Spectral sequence
In homological algebra and algebraic topology, a spectral sequence is a means of computing homology groups by taking successive approximations. Spectral sequences are a generalization of exact sequences, and since their introduction by Jean Leray , they have become important computational tools, particularly in algebraic topology, algebraic geometry and homological algebra.
Adams spectral sequenceAlgebraic K-theoryArmand BorelArnold's spectral sequenceAtiyah–Hirzebruch spectral sequenceBockstein spectral sequenceBrooke ShipleyCartan pairChristopher ZeemanChromatic spectral sequenceCircle bundleComparison theoremDerived categoryDerived coupleDiffietyEHP spectral sequenceEdge mapEilenberg–Moore spectral sequenceExact coupleFibrationFields MedalFiltration (mathematics)Five-term exact sequenceFrank AdamsFrölicher spectral sequenceGraded (mathematics)Grothendieck spectral sequenceGysin homomorphismHenri CartanHodge–de Rham spectral sequenceHomological algebraHomotopy groups of spheresHsien Chung WangHyperhomologyInflation-restriction exact sequenceIntersection homologyIntersection theoryJean LerayKhovanov homologyKünneth theorem
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Spectral sequence
In homological algebra and algebraic topology, a spectral sequence is a means of computing homology groups by taking successive approximations. Spectral sequences are a generalization of exact sequences, and since their introduction by Jean Leray , they have become important computational tools, particularly in algebraic topology, algebraic geometry and homological algebra.
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Eine Spektralsequenz oder Spek ...... oszuls Formalismus verwendete.
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En algèbre homologique et en t ...... oupes d'homotopie des sphères.
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In algebra omologica, topologi ...... anti strumenti computazionali.
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In homological algebra and alg ...... metry and homological algebra.
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В гомологической алгебре и алг ...... трии и гомологической алгебре.
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在同調代數中,譜序列是一種藉著逐步逼近以計算同調或上同調群的技術,由讓·勒雷在1946年首創。其應用見諸代數拓撲、群上同調與同倫理論。
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Jean Leray
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Jean
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Leray
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Eine Spektralsequenz oder Spek ...... äufig ein effektives Werkzeug.
@de
En algèbre homologique et en t ...... duites par Jean Leray en 1946.
@fr
In algebra omologica, topologi ...... anti strumenti computazionali.
@it
In homological algebra and alg ...... metry and homological algebra.
@en
В гомологической алгебре и алг ...... трии и гомологической алгебре.
@ru
在同調代數中,譜序列是一種藉著逐步逼近以計算同調或上同調群的技術,由讓·勒雷在1946年首創。其應用見諸代數拓撲、群上同調與同倫理論。
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Spectral sequence
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Spektralsequenz
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Successione spettrale
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Suite spectrale
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Спектральная последовательность
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譜序列
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스펙트럼 열
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