Theory and Algorithms for Constructing Discrete Morse Complexes from Grayscale Digital Images
| dc.contributor.author | Robins, Vanessa | |
| dc.contributor.author | Wood, Peter J | |
| dc.contributor.author | Sheppard, Adrian | |
| dc.date.accessioned | 2015-12-10T22:54:42Z | |
| dc.date.issued | 2011 | |
| dc.date.updated | 2016-02-24T11:56:15Z | |
| dc.description.abstract | We present an algorithm for determining the Morse complex of a two or three-dimensional grayscale digital image. Each cell in the Morse complex corresponds to a topological change in the level sets (i.e., a critical point) of the grayscale image. Since more than one critical point may be associated with a single image voxel, we model digital images by cubical complexes. A new homotopic algorithm is used to construct a discrete Morse function on the cubical complex that agrees with the digital image and has exactly the number and type of critical cells necessary to characterize the topological changes in the level sets. We make use of discrete Morse theory and simple homotopy theory to prove correctness of this algorithm. The resulting Morse complex is considerably simpler than the cubical complex originally used to represent the image and may be used to compute persistent homology. | |
| dc.identifier.issn | 0162-8828 | |
| dc.identifier.uri | http://hdl.handle.net/1885/59753 | |
| dc.provenance | https://v2.sherpa.ac.uk/id/publication/3537..."The Accepted Version can be archived in a Non-Commercial Institutional Repository. " from SHERPA/RoMEO site (as at 14/04/2023). © 2011 IEEE. Personal use of this material is permitted. Permission from IEEE must be obtained for all other uses, in any current or future media, including reprinting/republishing this material for advertising or promotional purposes, creating new collective works, for resale or redistribution to servers or lists, or reuse of any copyrighted component of this work in other works | |
| dc.publisher | Institute of Electrical and Electronics Engineers (IEEE Inc) | |
| dc.source | IEEE Transactions on Pattern Analysis and Machine Intelligence | |
| dc.subject | Keywords: Computational topology; Critical cells; Critical points; Cubical complex; Digital image; Digital topology; Discrete Morse theory; Gray scale; Gray-scale images; Homotopic; Homotopy theory; Level Set; Morse functions; Persistent homology; Single images; To computational topology; digital topology; Discrete Morse theory; persistent homology | |
| dc.title | Theory and Algorithms for Constructing Discrete Morse Complexes from Grayscale Digital Images | |
| dc.type | Journal article | |
| dcterms.accessRights | Open Access | |
| local.bibliographicCitation.issue | 8 | |
| local.bibliographicCitation.lastpage | 1658 | |
| local.bibliographicCitation.startpage | 1646 | |
| local.contributor.affiliation | Robins, Vanessa, College of Physical and Mathematical Sciences, ANU | |
| local.contributor.affiliation | Wood, Peter J, College of Physical and Mathematical Sciences, ANU | |
| local.contributor.affiliation | Sheppard, Adrian, College of Physical and Mathematical Sciences, ANU | |
| local.contributor.authoruid | Robins, Vanessa, u9213671 | |
| local.contributor.authoruid | Wood, Peter J, u3593492 | |
| local.contributor.authoruid | Sheppard, Adrian, u9204025 | |
| local.description.notes | Imported from ARIES | |
| local.identifier.absfor | 020406 - Surfaces and Structural Properties of Condensed Matter | |
| local.identifier.absfor | 020402 - Condensed Matter Imaging | |
| local.identifier.absfor | 080106 - Image Processing | |
| local.identifier.ariespublication | u9210271xPUB506 | |
| local.identifier.citationvolume | 33 | |
| local.identifier.doi | 10.1109/TPAMI.2011.95 | |
| local.identifier.scopusID | 2-s2.0-79959524693 | |
| local.identifier.thomsonID | 000291807200012 | |
| local.type.status | Accepted Version |
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