Finite Time Steady Vector Field Topology
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Date
2016Author
Friederici, A.
Günther, T.
Rössl, C.
Theisel, H.
Metadata
Show full item recordAbstract
Vector Field Topology describes the asymptotic behavior of a flow in a vector field, i.e., the behavior for an integration time converging towards infinity. For some applications, a segmentation of the flow into areas of similar behavior for a finite integration time is desired. We introduce an approach for a finite-time segmentation of a steady vector field and equip the separatrices with additional information on how the separation evolves at each point with ongoing integration time. We analyze this behavior and its distribution along a separatrix, and provide a visual encoding for the 2D and 3D case. The result is an augmented topological skeleton. We demonstrate the approach on several artificial and simulated vector fields.
BibTeX
@inproceedings {10.2312:vmv.20161457,
booktitle = {Vision, Modeling & Visualization},
editor = {Oleg Lobachev},
title = {{Finite Time Steady Vector Field Topology}},
author = {Friederici, A. and Günther, T. and Rössl, C. and Theisel, H.},
year = {2016},
publisher = {The Eurographics Association},
ISBN = {978-3-03868-025-3},
DOI = {10.2312/vmv.20161457}
}
booktitle = {Vision, Modeling & Visualization},
editor = {Oleg Lobachev},
title = {{Finite Time Steady Vector Field Topology}},
author = {Friederici, A. and Günther, T. and Rössl, C. and Theisel, H.},
year = {2016},
publisher = {The Eurographics Association},
ISBN = {978-3-03868-025-3},
DOI = {10.2312/vmv.20161457}
}