The Stacks project

Standardize the proof of general Stein factorization

The proof as given before was too tricked. Now we prove it by just
relying on very standard results on limits of schemes, thereby reducing
more directly to the Noetherian case. No tricks!

Standardize the proof of general Stein factorization

The proof as given before was too tricked. Now we prove it by just
relying on very standard results on limits of schemes, thereby reducing
more directly to the Noetherian case. No tricks!

move a chapter and rename a chapter

	We moved the chapter "Cohomology of Algebraic Spaces" earlier so
	we can use the results earlier in the treatment of algebraic
	spaces. Also, we finally renamed the chapter "Coherent
	Cohomology" to "Cohomology of Schemes" which is better.

LaTeX: \Spec

	Introduced the macro

	\def\Spec{\mathop{\rm Spec}}

	and changed all the occurences of \text{Spec} into \Spec.

LaTeX: fix colim

	Introduced the macro

	\def\colim{\mathop{\rm colim}\nolimits}

	and changed all the occurences of \text{colim} into \colim.

Nonmathematical edits

Tags: Added new tags

More on Morphisms: Improved readability of proof Stein factorization

	Only in the general case. Also changed designation into theorem
	from lemma.

More on Morphisms: Stein factorization for general proer maps

	This is a little rough at the moment and needs to be cleaned up.
	The basic idea is that ytou first prove the result for closed
	subschemes of projective space over a ring and then reduce the
	general case to that by a simple application of Chow's lemma.