As stated it doesn't appear to work. For simplicity set S = \mathrm{Spec} (k). Here's a counterexample: let X be any k-variety, e : S \to X any point of X, and \rho : X \to X any morphism. ...

Here's an easier way. We want to show the composition of correspondences S\rightarrow X \rightarrow S is the degree [k(x):k] in Cor_k(S,S). Considering the closed point x as the correspondence ...

First of all, you're working too hard -- A[x] is a Noetherian ring, so all we need is M\otimes A[x] to be finitely generated. We know that M is finitely generated as an A-module because it is ...

As Mariano mentions in the comments, coalgebras over a field are in particular coalgeras over the functor X \mapsto X \otimes X on vector spaces, although there is additional structure and ...

Look at the determinant of the given by equation. We get \det (A) \det (X) \det (B) = \det (C), so if C is invertible, that it, \det (C) \neq 0, then so are the determinants of A,X and B. ...

One of the key theorems that characterize compactness says that a topological space X is compact if and only if every collection \mathcal{C} of closed subsets of X such that the intersection of ...