Minimal resolutions via algebraic discrete morse theory / [electronic resource] Michael Jöllenbeck, Volkmar Welker.

By: Jöllenbeck, Michael, 1975-
Contributor(s): Welker, Volkmar
Material type: TextTextSeries: Memoirs of the American Mathematical Society, v. 923Publisher: Providence, R.I. : American Mathematical Society, c2009Description: 1 online resource (vi, 74 p. : ill.)ISBN: 9781470405298 (online)Subject(s): Morse theory | Free resolutions (Algebra) | AlgebraAdditional physical formats: Minimal resolutions via algebraic discrete morse theory /DDC classification: 514 LOC classification: QA331 | .J65 2009Online resources: Contents
Contents:
Chapter 1. Introduction Chapter 2. Algebraic discrete Morse theory Chapter 3. Resolution of the residue field in the commutative case Chapter 4. Resolution of the residue field in the non-commutative case Chapter 5. Application to the acyclic Hochschild complex Chapter 6. Minimal (cellular) resolutions for ($p$-)Borel fixed ideals Appendix A. The bar and the Hochschild complex Appendix B. Proofs for algebraic discrete Morse theory
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"January 2009, volume 197, number 923 (end of volume)."

Includes bibliographical references (p. 71-72) and index.

Chapter 1. Introduction Chapter 2. Algebraic discrete Morse theory Chapter 3. Resolution of the residue field in the commutative case Chapter 4. Resolution of the residue field in the non-commutative case Chapter 5. Application to the acyclic Hochschild complex Chapter 6. Minimal (cellular) resolutions for ($p$-)Borel fixed ideals Appendix A. The bar and the Hochschild complex Appendix B. Proofs for algebraic discrete Morse theory

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Electronic reproduction. Providence, Rhode Island : American Mathematical Society. 2012

Mode of access : World Wide Web

Description based on print version record.

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