PRP0065canonicalv1Long Exact Sequence
Short exact sequence of primorial quotients induces a long exact sequence in homology via the snake lemma. Connecting homomorphism δ exists.
Payload
Long Exact Sequence
Short exact sequence of primorial quotients induces a long exact sequence in homology via the snake lemma. Connecting homomorphism δ exists.
Long Exact Sequence
Summary
Short exact sequence of primorial quotients induces a long exact sequence in homology via the snake lemma. Connecting homomorphism δ exists.
Statement
No manuscript statement was extracted in this pilot run.
Proof / Justification
No immediate manuscript proof block was extracted in this pilot run.
Source Context
- Registry source:
book-02.jsonlline 211 - Manuscript source: not matched
Lean / Formalization Notes
- Formalization:
formalized - Module:
TauLib.BookII.Enrichment.Homological - Name:
les_stage2
Dependencies
- Canonical: II.D85, II.T54
Related Results
Generated by later projection phases.
Related Publications
Generated by later projection phases.
Revision Notes
- 2026-04-24: Initial pilot migration.
Identifiers
Aliases & legacy IDs
II.P19long-exact-sequenceprop:long-exact-sequenceRelease lines
corpus_v3_workingcorpus_v2Relations
Formalized by (3)
Appears in (1)
Downstream uses (computed) (6)
Items in the corpus that reference this one via load-bearing relations. Computed from the full corpus-v3 graph at build time.
FTH0244formal theorem
FTH0244formal theorem
FTH0245formal theorem
FTH0245formal theorem
FTH0246formal theorem
FTH0246formal theoremSources
Version & History
Status disclaimer
A Corpus Item page reports the program's current internal record for this item. It does not imply external verification, scientific consensus, or final proof unless explicitly stated. Read it together with its dependencies, formalization status, and the program's overall stance.