Y. The same holds ...

In this example, it is still not true that X\times_k X = X\times X as topological spaces, since for example on the complement of the origin(s), the two are not equal. This follows for the same ...