Content area
Abstract
We study circle-valued maps and consider the persistence of the homology of their fibers. The outcome is a finite collection of computable invariants which answer the basic questions on persistence and in addition encode the topology of the source space and its relevant subspaces. Unlike persistence of real-valued maps, circle-valued maps enjoy a different class of invariants called Jordan cells in addition to bar codes. We establish a relation between the homology of the source space and of its relevant subspaces with these invariants and provide a new algorithm to compute these invariants from an input matrix that encodes a circle-valued map on an input simplicial complex.[PUBLICATION ABSTRACT]
Details
Title
Topological Persistence for Circle-Valued Maps
Author
Burghelea, Dan; Dey, Tamal K
Pages
69-98
Publication year
2013
Publication date
Jul 2013
ISSN
01795376
e-ISSN
14320444
Source type
Scholarly Journal
Language of publication
English
ProQuest document ID
1370822853
Copyright
Springer Science+Business Media New York 2013