2017
DOI: 10.1007/s00454-017-9890-y
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Iterating Evolutes and Involutes

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Cited by 10 publications
(20 citation statements)
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“…Thus γ(s, t) is evolving null Cartan curve parameterized by pseudo-arc s for all time t. Since γ s , N = 0 for all time t, Definition 3.3 implies that γ(s, t) is an evolving involute of α. From 7and (40) we get γ t = −τT − B = γ ss × γ sss , which means that γ(s, t) evolves according to null Betchov-Da Rios vortex filament equation (2). It generates timelike Hasimoto surface, since the plane spanned by {γ s , γ t } is a timelike (Fig.…”
Section: An Applicationmentioning
confidence: 96%
See 3 more Smart Citations
“…Thus γ(s, t) is evolving null Cartan curve parameterized by pseudo-arc s for all time t. Since γ s , N = 0 for all time t, Definition 3.3 implies that γ(s, t) is an evolving involute of α. From 7and (40) we get γ t = −τT − B = γ ss × γ sss , which means that γ(s, t) evolves according to null Betchov-Da Rios vortex filament equation (2). It generates timelike Hasimoto surface, since the plane spanned by {γ s , γ t } is a timelike (Fig.…”
Section: An Applicationmentioning
confidence: 96%
“…In this section, we give two examples of evolving involutes of the null Cartan curve α in E 3 1 , which evolve according to null Betchov-Da Rios vortex filament equation (2) and generate timelike Hasimoto surfaces.…”
Section: An Applicationmentioning
confidence: 99%
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“…We can recover this result by using the basis {h i k }. In fact, we shall prove that for any h ∈ C 0 , not necessarily in W 0 , S n h converges to 0, which means that the iteration of involutes of any closed curve γ ∈ H with dual length 0 converges to 0 (see [1] for the euclidean case).…”
Section: Convergence Of Involutes Iterationmentioning
confidence: 98%