From sparks to grundles - Differential characters

Reese Harvey; Blaine Lawson

doi:10.4310/CAG.2006.v14.n1.a2

From sparks to grundles - Differential characters

Reese Harvey
, Blaine Lawson

Mathematics

Research output: Contribution to journal › Article › peer-review

17 Scopus citations

Abstract

We introduce a new homological machine for the study of secondary geometric invariants. The objects, called spark complexes, occur in many areas of mathematics. The theory is applied here to establish the equivalence of a large family of spark complexes which appear naturally in geometry, topology and physics. These complexes are quite different. Some of them are purely analytic, some are simplicial, some are of Cech-type, and many are mixtures. However, the associated theories of secondary invariants are all shown to be canonically isomorphic. Numerous applications and examples are explored.

Original language	English
Pages (from-to)	25-58
Number of pages	34
Journal	Communications in Analysis and Geometry
Volume	14
Issue number	1
DOIs	https://doi.org/10.4310/CAG.2006.v14.n1.a2
State	Published - Jan 2006

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AB - We introduce a new homological machine for the study of secondary geometric invariants. The objects, called spark complexes, occur in many areas of mathematics. The theory is applied here to establish the equivalence of a large family of spark complexes which appear naturally in geometry, topology and physics. These complexes are quite different. Some of them are purely analytic, some are simplicial, some are of Cech-type, and many are mixtures. However, the associated theories of secondary invariants are all shown to be canonically isomorphic. Numerous applications and examples are explored.

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DO - 10.4310/CAG.2006.v14.n1.a2

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From sparks to grundles - Differential characters

Abstract

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