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History of tag 0BLP

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changed the proof 2018-05-08 4dbd9d2
More moving around and spelling out of results

Just trying to make sense out of the already proven statements
changed the proof 2018-05-08 8e35d4c
Split out lemmas in pione.tex

State explicitly that one wants results on the completion functor for
coherent modules in order to prove results on restriction functors for
finite etale coverings
changed the statement 2018-05-03 aba0227
An upgrade and a downgrade in algebraization.tex

Mistakenly identified local cohomology module led to an error in a lemma
that doesn't have a tag yet (thank goodness).
changed the statement and the proof 2018-05-02 c4ff51c
Finish upgrading pione.tex

Better but not great... many other applications possible...
changed the proof 2018-04-26 0d14b46
New chapter 'Algebraic and Formal Geometry'
changed the statement and the proof 2017-06-12 f26473f
Improvement of lemmas on lifting FEt

More or less the correct versions now I think
changed the proof 2017-06-08 d8dac02
Move a section
changed the proof 2017-06-06 a866f45
Three new chapters

Titles: "Duality for Schemes", "Discriminants", "Local Cohomology"
moved the statement to file pione.tex 2015-08-18 3611756
Move sections into new chapter

In particular we now have
-- definition of pi_1
-- purity of branch locus
in the chapter on fundamental groups
changed the proof 2015-08-18 3611756
Move sections into new chapter

In particular we now have
-- definition of pi_1
-- purity of branch locus
in the chapter on fundamental groups
assigned tag 0BLP 2015-07-13 f2236fe
Tags: Added new tags
changed the statement and the proof 2015-07-08 ed4fef1
Got carried away on local Lefschetz

It turns out that the results in this commit can all be sharpened
considerably by using the method of the paper by Bhatt and de Jong
and the proofs become easier as well...
created statement with label lemma-fully-faithful-general in dualizing.tex 2015-07-06 e2c4eb6
Finite \'etale covers punctured spectra

The results

 \ref{lemma-faithful-general},
 \ref{lemma-fully-faithful-general}, and
 \ref{lemma-essentially-surjective-general}

seem formulated in roughly the correct generality.