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- Hilberts_syzygy_theorem abstract "In mathematics, Hilbert's syzygy theorem is a result of commutative algebra, first proved by David Hilbert (1890) in connection with the syzygy (relation) problem of invariant theory. Roughly speaking, starting with relations between polynomial invariants, then relations between the relations, and so on, it explains how far one has to go to reach a clarified situation. It is now considered to be an early result of homological algebra, and through the depth concept, to be a measure of the non-singularity of affine space.".
- Hilberts_syzygy_theorem wikiPageID "1280843".
- Hilberts_syzygy_theorem wikiPageLength "1508".
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- Hilberts_syzygy_theorem wikiPageRevisionID "625047817".
- Hilberts_syzygy_theorem wikiPageWikiLink Affine_space.
- Hilberts_syzygy_theorem wikiPageWikiLink Category:Commutative_algebra.
- Hilberts_syzygy_theorem wikiPageWikiLink Category:Homological_algebra.
- Hilberts_syzygy_theorem wikiPageWikiLink Category:Invariant_theory.
- Hilberts_syzygy_theorem wikiPageWikiLink Category:Theorems_in_abstract_algebra.
- Hilberts_syzygy_theorem wikiPageWikiLink Commutative_algebra.
- Hilberts_syzygy_theorem wikiPageWikiLink David_Eisenbud.
- Hilberts_syzygy_theorem wikiPageWikiLink David_Hilbert.
- Hilberts_syzygy_theorem wikiPageWikiLink Depth_(algebra).
- Hilberts_syzygy_theorem wikiPageWikiLink Depth_(ring_theory).
- Hilberts_syzygy_theorem wikiPageWikiLink Field_(mathematics).
- Hilberts_syzygy_theorem wikiPageWikiLink Free_resolution.
- Hilberts_syzygy_theorem wikiPageWikiLink Hilbert_polynomial.
- Hilberts_syzygy_theorem wikiPageWikiLink Hilbert_series_and_Hilbert_polynomial.
- Hilberts_syzygy_theorem wikiPageWikiLink Homological_algebra.
- Hilberts_syzygy_theorem wikiPageWikiLink Invariant_polynomial.
- Hilberts_syzygy_theorem wikiPageWikiLink Invariant_theory.
- Hilberts_syzygy_theorem wikiPageWikiLink Mathematics.
- Hilberts_syzygy_theorem wikiPageWikiLink Module_(mathematics).
- Hilberts_syzygy_theorem wikiPageWikiLink Non-singularity.
- Hilberts_syzygy_theorem wikiPageWikiLink Polynomial_ring.
- Hilberts_syzygy_theorem wikiPageWikiLink Quillen–Suslin_theorem.
- Hilberts_syzygy_theorem wikiPageWikiLink Resolution_(algebra).
- Hilberts_syzygy_theorem wikiPageWikiLink Singular_point_of_an_algebraic_variety.
- Hilberts_syzygy_theorem wikiPageWikiLink Syzygy_(mathematics).
- Hilberts_syzygy_theorem wikiPageWikiLinkText "Hilbert's syzygy theorem".
- Hilberts_syzygy_theorem wikiPageWikiLinkText "Hilbert's theorem on syzygies".
- Hilberts_syzygy_theorem hasPhotoCollection Hilberts_syzygy_theorem.
- Hilberts_syzygy_theorem id "p/h047410".
- Hilberts_syzygy_theorem title "Hilbert theorem".
- Hilberts_syzygy_theorem wikiPageUsesTemplate Template:MathSciNet.
- Hilberts_syzygy_theorem wikiPageUsesTemplate Template:Springer.
- Hilberts_syzygy_theorem subject Category:Commutative_algebra.
- Hilberts_syzygy_theorem subject Category:Homological_algebra.
- Hilberts_syzygy_theorem subject Category:Invariant_theory.
- Hilberts_syzygy_theorem subject Category:Theorems_in_abstract_algebra.
- Hilberts_syzygy_theorem hypernym Result.
- Hilberts_syzygy_theorem comment "In mathematics, Hilbert's syzygy theorem is a result of commutative algebra, first proved by David Hilbert (1890) in connection with the syzygy (relation) problem of invariant theory. Roughly speaking, starting with relations between polynomial invariants, then relations between the relations, and so on, it explains how far one has to go to reach a clarified situation.".
- Hilberts_syzygy_theorem label "Hilbert's syzygy theorem".
- Hilberts_syzygy_theorem sameAs Hilbertscher_Syzygiensatz.
- Hilberts_syzygy_theorem sameAs m.04prjr.
- Hilberts_syzygy_theorem sameAs Q779220.
- Hilberts_syzygy_theorem sameAs Q779220.
- Hilberts_syzygy_theorem wasDerivedFrom Hilberts_syzygy_theoremoldid=625047817.
- Hilberts_syzygy_theorem isPrimaryTopicOf Hilberts_syzygy_theorem.