Rectifying curves in the three-dimensional sphere

“…7, we show that a rectifying curve γ = exp p (ρV ) in H 3 (−r) is characterized by the property that a certain function (depending on its speed v, κ and ρ) takes its minimum value, equal to k 2 V , among the hyperbolic curves with the same spherical projection V (k V denotes the geodesic curvature of V ). A similar result, which does not appear in [13], is stated for rectifying curves in the three-dimensional sphere S 3 (r).…”

“…In the case of rectifying curves in the three-dimensional sphere S 3 (r), see [13], we can obtain a similar result. The proof is analogous to the one of Theorem 8, and it is left to the reader.…”

“…Similar to [13,Theorem 7], we deduce that the nontrivial solutions of the above ODE are given by ρ(t) = r arg tanh(a sec(t + t 0 )). Hence, we conclude that γ(t) = exp p (ρ(t)V (t)) is a rectifying curve if and only if ρ(t) = r arg tanh(a sec(t + t 0 )), for some constants a and t 0 , with 0 < a 2 < 1.…”

“…(1) is that the straight line that connects x(s) with the point p is orthogonal to the principal normal line [i.e., the line starting at x(s) in the direction of N (s)]. This idea was used by the authors to define rectifying curves in the threedimensional sphere S 3 (r) [13]. In this paper, we study rectifying curves in the three-dimensional hyperbolic space H 3 (−r), and obtain several results of characterization and classification for that family of curves.…”

Rectifying Curves in the Three-Dimensional Hyperbolic Space

“…7, we show that a rectifying curve γ = exp p (ρV ) in H 3 (−r) is characterized by the property that a certain function (depending on its speed v, κ and ρ) takes its minimum value, equal to k 2 V , among the hyperbolic curves with the same spherical projection V (k V denotes the geodesic curvature of V ). A similar result, which does not appear in [13], is stated for rectifying curves in the three-dimensional sphere S 3 (r).…”

“…In the case of rectifying curves in the three-dimensional sphere S 3 (r), see [13], we can obtain a similar result. The proof is analogous to the one of Theorem 8, and it is left to the reader.…”

“…Similar to [13,Theorem 7], we deduce that the nontrivial solutions of the above ODE are given by ρ(t) = r arg tanh(a sec(t + t 0 )). Hence, we conclude that γ(t) = exp p (ρ(t)V (t)) is a rectifying curve if and only if ρ(t) = r arg tanh(a sec(t + t 0 )), for some constants a and t 0 , with 0 < a 2 < 1.…”

“…(1) is that the straight line that connects x(s) with the point p is orthogonal to the principal normal line [i.e., the line starting at x(s) in the direction of N (s)]. This idea was used by the authors to define rectifying curves in the threedimensional sphere S 3 (r) [13]. In this paper, we study rectifying curves in the three-dimensional hyperbolic space H 3 (−r), and obtain several results of characterization and classification for that family of curves.…”

Rectifying Curves in the Three-Dimensional Hyperbolic Space

“…In view of these basic facts, the author asked the following very simple natural geometric question in [3] (see also [6] We simply call such a curve a rectifying curve in [3]. It is known that rectifying curves have many interesting properties (see, for instance, [3,4,5,6,7]). …”

Rectifying curves and geodesics on a cone in the Euclidean 3-space

Characterization of Curves that Lie on a Geodesic Sphere or on a Totally Geodesic Hypersurface in a Hyperbolic Space or in a Sphere