2019
DOI: 10.1109/tvcg.2018.2864839
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Time-Dependent Flow seen through Approximate Observer Killing Fields

Abstract: Flow fields are usually visualized relative to a global observer, i.e., a single frame of reference. However, often no global frame can depict all flow features equally well. Likewise, objective criteria for detecting features such as vortices often use either a global reference frame, or compute a separate frame for each point in space and time. We propose the first general framework that enables choosing a smooth trade-off between these two extremes. Using global optimization to minimize specific differentia… Show more

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Cited by 29 publications
(70 citation statements)
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“…As we show in appendix A, however, unsteadiness-minimizing transforms of v (under any self-consistent measure of unsteadiness, including J t in (4.12)) are never objective. Therefore, contrary to the assertions of Günther et al (2017), as well as those of Hadwiger et al (2018), Günther & Theisel (2020) and Rojo & Günther (2020), applications of local vortex criteria to minimally unsteady transforms of v do not constitute objectivizations of those criteria. In addition to the fundamental non-objectivity of unsteadiness-minimizing frame changes, further issues arise with the proposed numerical implementations of the original optimization problem (4.12).…”
Section: Replacing V With Its Minimally Unsteady Componentmentioning
confidence: 82%
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“…As we show in appendix A, however, unsteadiness-minimizing transforms of v (under any self-consistent measure of unsteadiness, including J t in (4.12)) are never objective. Therefore, contrary to the assertions of Günther et al (2017), as well as those of Hadwiger et al (2018), Günther & Theisel (2020) and Rojo & Günther (2020), applications of local vortex criteria to minimally unsteady transforms of v do not constitute objectivizations of those criteria. In addition to the fundamental non-objectivity of unsteadiness-minimizing frame changes, further issues arise with the proposed numerical implementations of the original optimization problem (4.12).…”
Section: Replacing V With Its Minimally Unsteady Componentmentioning
confidence: 82%
“…We have not required the local observer changes defined in (3.2) to be necessarily Euclidean (distance preserving). Therefore, theorem 3.2 is also applicable to the non-Euclidean local observer changes considered in Hadwiger et al (2018) and Günther & Theisel (2020). We note, however, that all local vortex criteria surveyed in the Introduction assume that the flow is incompressible.…”
Section: Compatibility Conditions For Generalized Frame Changesmentioning
confidence: 91%
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“…Our CNN-based approach removes the noise implicitly. The global optimization of Hadwiger et al [HMTR19] also requires the time partial vt . It remains to be tested, whether a high noise level on vt also influences their result.…”
Section: Choice Of Basismentioning
confidence: 99%