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changed the proof 2022-05-25 881d6cb
Update more-morphisms.tex

Thanks to Yijin Wang  https://stacks.math.columbia.edu/tag/03GZ#comment-7357

Typo in lemma 37.52.3: In the forth line 'we see that X_s×Spec(κ(s) Spec(k) is disconnected ' should be 'we see that X_s×Spec(κ(s)) Spec(k) is disconnected '
changed the proof 2022-01-23 9cee969
Try to use L/K notation for field extensions

We could also try to consistenly use "field extension" and not just
"extension" and consistently use "ring extension", etc.
changed the proof 2013-08-03 dba86b5
pell check: words starting with n, o, p, q, r, N, O, P, Q, or R
changed the statement 2012-07-09 98371d8
Small changes
changed the proof 2011-08-10 65ce54f
LaTeX: \Spec

	Introduced the macro

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

	and changed all the occurences of \text{Spec} into \Spec.
changed the statement and the proof 2010-10-09 2b090dd
End conversion of etale to \'etale.
changed the statement and the proof 2010-05-23 fc4d2b8
Varieties: Characterize geometrically disconnected

	If a scheme over a field is geometrically disconnected, then it
	becomes disconnected after a finite separable extension of the
	ground field.
assigned tag 03GZ 2009-10-18 a9d7807
Tags: Added new tags
created statement with label lemma-characterize-geometrically-connected-fibres in more-morphisms.tex 2009-10-18 ce81e93
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.