Homology of Normal Chains and Cohomology of Charges ( Memoirs of the American Mathematical Society )

Publication series :Memoirs of the American Mathematical Society

Author: Th. De Pauw;R. M. Hardt;W. F. Pfeffer  

Publisher: American Mathematical Society‎

Publication year: 2017

E-ISBN: 9781470423353

P-ISBN(Paperback): 9781470437053

Subject: O189.2 algebraic topology

Keyword: 暂无分类

Language: ENG

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Homology of Normal Chains and Cohomology of Charges

Description

The authors consider a category of pairs of compact metric spaces and Lipschitz maps where the pairs satisfy a linearly isoperimetric condition related to the solvability of the Plateau problem with partially free boundary. It includes properly all pairs of compact Lipschitz neighborhood retracts of a large class of Banach spaces. On this category the authors define homology and cohomology functors with real coefficients which satisfy the Eilenberg-Steenrod axioms, but reflect the metric properties of the underlying spaces. As an example they show that the zero-dimensional homology of a space in our category is trivial if and only if the space is path connected by arcs of finite length. The homology and cohomology of a pair are, respectively, locally convex and Banach spaces that are in duality. Ignoring the topological structures, the homology and cohomology extend to all pairs of compact metric spaces. For locally acyclic spaces, the authors establish a natural isomorphism between their cohomology and the Čech cohomology with real coefficients.

Chapter

Title page

Introduction

Chapter 1. Notation and preliminaries

Chapter 2. Rectifiable chains

Chapter 3. Lipschitz chains

Chapter 4. Flat norm and flat chains

Chapter 5. The lower semicontinuity of slicing mass

Chapter 6. Supports of flat chains

Chapter 7. Flat chains of finite mass

Chapter 8. Supports of flat chains of finite mass

Chapter 9. Measures defined by flat chains of finite mass

Chapter 10. Products

Chapter 11. Flat chains in compact metric spaces

Chapter 12. Localized topology

Chapter 13. Homology and cohomology

Chapter 14. 𝑞-bounded pairs

Chapter 15. Dimension zero

Chapter 16. Relation to the Čech cohomology

Chapter 17. Locally compact spaces

References

Back Cover

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