Titlebook: High-dimensional Knot Theory; Algebraic Surgery in Andrew Ranicki Book 1998 Springer-Verlag Berlin Heidelberg 1998 K-theory.homology.knots.

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書(shū)目名稱High-dimensional Knot Theory影響因子(影響力)

書(shū)目名稱High-dimensional Knot Theory影響因子(影響力)學(xué)科排名

書(shū)目名稱High-dimensional Knot Theory網(wǎng)絡(luò)公開(kāi)度

書(shū)目名稱High-dimensional Knot Theory網(wǎng)絡(luò)公開(kāi)度學(xué)科排名

書(shū)目名稱High-dimensional Knot Theory被引頻次

書(shū)目名稱High-dimensional Knot Theory被引頻次學(xué)科排名

書(shū)目名稱High-dimensional Knot Theory年度引用

書(shū)目名稱High-dimensional Knot Theory年度引用學(xué)科排名

書(shū)目名稱High-dimensional Knot Theory讀者反饋

書(shū)目名稱High-dimensional Knot Theory讀者反饋學(xué)科排名

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Localization and completion in ,-theoryy reducing the computation for a complicated ring to simpler rings (e.g. fields). The classic example of localization and completion is the Hasse-Minkowski principle by which quadratic forms over ? are related to quadratic forms over ? and the finite fields F. and the .-adic completions ., . of ?, ?

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Algebraic transversalityclic covers of compact manifolds and finite . complexes. Refer to Ranicki [244, Chap. 4] for a previous account of algebraic transversality: here, only the additional results required for the new applications are proved. The construction in Part Two of the algebraic invariants of knots will make use

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Noncommutative localizatione noncommutative rings. High-dimensional knot theory requires the noncommutative localization matrix inversion method of Cohn [53], [54]. The algebraic .- and .-theory invariants of codimension 2 embeddings frequently involve this type of localization of a polynomial ring, as will become apparent in

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Endomorphism ,-theoryith an endomorphism . : . → . is essentially the same as a module (., .) over the polynomial ring .[.], with the indeterminate . acting on . by . This correspondence will be used to relate the algebraic .-groups .. (...[.]) of the localizations ...[.] of .[.] to the .-groups of pairs (., .) with . a

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Witt vectorstermines the endomorphism .-theory class. In Chap. 17 the Reidemeister torsion of an .-contractible finite f.g. .[., ..]-module chain complex . will be identified with the Witt vector determined by the Alexander polynomials. In the applications to knot theory in Chap. 33 . will be the cellular chain

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