From d3deb36c26ae86c1763c33a8c356ecd5491caa40 Mon Sep 17 00:00:00 2001 From: Martin Czygan Date: Wed, 8 Jan 2020 22:41:17 +0100 Subject: datacite: reformat test cases and use jq . --sort-keys --- .../tests/files/datacite/datacite_result_04.json | 48 +++++++++++----------- 1 file changed, 24 insertions(+), 24 deletions(-) (limited to 'python/tests/files/datacite/datacite_result_04.json') diff --git a/python/tests/files/datacite/datacite_result_04.json b/python/tests/files/datacite/datacite_result_04.json index 0976e40e..571c3f64 100644 --- a/python/tests/files/datacite/datacite_result_04.json +++ b/python/tests/files/datacite/datacite_result_04.json @@ -1,4 +1,23 @@ { + "abstracts": [ + { + "content": "Let A be an abelian category, I the full subcategory of A consisting of injective objects of A, and K(A) the category whose objects are cochain complexes of elements of A, and whose morphisms are homotopy classes of cochain maps. In (5), lemma 4.6., p. 42, R. Hartshorne has proved that, under certain conditions, a cochain complex X˙ ε. |KA)| can be embedded in a complex I˙ ε. |K(I)| in such a way that I˙ has the same cohomology as X˙. In Chapter I we show that the construction given in the two first parts of Hartshorne's Lemma is natural i.e. there exists a functor J : K(A) → K(I) and a natural transformation [formula omitted] (where E : K(I) → K(A) is the embedding functor) such that [formula omitted] is injective and induces isomorphism in cohomology. The question whether the construction given in the third part of the lemma is functorial is still open. We also prove that J is left adjoint to E, so that K(I) is a reflective subcategory of K(A). In the special case where A is a category [formula omitted] of left A-modules, and [formula omitted] the category of cochain complexes in [formula omitted] and cochain maps (not homotopy classes), we prove the existence of a functor [formula omitted] In Chapter II we study the natural homomorphism [formula omitted] where A, B are rings, and M, L, N modules or chain complexes. In particular we give several sufficient conditions under which v is an isomorphism, or induces isomorphism in homology. In the appendix we give a detailed proof of Hartshorne's Lemma. We think that this is useful, as no complete proof is, to our knowledge, to be found in the literature.", + "lang": "en", + "mimetype": "text/plain" + } + ], + "contribs": [ + { + "given_name": "Marc Andre", + "index": 0, + "raw_name": "Marc Andre Nicollerat", + "role": "author", + "surname": "Nicollerat" + } + ], + "ext_ids": { + "doi": "10.14288/1.0080520" + }, "extra": { "datacite": { "metadataVersion": 5, @@ -7,30 +26,11 @@ "schemaVersion": "http://datacite.org/schema/kernel-3" } }, - "title": "On chain maps inducing isomorphisms in homology", - "release_type": "article-journal", - "release_stage": "published", - "release_year": 1973, - "ext_ids": { - "doi": "10.14288/1.0080520" - }, - "publisher": "University of British Columbia", "language": "en", - "contribs": [ - { - "index": 0, - "raw_name": "Marc Andre Nicollerat", - "given_name": "Marc Andre", - "surname": "Nicollerat", - "role": "author" - } - ], + "publisher": "University of British Columbia", "refs": [], - "abstracts": [ - { - "content": "Let A be an abelian category, I the full subcategory of A consisting of injective objects of A, and K(A) the category whose objects are cochain complexes of elements of A, and whose morphisms are homotopy classes of cochain maps. In (5), lemma 4.6., p. 42, R. Hartshorne has proved that, under certain conditions, a cochain complex X˙ ε. |KA)| can be embedded in a complex I˙ ε. |K(I)| in such a way that I˙ has the same cohomology as X˙. In Chapter I we show that the construction given in the two first parts of Hartshorne's Lemma is natural i.e. there exists a functor J : K(A) → K(I) and a natural transformation [formula omitted] (where E : K(I) → K(A) is the embedding functor) such that [formula omitted] is injective and induces isomorphism in cohomology. The question whether the construction given in the third part of the lemma is functorial is still open. We also prove that J is left adjoint to E, so that K(I) is a reflective subcategory of K(A). In the special case where A is a category [formula omitted] of left A-modules, and [formula omitted] the category of cochain complexes in [formula omitted] and cochain maps (not homotopy classes), we prove the existence of a functor [formula omitted] In Chapter II we study the natural homomorphism [formula omitted] where A, B are rings, and M, L, N modules or chain complexes. In particular we give several sufficient conditions under which v is an isomorphism, or induces isomorphism in homology. In the appendix we give a detailed proof of Hartshorne's Lemma. We think that this is useful, as no complete proof is, to our knowledge, to be found in the literature.", - "mimetype": "text/plain", - "lang": "en" - } - ] + "release_stage": "published", + "release_type": "article-journal", + "release_year": 1973, + "title": "On chain maps inducing isomorphisms in homology" } -- cgit v1.2.3