Bertrand and Mannheim Curves of Spherical Framed Curves in a Three-Dimensional Sphere

Takahashi, Masatomo; Yu, Haiou

doi:10.3390/math10081292

Open AccessArticle

Bertrand and Mannheim Curves of Spherical Framed Curves in a Three-Dimensional Sphere

by

Masatomo Takahashi

¹

and

Haiou Yu

^2,*

¹

Muroran Institute of Technology, Muroran 050-8585, Japan

²

School of Applied Mathematics, Jilin University of Finance and Economic, Changchun 130117, China

^*

Author to whom correspondence should be addressed.

Mathematics 2022, 10(8), 1292; https://doi.org/10.3390/math10081292

Submission received: 21 March 2022 / Revised: 9 April 2022 / Accepted: 11 April 2022 / Published: 13 April 2022

(This article belongs to the Special Issue Differential Geometry: Structures on Manifolds and Their Applications)

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Abstract

:

We investigated differential geometries of Bertrand curves and Mannheim curves in a three-dimensional sphere. We clarify the conditions for regular spherical curves to become Bertrand and Mannheim curves. Then, we concentrate on Bertrand and Mannheim curves of singular spherical curves. As singular spherical curves, we considered spherical framed curves. We define Bertrand and Mannheim curves of spherical framed curves. We give conditions for spherical framed curves to become Bertrand and Mannheim curves.

Keywords:

Bertrand curves; Mannheim curves; spherical regular curves; spherical framed curves; singularity

MSC:

53A04; 57R45; 58K05

1. Introduction

In differential geometries, Bertrand and Mannheim curves are classical objects, which have been deeply studied in the Euclidean space [1,2,3,4,5]. Given a curve

γ

, a Bertrand curve is a curve

\bar{γ}

such that the principal normal vector field of

γ

coincides with the principal normal vector field of

\bar{γ}

. Another type of associated curve is the Mannheim curve such that the bi-normal vector field of

γ

coincides with the principal normal vector field of

\bar{γ}

. Bertrand and Mannheim curves have an important role and a wide range of applications, which are used in computer-aided geometric design, computer-aided manufacturing, and physical sciences [6,7,8].

Recently, mathematicians have paid attention to Bertrand and Mannheim curves in other spaces, such as in a three-dimensional sphere and in non-flat space form [9,10,11,12,13,14]. In the three-dimensional sphere, a Bertrand curve is a spherical curve whose principal normal geodesic is the same as the principal normal geodesic of another spherical curve. A Mannheim curve is a spherical curve whose principal normal geodesic is the same as the bi-normal geodesic of another spherical curve. In order to define the principal normal geodesic vector, a non-degenerate condition is required. However, for regular Bertrand and Mannheim curves, the existence condition is not sufficient in general. In [15], the non-degenerate condition for Bertrand or Mannheim curves of regular curves in the three-dimensional Euclidean space was added. Moreover, the existence the conditions of the Bertrand and Mannheim curves of framed curves were discussed.

In this paper, we would like to treat Bertrand and Mannheim curves in the three-dimensional sphere. We investigate not only Bertrand and Mannheim curves of spherical regular curves, but also Bertrand and Mannheim curves of spherical singular curves. In Section 2, we clarify the conditions for spherical regular curves to become Bertrand and Mannheim curves, respectively (Theorems 2 and 3). As an application of our results, we clarify the relations between Bertrand curves (respectively, Mannheim curves) and general helices. Then, we consider singular spherical curves. As singular spherical curves, we considered spherical framed curves. A spherical framed curve is a smooth curve endowed with a moving frame. It is a generalization of a Legendre curve in the unit spherical bundle over the unit sphere (cf. [16]) and of a framed curve in the Euclidean space (cf. [17]). In Section 3, we define Bertrand and Mannheim curves of spherical framed curves. Then, we give conditions for spherical framed curves to become Bertrand and Mannheim curves, respectively (Theorems 6 and 7). Moreover, we give some examples to illustrate our results.

All maps and manifolds considered in this paper are differentiable of class

C^{\infty}

.

2. Regular Spherical Curves

Let

R^{4}

be the four-dimensional Euclidean space equipped with the inner product

a \cdot b = a_{1} b_{1} + a_{2} b_{2} + a_{3} b_{3} + a_{4} b_{4}

, where

a = (a_{1}, a_{2}, a_{3}, a_{4})

and

b = (b_{1}, b_{2}, b_{3}, b_{4}) \in R^{4}

. The norm of a is given by

| a | = \sqrt{a \cdot a}

. Let

a_{i} \in R^{4}

be vectors

a_{i} = (a_{i 1}, a_{i 2}, a_{i 3}, a_{i 4})

for

i = 1, 2, 3

. The vector product is given by:

a_{1} \times a_{2} \times a_{3} = \sum_{i = 1}^{4} \det (a_{1}, a_{2}, a_{3}, e_{i}) e_{i},

where

{e_{1}, e_{2}, e_{3}, e_{4}}

is the canonical basis on

R^{4}

. Then, we have

(a_{1} \times a_{2} \times a_{3}) \cdot a_{i} = 0

for

i = 1, 2, 3

. Let

S^{3} = {(x, y, z, w) \in R^{4} | x^{2} + y^{2} + z^{2} + w^{2} = 1}

be the unit sphere. We define the following two sets

Δ = {(a_{1}, a_{2}, a_{3}) \in S^{3} \times S^{3} \times S^{3} | a_{1} \cdot a_{2} = a_{1} \cdot a_{3} = a_{2} \cdot a_{3} = 0}

and

Δ_{2} = {(a_{1}, a_{2}) \in S^{3} \times S^{3} | a_{1} \cdot a_{2} = 0}

. Then,

Δ

and

Δ_{2}

are six- and five-dimensional smooth manifolds.

Note that for

(a, b, c) \in Δ

, if we denote

a \times b \times c = d

, then:

d \times a \times b = - c, c \times d \times a = b, b \times c \times d = - a .

Let I be an interval of

R

, and let

γ : I \to S^{3}

be a regular spherical curve, that is

\dot{γ} (t) \neq 0

for all

t \in I

, where

\dot{γ} (t) = (d γ / d t) (t)

.

Definition 1.

We say that γ is non-degenerate or γ satisfies the non-degenerate condition if

γ (t) \times \dot{γ} (t) \times \ddot{γ} (t) \neq 0

for all

t \in I

.

Let s be the arc-length parameter of

γ

, that is

| γ^{'} (s) | = 1

for all s. If

| γ^{″} (s) | \neq 1

for all s, then the tangent vector, the principal normal geodesic vector, and the bi-normal geodesic vector are given by:

t (s) = γ^{'} (s), n (s) = \frac{γ^{″} (s) + γ (s)}{| γ^{″} (s) + γ (s) |}, b (s) = γ (s) \times t (s) \times n (s),

respectively. In fact,

| γ^{″} {(s) + γ (s) |}^{2} = | γ^{″} {(s) |}^{2} + 2 γ^{″} (s) \cdot γ (s) + {| γ (s) |}^{2} = | γ^{″} {(s) |}^{2} - 2 γ^{'} (s) \cdot γ^{'} (s) + 1 = {| γ^{″} (s) |}^{2} - 1,

we have

| γ^{″} (s) | \neq 1

if and only if

| γ^{″} (s) + γ (s) | \neq 0

. Then,

{γ (s), t (s), n (s), b (s)}

is a moving frame of

γ

, and we have the Frenet–Serret formula:

\begin{matrix} (\begin{matrix} γ^{'} (s) \\ t^{'} (s) \\ n^{'} (s) \\ b^{'} (s) \end{matrix}) = (\begin{matrix} 0 & 1 & 0 & 0 \\ - 1 & 0 & κ (s) & 0 \\ 0 & - κ (s) & 0 & τ (s) \\ 0 & 0 & - τ (s) & 0 \end{matrix}) (\begin{matrix} γ (s) \\ t (s) \\ n (s) \\ b (s) \end{matrix}), \end{matrix}

(1)

where

κ (s)

and

τ (s)

are the curvature and the torsion of

γ (s)

, respectively. Moreover,

\begin{matrix} κ (s) = & | γ^{″} (s) + γ (s) | = | (γ^{″} (s) + γ (s)) \cdot n (s) | = | γ^{″} (s) \cdot n (s) | \\ = & | t^{'} (s) \cdot (- (b (s) \times γ (s) \times t (s))) | = | b (s) \cdot (γ (s) \times t (s) \times t^{'} (s)) | \\ = & | γ (s) \times t (s) \times t^{'} (s) | = | γ (s) \times γ^{'} (s) \times γ^{″} (s) | \end{matrix}

and

\begin{matrix} τ (s) = & - t^{'} (s) \cdot n (s) = - (γ (s) \times t (s) \times n^{'} (s)) \cdot n (s) \\ = & \det (γ (s), t (s), n (s), n^{'} (s)) = \frac{\det (γ (s), γ^{'} (s), γ^{″} (s), γ^{‴} (s))}{| γ^{″} {(s) + γ (s) |}^{2}} \\ = & \frac{\det (γ (s), γ^{'} (s), γ^{″} (s), γ^{‴} (s))}{κ^{2} (s)} . \end{matrix}

Since

κ^{2} (s) = | γ (s) \times γ^{'} (s) \times γ^{″} {(s) |}^{2} = | γ^{″} {(s) + γ (s) |}^{2} = {| γ^{″} (s) |}^{2} - 1,

we have that

| γ^{″} (s) | \neq 1

if and only if the curvature

κ (s)

does not vanish, that is

γ

is non-degenerate.

If

γ (t) \times \dot{γ} (t) \times \ddot{γ} (t) \neq 0

for all

t \in I

, then the tangent vector, the principal normal geodesic vector, and the bi-normal geodesic vector are given by:

t (t) = \frac{\dot{γ} (t)}{| \dot{γ} (t) |}, n (t) = - b (t) \times γ (t) \times t (t), b (t) = \frac{γ (t) \times \dot{γ} (t) \times \ddot{γ} (t)}{| γ (t) \times \dot{γ} (t) \times \ddot{γ} (t) |} .

Then,

{γ (t), t (t), n (t), b (t)}

is a moving frame of

γ

, and we have the Frenet–Serret formula:

\begin{matrix} (\begin{matrix} \dot{γ} (t) \\ \dot{t} (t) \\ \dot{n} (t) \\ \dot{b} (t) \end{matrix}) = (\begin{matrix} 0 & | \dot{γ} (t) | & 0 & 0 \\ - | \dot{γ} (t) | & 0 & | \dot{γ} (t) | κ (t) & 0 \\ 0 & - | \dot{γ} (t) | κ (t) & 0 & | \dot{γ} (t) | τ (t) \\ 0 & 0 & - | \dot{γ} (t) | τ (t) & 0 \end{matrix}) (\begin{matrix} γ (t) \\ t (t) \\ n (t) \\ b (t) \end{matrix}), \end{matrix}

(2)

where

κ (t) = \frac{| γ (t) \times \dot{γ} (t) \times \ddot{γ} (t) |}{| \dot{γ} {(t) |}^{3}}, τ (t) = \frac{\det (γ (t), \dot{γ} (t), \ddot{γ} (t), \overset{⃛}{γ} (t))}{| γ (t) \times \dot{γ} (t) \times \ddot{γ} {(t) |}^{2}} .

Note that in order to define

t (t), n (t), b (t), κ (t)

and

τ (t)

, we assumed that

γ

is non-degenerate.

As a well-known result, we recall the fundamental theorem of regular curves (cf. [18]).

Theorem 1.

Let

κ, τ : I \to R

be smooth functions and

κ (s) > 0

for all

s \in I

. Then, there exists a regular spherical curve

γ : I \to S^{3}

whose associated curvature and torsion are

κ (s)

and

τ (s)

. Moreover, s is the arc-length parameter of γ.

2.1. Bertrand Curves of Regular Spherical Curves

Let

γ

and

\bar{γ}

:

I \to S^{3}

be non-degenerate curves with

\bar{γ} ≢ \pm γ

.

Definition 2.

We say that γ and

\bar{γ}

are Bertrand mates if the principal normal geodesics of γ and

\bar{γ}

are parallel at the corresponding points. We also say that γ is a Bertrand curve if there exists a non-degenerate curve

\bar{γ}

such that γ and

\bar{γ}

are Bertrand mates.

Assume that

γ

and

\bar{γ}

are Bertrand mates, then there exists a smooth function

φ : I \to R

such that

\bar{γ} (t) = cos φ (t) γ (t) - sin φ (t) n (t)

and

\bar{n} (t) = sin φ (t) γ (t) + cos φ (t) n (t)

for all

t \in I

.

Remark 1.

If

\bar{γ} = - γ

, we have that the principal normal geodesics of γ and

\bar{γ}

are parallel at corresponding points, then γ and

\bar{γ}

are always Bertrand mates. This is why we assumed

\bar{γ} ≢ - γ

.

We take the arc-length parameter s of

γ

.

Lemma 1.

Let

γ : I \to S^{3}

be a non-degenerate curve parameterized by the arc-length. If γ and

\bar{γ}

are Bertrand mates with

\bar{γ} (s) = cos φ (s) γ (s) - sin φ (s) n (s)

, then φ is a constant with

sin φ \neq 0

.

Proof.

By differentiating

\bar{γ} (s) = cos φ (s) γ (s) - sin φ (s) n (s)

, we have

\begin{matrix} | \dot{\bar{γ}} (s) | \bar{t} (s) = & - φ^{'} (s) sin φ (s) γ (s) + (cos φ (s) + κ (s) sin φ (s)) t (s) + \\ - φ^{'} (s) cos φ (s) n (s) - τ (s) sin φ (s) b (s) . \end{matrix}

Since

\bar{n} (s) = sin φ (s) γ (s) + cos φ (s) n (s)

, we have

φ^{'} (s) = 0

for all

s \in I

. Therefore,

φ

is a constant. If

sin φ = 0

, then

\bar{γ} (s) = \pm γ (s)

for all

s \in I

. Hence,

φ

is a constant with

sin φ \neq 0

. □

By

\bar{γ} (s) = cos φ (s) γ (s) - sin φ (s) n (s)

and

\bar{n} (s) = sin φ (s) γ (s) + cos φ (s) n (s)

, there exists a smooth function

θ : I \to R

such that:

\begin{matrix} (\begin{matrix} \bar{t} (s) \\ \bar{b} (s) \end{matrix}) & = (\begin{matrix} cos θ (s) & - sin θ (s) \\ sin θ (s) & cos θ (s) \end{matrix}) (\begin{matrix} t (s) \\ b (s) \end{matrix}) . \end{matrix}

Lemma 2.

Let

γ : I \to S^{3}

be a non-degenerate curve parameterized by the arc-length. Suppose that φ is a constant with

sin φ \neq 0

. If γ and

\bar{γ}

are Bertrand mates with

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

and

\bar{t} (s) = cos θ (s) t (s) - sin θ (s) b (s)

, then θ is a constant.

Proof.

By differentiating

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

, we have

\begin{matrix} | \dot{\bar{γ}} (s) | \bar{t} (s) = (cos φ + κ (s) sin φ) t (s) - τ (s) sin φ b (s) . \end{matrix}

Thus, by differentiating

t (s) \cdot \bar{t} (s)

, we have

\begin{matrix} \frac{d}{d s} cos θ (s) = & \frac{d}{d s} (t (s) \cdot \bar{t} (s)) \\ = & (- γ (s) + κ (s) n (s)) \cdot \bar{t} (s) + t (s) \cdot (- | \dot{\bar{γ}} (s) | \bar{γ} (s) + | \dot{\bar{γ}} (s) | \bar{κ} (s) \bar{n} (s)) = 0 . \end{matrix}

Hence,

θ

is a constant. □

Theorem 2.

Let

γ : I \to S^{3}

be a non-degenerate curve parameterized by the arc-length. Suppose that

τ (s) \neq 0

for all

s \in I

and φ is a constant with

sin φ \neq 0

. Then, γ and

\bar{γ}

are Bertrand mates with

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

if and only if there exists a constant θ with

sin θ \neq 0

such that

\begin{matrix} - κ (s) sin θ + τ (s) cos θ = cot φ sin θ \end{matrix}

(3)

and

\begin{matrix} \frac{sin φ}{sin θ} τ (s) & > 0, (- sin φ + κ (s) cos φ) cos θ + τ (s) cos φ sin θ > 0 \end{matrix}

(4)

for all

s \in I

.

Proof.

Suppose that

γ

and

\bar{γ}

are Bertrand mates and

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

,

\bar{n} (s) = sin φ γ (s) + cos φ n (s)

for all

s \in I

. Note that s is not the arc-length parameter of

\bar{γ}

. By differentiating

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

, we have

| \dot{\bar{γ}} (s) | \bar{t} (s) = (cos φ + κ (s) sin φ) t (s) - τ (s) sin φ b (s) .

Since

\bar{t} (s) = cos θ t (s) - sin θ b (s)

, we have

| \dot{\bar{γ}} (s) | cos θ = cos φ + κ (s) sin φ

and

| \dot{\bar{γ}} (s) | sin θ = τ (s) sin φ

. It follows that

(cos φ + κ (s) sin φ) sin θ - τ (s) sin φ cos θ = 0 .

As

sin φ \neq 0

, we have

- κ (s) sin θ + τ (s) cos θ = cot φ sin θ .

As

| \dot{\bar{γ}} (s) | sin θ = τ (s) sin φ

and

τ (s) \neq 0

for all

s \in I

, we have

sin θ \neq 0

and

\frac{sin φ}{sin θ} τ (s) > 0

for all

s \in I

. Moreover, by differentiating

\bar{t} (s) = cos θ t (s) - sin θ b (s)

, we have

\begin{matrix} - | \dot{\bar{γ}} (s) | \bar{γ} (s) + | \dot{\bar{γ}} (s) | \bar{κ} (s) \bar{n} (s) = & (- γ (s) + κ (s) n (s)) cos θ + τ (s) sin θ n (s) \\ = & - cos θ γ (s) + (κ (s) cos θ + τ (s) sin θ) n (s) . \end{matrix}

It follows that

| \dot{\bar{γ}} (s) | \bar{κ} (s) = (- sin φ + κ (s) cos φ) cos θ + τ (s) cos φ sin θ .

Since

\bar{κ} (s) > 0

for all

s \in I

, we have

(- sin φ + κ (s) cos φ) cos θ + τ (s) cos φ sin θ > 0

for all

s \in I

.

Conversely, suppose that there exists a constant

θ

with

sin θ \neq 0

such that

- κ (s) sin θ + τ (s) cos θ = cot φ sin θ

,

\frac{sin φ}{sin θ} τ (s) > 0

,

(- sin φ + κ (s) cos φ) cos θ + τ (s) cos φ sin θ > 0

, and

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

. By differentiating

\bar{γ}

, we have

\begin{matrix} \dot{\bar{γ}} (s) = & (cos φ + κ (s) sin φ) t (s) - τ (s) sin φ b (s) = \frac{sin φ}{sin θ} τ (s) (cos θ t (s) - sin θ b (s)), \\ \ddot{\bar{γ}} (s) = & \frac{sin φ}{sin θ} (- τ (s) cos θ γ (s) + τ^{'} (s) cos θ t (s) \\ + τ (s) (κ (s) cos θ + τ (s) sin θ) n (s) - τ^{'} (s) sin θ b (s)) . \end{matrix}

By a direct calculation, we have

\begin{matrix} \bar{γ} (s) \times \dot{\bar{γ}} (s) \times \ddot{\bar{γ}} (s) \\ = \frac{{sin}^{2} φ}{{sin}^{2} θ} τ^{2} (s) ((- sin φ + κ (s) cos φ) cos θ + τ (s) cos φ sin θ) (sin θ t (s) + cos θ b (s)) . \end{matrix}

As assumption, we have

| \dot{\bar{γ}} (s) | = \frac{sin φ}{sin θ} τ (s) > 0, \bar{γ} (s) \times \dot{\bar{γ}} (s) \times \ddot{\bar{γ}} (s) \neq 0

for all

s \in I

.

Thus,

\bar{γ}

is regular and non-degenerate. Moreover, we have

\bar{t} (s) = \frac{\dot{\bar{γ}} (s)}{| \dot{\bar{γ}} (s) |} = cos θ t (s) - sin θ b (s), \bar{b} (s) = \frac{\bar{γ} (s) \times \dot{\bar{γ}} (s) \times \ddot{\bar{γ}} (s)}{| \bar{γ} (s) \times \dot{\bar{γ}} (s) \times \ddot{\bar{γ}} (s) |} = sin θ t (s) + cos θ b (s) .

It follows that

\bar{n} (s) = - \bar{b} (s) \times \bar{γ} (s) \times \bar{t} (s) = sin φ γ (s) + cos φ n (s) .

Therefore,

γ

and

\bar{γ}

are Bertrand mates. □

Remark 2.

With the same assumption as in Theorem 2, suppose that γ and

\bar{γ}

are Bertrand mates with

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

. Then, the following results hold:

(1): Both the curvature κ and torsion τ of the Bertrand curve can be constants (Example 1).
(2): If $cos φ = 0$ , then $κ (s) = \frac{τ (s)}{sin θ} cos θ$ , $\frac{τ (s)}{sin θ} sin φ > 0$ and $sin φ cos θ < 0$ by Equations (3) and (4). It follows that $κ (s) < 0$ . Hence, $cos φ \neq 0$ .
(3): If $cos θ = 0$ , then $κ (s) = - cot φ$ , $\frac{τ (s)}{sin θ} sin φ > 0$ and $τ (s) cos φ sin θ > 0$ by Equations (3) and (4). It follows that $κ (s) < 0$ . Hence, $cos θ \neq 0$ .

Proposition 1.

With the same assumption as in Theorem 2, suppose that γ and

\bar{γ}

are Bertrand mates with

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

. Then, the curvature

\bar{κ}

and the torsion

\bar{τ}

of

\bar{γ}

are given by

\begin{matrix} \bar{κ} (s) = & \frac{sin θ}{τ (s) sin φ} ((- sin φ + κ (s) cos φ) cos θ + τ (s) cos φ sin θ), \end{matrix}

(5)

\begin{matrix} \bar{τ} (s) = & \frac{{sin}^{2} θ}{τ (s) {sin}^{2} φ} . \end{matrix}

(6)

Proof.

Since

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

, we have

\begin{matrix} \dot{\bar{γ}} (s) = & (cos φ + κ (s) sin φ) t (s) - τ (s) sin φ b (s) = \frac{sin φ}{sin θ} τ (s) (cos θ t (s) - sin θ b (s)) . \end{matrix}

Therefore,

\begin{matrix} \ddot{\bar{γ}} (s) = & \frac{sin φ}{sin θ} (- τ (s) cos θ γ (s) + τ^{'} (s) cos θ t (s) \\ + τ (s) (κ (s) cos θ + τ (s) sin θ) n (s) - τ^{'} (s) sin θ b (s)), \\ \overset{⃛}{\bar{γ}} (s) = & \frac{sin φ}{sin θ} (- 2 τ^{'} (s) cos θ γ (s) + ((- τ (s) + τ^{″} (s)) cos θ - κ (s) τ (s) (κ (s) cos θ + τ (s) sin θ)) t (s) \\ + (2 τ^{'} (s) (κ (s) cos θ + τ (s) sin θ) + τ (s) (κ^{'} (s) cos θ + τ^{'} (s) sin θ)) n (s) \\ + (- τ^{″} (s) sin θ + τ^{2} (s) (κ (s) cos θ + τ (s) sin θ)) b (s)) . \end{matrix}

Since

\begin{matrix} | \dot{\bar{γ}} (s) | = & \frac{sin φ}{sin θ} τ (s), \\ | \bar{γ} (s) \times \dot{\bar{γ}} (s) \times \ddot{\bar{γ}} (s) | = & \frac{{sin}^{2} φ}{{sin}^{2} θ} τ^{2} (s) ((- sin φ + κ (s) cos φ) cos θ + τ (s) cos φ sin θ), \\ \det (\bar{γ} (s), \dot{\bar{γ}} (s), \ddot{\bar{γ}} (s), \overset{⃛}{\bar{γ}} (s)) = & \frac{{sin}^{2} φ}{{sin}^{2} θ} τ^{3} (s) {((- sin φ + κ (s) cos φ) cos θ + τ (s) cos φ sin θ)}^{2}, \end{matrix}

we have

\begin{matrix} \bar{κ} (s) = & \frac{| \bar{γ} (s) \times \dot{\bar{γ}} (s) \times \ddot{\bar{γ}} (s) |}{| \dot{\bar{γ}} {(s) |}^{3}} \\ = & \frac{sin θ}{τ (s) sin φ} ((- sin φ + κ (s) cos φ) cos θ + τ (s) cos φ sin θ), \\ \bar{τ} (s) = & \frac{\det (\bar{γ} (s), \dot{\bar{γ}} (s), \ddot{\bar{γ}} (s), \overset{⃛}{\bar{γ}} (s))}{| \bar{γ} (s) \times \dot{\bar{γ}} (s) \times \ddot{\bar{γ}} {(s) |}^{2}} \\ = & \frac{{sin}^{2} θ}{τ (s) {sin}^{2} φ} . \end{matrix}

□

Remark 3.

Suppose that γ and

\bar{γ}

are Bertrand mates with

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

. By Equation (6), we have

\bar{τ} (s) \neq 0

for all

s \in I

.

Proposition 2.

With the same assumption as in Theorem 2, suppose that γ and

\bar{γ}

are Bertrand mates with

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

. Then, there exists a constant θ with

sin θ \neq 0

such that the following formulas hold:

(1): $τ (s) sin φ = | \dot{\bar{γ}} (s) | sin θ,$ $| \dot{\bar{γ}} (s) | \bar{τ} (s) sin φ = sin θ .$
(2): $| \dot{\bar{γ}} (s) | \bar{τ} (s) cos φ = - κ (s) sin θ + τ (s) cos θ,$ $τ (s) cos φ = | \dot{\bar{γ}} (s) | (\bar{κ} (s) sin θ + \bar{τ} (s) cos θ) .$
(3): $cos φ + κ (s) sin φ = | \dot{\bar{γ}} (s) | cos θ,$ $| \dot{\bar{γ}} (s) | (cos φ - \bar{κ} (s) sin φ) = cos θ .$
(4): $| \dot{\bar{γ}} (s) | (sin φ + \bar{κ} (s) cos φ) = κ (s) cos θ + τ (s) sin θ,$ $sin φ - κ (s) cos φ = | \dot{\bar{γ}} (s) | (- \bar{κ} (s)$ $cos θ + \bar{τ} (s) sin θ) .$

Proof.

By Definition 2 and the proof of Theorem 2, we have

\begin{matrix} \bar{γ} (s) = & cos φ γ (s) - sin φ n (s), \\ \bar{n} (s) = & sin φ γ (s) + cos φ n (s), \\ \bar{t} (s) = & cos θ t (s) - sin θ b (s), \\ \bar{b} (s) = & sin θ t (s) + cos θ b (s) . \end{matrix}

We write the moving frame of

γ

in terms of the moving frame of

\bar{γ}

:

\begin{matrix} γ (s) = & cos φ \bar{γ} (s) + sin φ \bar{n} (s), \\ n (s) = & - sin φ \bar{γ} (s) + cos φ \bar{n} (s), \\ t (s) = & cos θ \bar{t} (s) + sin θ \bar{b} (s), \\ b (s) = & - sin θ \bar{t} (s) + cos θ \bar{b} (s) . \end{matrix}

By differentiating

\bar{γ} (s), \bar{n} (s), \bar{t} (s), \bar{b} (s)

and

γ (s), n (s), t (s), b (s)

, we obtain the formulas. □

Proposition 2 leads to the following result.

Corollary 1.

With the same assumption as in Theorem 2, suppose that γ and

\bar{γ}

are Bertrand mates with

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

. Then, the following relations hold:

(1): $τ (s) \bar{τ} (s) {sin}^{2} φ = {sin}^{2} θ$ .
(2): $τ (s) \bar{τ} (s) {cos}^{2} φ = (- κ (s) sin θ + τ (s) cos θ) (\bar{κ} (s) sin θ + \bar{τ} (s) cos θ)$ .
(3): $(cos φ + κ (s) sin φ) (cos φ - \bar{κ} (s) sin φ) = {cos}^{2} θ$ .
(4): $(sin φ - κ (s) cos φ) (sin φ + \bar{κ} (s) cos φ) = (κ (s) cos θ + τ (s) sin θ) (- \bar{κ} (s) cos θ + \bar{τ} (s)$ $sin θ)$ .

A twisted curve

γ

in

S^{3}

(i.e., a curve with torsion

τ ≢ 0

) is said to be a helix if its curvature and torsion are non-zero constants. More generally, a twisted curve

γ

in

S^{3}

is a general helix if and only if there exists a constant a such that

τ (s) = a κ (s) \pm 1

(for details, see [19]). Then, we clarify the relations between Bertrand curves and general helices in

S^{3}

.

Proposition 3.

With the same assumption as in Theorem 2, suppose that γ and

\bar{γ}

are Bertrand mates with

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

. If

φ = \pm θ

, then γ and

\bar{γ}

are general helices.

Proof.

Since

γ

and

\bar{γ}

are Bertrand mates, we have

- κ (s) sin θ + τ (s) cos θ = cot φ sin θ

by Theorem 2. If

φ = θ

, we have

κ (s) sin θ = (τ (s) - 1) cos θ

. As

cos θ \neq 0

(cf. Remark 2 (3)), we have

τ (s) = κ (s) tan θ + 1

. By Proposition 1, we have

\bar{τ} (s) = \frac{{sin}^{2} θ}{τ (s) {sin}^{2} φ} = \frac{1}{τ (s)}

. Moreover,

\begin{matrix} \bar{κ} (s) = & \frac{κ (s) {cos}^{2} θ + (τ (s) - 1) cos θ sin θ}{τ (s)} = \frac{\frac{(τ (s) - 1) {cos}^{3} θ}{sin θ} + (τ (s) - 1) cos θ sin θ}{τ (s)} \\ = & (1 - \frac{1}{τ (s)}) \frac{{cos}^{3} θ + cos θ {sin}^{2} θ}{sin θ} = (1 - \bar{τ} (s)) cot θ . \end{matrix}

It follows that

\bar{τ} (s) = - \bar{κ} (s) tan θ + 1

. If

φ = - θ

, by a calculation similar to the case of

φ = θ

, we have

τ (s) = κ (s) tan θ - 1

and

\bar{τ} (s) = - \bar{κ} (s) tan θ - 1

. Thus,

γ

and

\bar{γ}

are general helices. □

Proposition 4.

Let

γ : I \to S^{3}

be a general helix with

τ (s) = a κ (s) \pm 1

and

a \neq 0

. Suppose that

κ (s)

is not a constant and

τ (s) \neq 0

for all

s \in I

. If

τ (s) = a κ (s) + 1 > 0

for all

s \in I

or

τ (s) = a κ (s) - 1 < 0

for all

s \in I

, then γ is a Bertrand curve.

Proof.

If

τ (s) = a κ (s) + 1 > 0

for all

s \in I

, we take

φ = θ

,

sin θ = a / \sqrt{1 + a^{2}}

and

cos θ = 1 / \sqrt{1 + a^{2}}

. If

τ (s) = a κ (s) - 1 < 0

for all

s \in I

, we take

φ = - θ

,

sin θ = a / \sqrt{1 + a^{2}}

and

cos θ = 1 / \sqrt{1 + a^{2}}

. Then,

κ

and

τ

satisfy Equations (3) and (4) in Theorem 2. Hence,

γ

is a Bertrand curve. □

Remark 4.

With the same assumption as in Proposition 4, if

τ (s) = a κ (s) + 1 < 0

for all

s \in I

or

τ (s) = a κ (s) - 1 > 0

for all

s \in I

, we conclude there are not any constants angles φ and θ, such that κ and τ satisfy Equations (3) and (4) in Theorem 2. Hence, γ is not a Bertrand curve.

Example 1.

Let

γ : I \to S^{3}

be a helix with the curvature

κ = a

and torsion

τ = b

, where

a, b

are constants and

a > 0, b \neq 0

. We consider the following four cases:

(i) b > 0, b \neq 1, (i i) b = 1, (i i i) b < 0, b \neq - 1, (i v) b = - 1 .

In the case

(i)

, we take

φ = θ

,

sin θ = (b - 1) / \sqrt{a^{2} + {(b - 1)}^{2}}

and

cos θ = a / \sqrt{a^{2} + {(b - 1)}^{2}}

. In the case

(i i)

, we take

φ = π / 4

,

sin θ = 1 / \sqrt{1 + {(a + 1)}^{2}}

and

cos θ = (a + 1) / \sqrt{1 + {(a + 1)}^{2}}

. In the case

(i i i)

, we take

φ = - θ

,

sin θ = (b + 1) / \sqrt{a^{2} + {(b + 1)}^{2}}

and

cos θ = a / \sqrt{a^{2} + {(b + 1)}^{2}}

. In the case

(i v)

, we take

φ = π / 4

,

sin θ = - 1 / \sqrt{1 + {(a + 1)}^{2}}

and

cos θ = (a + 1) / \sqrt{1 + {(a + 1)}^{2}}

. Then, κ and τ satisfy Equations (3) and (4) in Theorem 2. Hence, γ is a Bertrand curve.

2.2. Mannheim Curves of Regular Spherical Curves

Let

γ

and

\bar{γ}

:

I \to S^{3}

be non-degenerate curves with

\bar{γ} ≢ γ

.

Definition 3.

We say that γ and

\bar{γ}

are Mannheim mates if the principal normal geodesic of γ and the bi-normal geodesic of

\bar{γ}

are parallel at the corresponding points. We also say that γ is a Mannheim curve if there exists a non-degenerate curve

\bar{γ}

such that γ and

\bar{γ}

are Mannheim mates.

Assume that

γ

and

\bar{γ}

are Mannheim mates, then there exists a smooth function

φ : I \to R

such that

\bar{γ} (t) = cos φ (t) γ (t) - sin φ (t) n (t)

and

\bar{b} (t) = sin φ (t) γ (t) + cos φ (t) n (t)

for all

t \in I

.

Remark 5.

If

\bar{γ} = - γ

, then γ and

\bar{γ}

are not Mannheim mates.

We take the arc-length parameter s of

γ

.

Lemma 3.

Let

γ : I \to S^{3}

be a non-degenerate curve parameterized by the arc-length. If γ and

\bar{γ}

are Mannheim mates with

\bar{γ} (s) = cos φ (s) γ (s) - sin φ (s) n (s)

, then φ is a constant with

sin φ \neq 0

.

Proof.

By differentiating

\bar{γ} (s) = cos φ (s) γ (s) - sin φ (s) n (s)

, we have

\begin{matrix} | \dot{\bar{γ}} (s) | \bar{t} (s) = & - φ^{'} (s) sin φ (s) γ (s) + (cos φ (s) + κ (s) sin φ (s)) t (s) \\ - φ^{'} (s) cos φ (s) n (s) - τ (s) sin φ (s) b (s) . \end{matrix}

Since

\bar{b} (s) = sin φ (s) γ (s) + cos φ (s) n (s)

, we have

φ^{'} (s) = 0

for all

s \in I

. Therefore,

φ

is a constant. If

sin φ = 0

, then

\bar{γ} (s) = \pm γ (s)

for all

s \in I

. Hence,

φ

is a constant with

sin φ \neq 0

. □

Theorem 3.

Let

γ : I \to S^{3}

be a non-degenerate curve parameterized by the arc-length. Suppose that φ is a constant with

sin φ \neq 0

. Then, γ and

\bar{γ}

are Mannheim mates with

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

if and only if

\begin{matrix} ( & κ^{2} (s) + τ^{2} (s) - 1) sin φ cos φ = κ (s) ({sin}^{2} φ - {cos}^{2} φ) \end{matrix}

(7)

and

\begin{matrix} τ^{'} (s) sin φ cos φ - (κ^{'} (s) τ (s) - κ (s) τ^{'} (s)) {sin}^{2} φ > 0 \end{matrix}

(8)

for all

s \in I

.

Proof.

Suppose that

γ

and

\bar{γ}

are Mannheim mates and

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

,

\bar{b} (s) = sin φ γ (s) + cos φ n (s)

for all

s \in I

. Note that s is not the arc-length parameter of

\bar{γ}

. By differentiating

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

, we have

| \dot{\bar{γ}} (s) | \bar{t} (s) = (cos φ + κ (s) sin φ) t (s) - τ (s) sin φ b (s)

. Since

\bar{γ}

is regular, we have

| \dot{\bar{γ}} (s) | =

\sqrt{{(cos φ + κ (s) sin φ)}^{2} + {(τ (s) sin φ)}^{2}} \neq 0

for all

s \in I

. Since

\bar{b} (s) = sin φ γ (s) + cos φ n (s)

, there exists a smooth function

θ : I \to R

such that

\begin{matrix} (\begin{matrix} \bar{t} (s) \\ \bar{n} (s) \end{matrix}) & = (\begin{matrix} cos θ (s) & - sin θ (s) \\ sin θ (s) & cos θ (s) \end{matrix}) (\begin{matrix} b (s) \\ t (s) \end{matrix}) . \end{matrix}

Then,

- | \dot{\bar{γ}} (s) | sin θ (s) = cos φ + κ (s) sin φ

and

| \dot{\bar{γ}} (s) | cos θ (s) = - τ (s) sin φ

. It follows that

\begin{matrix} (cos φ + κ (s) sin φ) cos θ (s) - τ (s) sin φ sin θ (s) = 0 . \end{matrix}

(9)

By differentiating

\bar{t} (s) = cos θ (s) b (s) - sin θ (s) t (s)

, we have

\begin{matrix} - | \dot{\bar{γ}} (s) | \bar{γ} (s) + | \dot{\bar{γ}} (s) | \bar{κ} (s) \bar{n} (s) = & sin θ (s) γ (s) - θ^{'} (s) cos θ (s) t (s) \\ + (- κ (s) sin θ (s) - τ (s) cos θ (s)) n (s) - θ^{'} (s) sin θ (s) b (s) . \end{matrix}

Since

\bar{b} (s) = sin φ γ (s) + cos φ n (s)

, we have

\begin{matrix} (sin φ - κ (s) cos φ) sin θ (s) - τ (s) cos φ cos θ (s) = 0 . \end{matrix}

(10)

By Equations (9) and (10), we have

\begin{matrix} (\begin{matrix} - τ (s) sin φ & cos φ + κ (s) sin φ \\ sin φ - κ (s) cos φ & - τ (s) cos φ \end{matrix}) (\begin{matrix} sin θ (s) \\ cos θ (s) \end{matrix}) & = (\begin{matrix} 0 \\ 0 \end{matrix}) . \end{matrix}

Thus,

\begin{matrix} \det (\begin{matrix} - τ (s) sin φ & cos φ + κ (s) sin φ \\ sin φ - κ (s) cos φ & - τ (s) cos φ \end{matrix}) = 0 . \end{matrix}

It follows that

\begin{matrix} (κ^{2} (s) + τ^{2} (s) - 1) sin φ cos φ = κ (s) ({sin}^{2} φ - {cos}^{2} φ) . \end{matrix}

(11)

By differentiating

\bar{n} (s) = sin θ (s) b (s) + cos θ (s) t (s)

, we have

\begin{matrix} | \dot{\bar{γ}} (s) | \bar{τ} (s) sin φ γ (s) + | \dot{\bar{γ}} (s) | \bar{κ} (s) sin θ (s) t (s) + | \dot{\bar{γ}} (s) | \bar{τ} (s) cos φ n (s) - | \dot{\bar{γ}} (s) | \bar{κ} (s) cos θ (s) b (s) \\ = - cos θ (s) γ (s) - θ^{'} (s) sin θ (s) t (s) + (κ (s) cos θ (s) - τ (s) sin θ (s)) n (s) + θ^{'} (s) cos θ (s) b (s) . \end{matrix}

Thus,

| \dot{\bar{γ}} (s) | \bar{κ} (s) = - θ^{'} (s)

. Since

\bar{κ} (s) > 0

for all

s \in I

, we have

θ^{'} (s) < 0

for all

s \in I

. By differentiating (9), we have

\begin{matrix} (κ^{'} (s) - θ^{'} (s) τ (s)) sin φ cos θ (s) - (θ^{'} (s) (cos φ + κ (s) sin φ) + τ^{'} (s) sin φ) sin θ (s) = 0 . \end{matrix}

(12)

By Equations (9) and (12), we have

\begin{matrix} (\begin{matrix} τ (s) sin φ & cos φ + κ (s) sin φ \\ θ^{'} (s) (cos φ + κ (s) sin φ) + τ^{'} (s) sin φ & (κ^{'} (s) - θ^{'} (s) τ (s)) sin φ \end{matrix}) (\begin{matrix} sin θ (s) \\ cos θ (s) \end{matrix}) & = (\begin{matrix} 0 \\ 0 \end{matrix}) . \end{matrix}

Thus,

\begin{matrix} θ^{'} (s) = \frac{- (τ^{'} (s) sin φ cos φ - (κ^{'} (s) τ (s) - κ (s) τ^{'} (s)) {sin}^{2} φ)}{τ^{2} (s) {sin}^{2} φ + {(cos φ + κ (s) sin φ)}^{2}} . \end{matrix}

It follows that

τ^{'} (s) sin φ cos φ - (κ^{'} (s) τ (s) - κ (s) τ^{'} (s)) {sin}^{2} φ > 0

for all

s \in I

.

Conversely, suppose that

(κ^{2} (s) + τ^{2} (s) - 1) sin φ cos φ = κ (s) ({sin}^{2} φ - {cos}^{2} φ)

,

τ^{'} (s) sin φ cos φ - (κ^{'} (s) τ (s) - κ (s) τ^{'} (s)) {sin}^{2} φ > 0

and

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

for all

s \in I

.

By differentiating

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

, we have

\begin{matrix} \dot{\bar{γ}} (s) = & (cos φ + κ (s) sin φ) t (s) - τ (s) sin φ b (s), \\ \ddot{\bar{γ}} (s) = & - (cos φ + κ (s) sin φ) γ (s) + κ^{'} (s) sin φ t (s) \\ + (κ (s) cos φ + (κ^{2} (s) + τ^{2} (s)) sin φ) n (s) - τ^{'} (s) sin φ b (s) . \end{matrix}

By a direct calculation, we have

\begin{matrix} \bar{γ} (s) \times \dot{\bar{γ}} (s) \times \ddot{\bar{γ}} (s) = & (τ^{'} (s) sin φ cos φ - (κ^{'} (s) τ (s) - κ (s) τ^{'} (s)) {sin}^{2} φ) (sin φ γ (s) + cos φ n (s)) . \end{matrix}

As the assumption,

\begin{matrix} τ^{'} (s) sin φ cos φ - (κ^{'} (s) τ (s) - κ (s) τ^{'} (s)) {sin}^{2} φ \\ = sin φ (τ^{'} (s) (cos φ + κ (s) sin φ) - κ^{'} (s) τ (s) sin φ) > 0 \end{matrix}

for all

s \in I

, we have

| \dot{\bar{γ}} (s) | = \sqrt{{(cos φ + κ (s) sin φ)}^{2} + {(τ (s) sin φ)}^{2}} \neq 0, \bar{γ} (s) \times \dot{\bar{γ}} (s) \times \ddot{\bar{γ}} (s) \neq 0

for all

s \in I

. Thus,

\bar{γ} (s)

is regular and non-degenerate. Moreover, we have

\bar{b} (s) = \frac{\bar{γ} (s) \times \dot{\bar{γ}} (s) \times \ddot{\bar{γ}} (s)}{| \bar{γ} (s) \times \dot{\bar{γ}} (s) \times \ddot{\bar{γ}} (s) |} = sin φ γ (s) + cos φ n (s) .

Therefore,

γ

and

\bar{γ}

are Mannheim mates. □

Remark 6.

With the same assumption as in Theorem 3, suppose that γ and

\bar{γ}

are Mannheim mates with

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

. Then, the following results hold:

(1): Both the curvature κ and torsion τ of γ can not be constants.
(2): If θ is a constant, then $| \dot{\bar{γ}} (s) | \bar{κ} (s) = 0$ . Hence, θ is not a constant.
(3): If $cos φ = 0$ , then $κ (s) = 0$ by Equation (7). Hence, $cos φ \neq 0$ .

Proposition 5.

With the same assumption as in Theorem 3, suppose that γ and

\bar{γ}

are Mannheim mates with

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

. Then, the curvature

\bar{κ}

and the torsion

\bar{τ}

of

\bar{γ}

are given by

\begin{matrix} \bar{κ} (s) = & \frac{τ^{'} (s) sin φ cos φ - (κ^{'} (s) τ (s) - κ (s) τ^{'} (s)) {sin}^{2} φ}{{({(cos φ + κ (s) sin φ)}^{2} + τ^{2} (s) {sin}^{2} φ)}^{\frac{3}{2}}}, \\ \bar{τ} (s) = & - \frac{κ^{'} (s)}{2 (τ^{'} (s) sin φ cos φ - (κ^{'} (s) τ (s) - κ (s) τ^{'} (s)) {sin}^{2} φ)} . \end{matrix}

Proof.

Since

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

, we have

\begin{matrix} \dot{\bar{γ}} (s) = & (cos φ + κ (s) sin φ) t (s) - τ (s) sin φ b (s) . \end{matrix}

Therefore,

\begin{matrix} \ddot{\bar{γ}} (s) = & - (cos φ + κ (s) sin φ) γ (s) + κ^{'} (s) sin φ t (s) \\ + (κ (s) cos φ + (κ^{2} (s) + τ^{2} (s)) sin φ) n (s) - τ^{'} (s) sin φ b (s), \\ \overset{⃛}{\bar{γ}} (s) = & - 2 κ^{'} (s) sin φ γ (s) + (κ^{″} (s) sin φ - κ (s) (κ (s) cos φ + (κ^{2} (s) + τ^{2} (s)) sin φ) \\ - cos φ - κ (s) sin φ) t (s) + (κ^{'} (s) cos φ + 3 (κ (s) κ^{'} (s) + τ (s) τ^{'} (s)) sin φ) n (s) \\ + (τ (s) (κ (s) cos φ + (κ^{2} (s) + τ^{2} (s)) sin φ) - τ^{″} (s) sin φ) b (s) . \end{matrix}

By differentiating

(κ^{2} (s) + τ^{2} (s) - 1) sin φ cos φ = κ (s) ({sin}^{2} φ - {cos}^{2} φ),

we have

2 (κ (s) κ^{'} (s) + τ (s) τ^{'} (s)) sin φ cos φ = κ^{'} (s) ({sin}^{2} φ - {cos}^{2} φ) .

It follows that

\begin{matrix} \det (\bar{γ} (s), \dot{\bar{γ}} (s), \ddot{\bar{γ}} (s), \overset{⃛}{\bar{γ}} (s)) = - \frac{1}{2} κ^{'} (s) (τ^{'} (s) sin φ cos φ - (κ^{'} (s) τ (s) - κ (s) τ^{'} (s)) {sin}^{2} φ) . \end{matrix}

Since

\begin{matrix} | \dot{\bar{γ}} (s) | = & {({(cos φ + κ (s) sin φ)}^{2} + τ^{2} (s) {sin}^{2} φ)}^{\frac{1}{2}}, \\ | \bar{γ} (s) \times \dot{\bar{γ}} (s) \times \ddot{\bar{γ}} (s) | = & τ^{'} (s) sin φ cos φ - (κ^{'} (s) τ (s) - κ (s) τ^{'} (s)) {sin}^{2} φ, \end{matrix}

we have

\begin{matrix} \bar{κ} (s) = & \frac{| \bar{γ} (s) \times \dot{\bar{γ}} (s) \times \ddot{\bar{γ}} (s) |}{| \dot{\bar{γ}} {(s) |}^{3}} \\ = & \frac{τ^{'} (s) sin φ cos φ - (κ^{'} (s) τ (s) - κ (s) τ^{'} (s)) {sin}^{2} φ}{{({(cos φ + κ (s) sin φ)}^{2} + τ^{2} (s) {sin}^{2} φ)}^{\frac{3}{2}}}, \\ \bar{τ} (s) = & \frac{\det (\bar{γ} (s), \dot{\bar{γ}} (s), \ddot{\bar{γ}} (s), \overset{⃛}{\bar{γ}} (s))}{| \bar{γ} (s) \times \dot{\bar{γ}} (s) \times \ddot{\bar{γ}} {(s) |}^{2}} \\ = & - \frac{κ^{'} (s)}{2 (τ^{'} (s) sin φ cos φ - (κ^{'} (s) τ (s) - κ (s) τ^{'} (s)) {sin}^{2} φ)} . \end{matrix}

□

Proposition 6.

With the same assumption as in Theorem 3, suppose that γ and

\bar{γ}

are Mannheim mates with

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

. Then, there exists a smooth function

θ : I \to R

such that the following formulas hold:

(1): $| \dot{\bar{γ}} (s) | cos φ = - sin θ (s),$ $κ (s) sin φ + cos φ = - | \dot{\bar{γ}} (s) | sin θ (s) .$
(2): $| \dot{\bar{γ}} (s) | \bar{τ} (s) sin φ = - cos θ (s),$ $τ (s) sin φ = - | \dot{\bar{γ}} (s) | cos θ (s) .$
(3): $| \dot{\bar{γ}} (s) | sin φ = - κ (s) sin θ (s) - τ (s) cos θ (s),$ $τ (s) cos φ = - | \dot{\bar{γ}} (s) | \bar{τ} (s) sin θ (s) .$
(4): $| \dot{\bar{γ}} (s) | \bar{τ} (s) cos φ = κ (s) cos θ (s) - τ (s) sin θ (s),$ $- sin φ + κ (s) cos φ = | \dot{\bar{γ}} (s) | \bar{τ} (s)$ $cos θ (s) .$

Proof.

By Definition 3 and the proof of Theorem 3, we have

\begin{matrix} \bar{γ} (s) = & cos φ γ (s) - sin φ n (s), \\ \bar{b} (s) = & sin φ γ (s) + cos φ n (s), \\ \bar{t} (s) = & cos θ (s) b (s) - sin θ (s) t (s), \\ \bar{n} (s) = & sin θ (s) b (s) + cos θ (s) t (s) . \end{matrix}

We write the moving frame of

γ

in terms of the moving frame of

\bar{γ}

:

\begin{matrix} γ (s) = & cos φ \bar{γ} (s) + sin φ \bar{b} (s), \\ n (s) = & - sin φ \bar{γ} (s) + cos φ \bar{b} (s), \\ t (s) = & cos θ (s) \bar{t} (s) + sin θ (s) \bar{n} (s), \\ b (s) = & - sin θ (s) \bar{t} (s) + cos θ (s) \bar{n} (s) . \end{matrix}

By differentiating

\bar{γ} (s), \bar{n} (s), \bar{t} (s), \bar{b} (s)

and

γ (s), n (s), t (s), b (s)

, we obtain the formulas. □

Proposition 6 leads to the following result.

Corollary 2.

With the same assumption as in Theorem 3, suppose that γ and

\bar{γ}

are Mannheim mates with

\bar{γ} (s) = cos φ γ (s) - sin φ n (s)

. Then, the following relations hold:

(1): $cos φ (κ (s) sin φ + cos φ) = {sin}^{2} θ (s)$ .
(2): $τ (s) \bar{τ} (s) {sin}^{2} φ = {cos}^{2} θ (s)$ .
(3): $τ (s) sin φ cos φ = \bar{τ} (s) sin θ (s) (κ (s) sin θ (s) + τ (s) cos θ (s))$ .
(4): $cos φ (- sin φ + κ (s) cos φ) = cos θ (s) (κ (s) cos θ (s) - τ (s) sin θ (s))$ .

We obtain the relation between Mannheim curves and general helices in

S^{3}

in next proposition.

Proposition 7.

Let

γ : I \to S^{3}

be a non-degenerate twisted curve parameterized by arc-length. If γ is a general helix, then γ is not a Mannheim curve.

Proof.

Since

γ

is a general helix, we have that the curvature

κ

and torsion

τ

of

γ

satisfy

τ (s) = a κ (s) \pm 1

, where a is a constant. If

γ

is a Mannheim curve, by Equation (7) in Theorem 3, we have

((a^{2} + 1) κ (s) \pm 2 a) sin φ cos φ = {sin}^{2} φ - {cos}^{2} φ,

then

κ

is a constant by

sin φ cos φ \neq 0

(cf. Remark 6 (3)). It follows that

τ

is a constant. This is a contradiction (cf. Remark 6 (1)). Hence,

γ

is not a Mannheim curve. □

Example 2.

We consider the smooth functions

κ, τ : (- π / 2, π / 2) \to R

as

κ (s) = cos s

and

τ (s) = sin s

. By Theorem 1, there exists a spherical regular curve

γ : (- π / 2, π / 2) \to S^{3}

whose associated curvature and torsion are

κ, τ

and s is the arc-length parameter of γ. If we take

φ = π / 4

, then

κ, τ

satisfy Equations (7) and (8) in Theorem 3. Hence, γ is a Mannheim curve.

3. Spherical Framed Curves

Definition 4.

We say that

(γ, ν_{1}, ν_{2}) : I \to Δ

is a spherical framed curve if

\dot{γ} (t) \cdot ν_{1} (t) = 0

and

\dot{γ} (t) \cdot ν_{2} (t) = 0

for all

t \in I

. We say that

γ : I \to S^{3}

is a spherical framed base curve if there exists

(ν_{1}, ν_{2}) : I \to Δ_{2}

such that

(γ, ν_{1}, ν_{2})

is a spherical framed curve.

We denote

μ (t) = γ (t) \times ν_{1} (t) \times ν_{2} (t)

. Then,

{γ (t), ν_{1} (t), ν_{2} (t), μ (t)}

is a moving frame along the spherical framed base curve

γ (t)

in

S^{3}

, and we have the Frenet–Serret- type formula:

(\begin{matrix} \dot{γ} (t) \\ \dot{ν_{1}} (t) \\ \dot{ν_{2}} (t) \\ \dot{μ} (t) \end{matrix}) = (\begin{matrix} 0 & 0 & 0 & α (t) \\ 0 & 0 & ℓ (t) & m (t) \\ 0 & - ℓ (t) & 0 & n (t) \\ - α (t) & - m (t) & - n (t) & 0 \end{matrix}) (\begin{matrix} γ (t) \\ ν_{1} (t) \\ ν_{2} (t) \\ μ (t) \end{matrix}),

where

α (t) = \dot{γ} (t) \cdot μ (t), ℓ (t) = {\dot{ν}}_{1} (t) \cdot ν_{2} (t), m (t) = {\dot{ν}}_{1} (t) \cdot μ (t)

and

n (t) = {\dot{ν}}_{2} (t) \cdot μ (t)

. We call the mapping

(α, ℓ, m, n)

the curvature of the spherical framed curve

(γ, ν_{1}, ν_{2})

. Note that

t_{0}

is a singular point of

γ

if and only if

α (t_{0}) = 0

.

Definition 5.

Let

(γ, ν_{1}, ν_{2})

and

(\tilde{γ}, {\tilde{ν}}_{1}, {\tilde{ν}}_{2}) : I \to Δ

be spherical framed curves. We say that

(γ, ν_{1}, ν_{2})

and

(\tilde{γ}, {\tilde{ν}}_{1}, {\tilde{ν}}_{2})

are congruent as spherical framed curves if there exists

A \in S O (4)

such that

\tilde{γ} (t) = A (γ (t))

,

{\tilde{ν}}_{1} (t) = A (ν_{1} (t))

and

{\tilde{ν}}_{2} (t) = A (ν_{2} (t))

for all

t \in I

.

We have the existence and uniqueness theorems for spherical framed curves in terms of the curvatures. The proofs are similar to the cases of Legendre curves in the unit tangent bundle ([16]) and framed curves in the Euclidean space ([17]), so we omit them.

Theorem 4

(Existence theorem for spherical framed curves). Let

(α, ℓ, m, n) : I \to R^{4}

be a smooth mapping. Then, there exists a spherical framed curve

(γ, ν_{1}, ν_{2}) : I \to Δ

whose curvature is given by

(α, ℓ, m, n)

.

Theorem 5

(Uniqueness theorem for spherical framed curves). Let

(γ, ν_{1}, ν_{2})

and

(\tilde{γ}, {\tilde{ν}}_{1}, {\tilde{ν}}_{2}) : I \to Δ

be spherical framed curves with curvatures

(α, ℓ, m, n)

and

(\tilde{α}, \tilde{ℓ}, \tilde{m}, \tilde{n})

, respectively. Then,

(γ, ν_{1}, ν_{2})

and

(\tilde{γ}, {\tilde{ν}}_{1}, {\tilde{ν}}_{2})

are congruent as spherical framed curves if and only if the curvatures

(α, ℓ, m, n)

and

(\tilde{α}, \tilde{ℓ}, \tilde{m}, \tilde{n})

coincide.

Let

(γ, ν_{1}, ν_{2}) : I \to Δ

be a spherical framed curve with curvature

(α, ℓ, m, n)

. For the normal plane spanned by

ν_{1} (t)

and

ν_{2} (t)

, there are other frames by rotations (cf. [20]). We define

({\tilde{ν}}_{1} (t), {\tilde{ν}}_{2} (t)) \in Δ_{2}

by

\begin{matrix} (\begin{matrix} {\tilde{ν}}_{1} (t) \\ {\tilde{ν}}_{2} (t) \end{matrix}) & = (\begin{matrix} cos θ (t) & - sin θ (t) \\ sin θ (t) & cos θ (t) \end{matrix}) (\begin{matrix} ν_{1} (t) \\ ν_{2} (t) \end{matrix}), \end{matrix}

where

θ (t)

is a smooth function. Then,

(γ, {\tilde{ν}}_{1}, {\tilde{ν}}_{2}) : I \to Δ

is also a spherical framed curve and

\tilde{μ} (t) = μ (t)

. By a direct calculation, we have

\begin{matrix} {\dot{\tilde{ν}}}_{1} (t) = & (ℓ (t) - \dot{θ} (t)) sin θ (t) ν_{1} (t) + (ℓ (t) - \dot{θ} (t)) cos θ (t) ν_{2} (t) + (m (t) cos θ (t) - n (t) sin θ (t)) μ (t), \\ {\dot{\tilde{ν}}}_{2} (t) = & (ℓ (t) - \dot{θ} (t)) cos θ (t) ν_{1} (t) + (ℓ (t) - \dot{θ} (t)) sin θ (t) ν_{2} (t) + (m (t) sin θ (t) + n (t) cos θ (t)) μ (t) . \end{matrix}

If we take a smooth function

θ : I \to R

that satisfies

\dot{θ} (t) = ℓ (t)

, then we call the frame

{{\tilde{ν}}_{1} (t), {\tilde{ν}}_{2} (t), μ (t)}

an adapted frame along

γ (t)

. It follows that the Frenet–Serret-type formula is given by

(\begin{matrix} \dot{γ} (t) \\ {\dot{\tilde{ν}}}_{1} (t) \\ {\dot{\tilde{ν}}}_{2} (t) \\ \dot{μ} (t) \end{matrix}) = (\begin{matrix} 0 & 0 & 0 & α (t) \\ 0 & 0 & 0 & \tilde{m} (t) \\ 0 & 0 & 0 & \tilde{n} (t) \\ - α (t) & - \tilde{m} (t) & - \tilde{n} (t) & 0 \end{matrix}) (\begin{matrix} γ (t) \\ ν_{1} (t) \\ ν_{2} (t) \\ μ (t) \end{matrix}),

where

\tilde{m} (t)

and

\tilde{n} (t)

are given by

\begin{matrix} (\begin{matrix} \tilde{m} (t) \\ \tilde{n} (t) \end{matrix}) & = (\begin{matrix} cos θ (t) & - sin θ (t) \\ sin θ (t) & cos θ (t) \end{matrix}) (\begin{matrix} m (t) \\ n (t) \end{matrix}) . \end{matrix}

3.1. Bertrand Curves of Spherical Framed Curves

Let

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2}) : I \to Δ

be spherical framed curves with curvatures

(α, ℓ, m, n)

and

(\bar{α}, \bar{ℓ}, \bar{m}, \bar{n})

, respectively. Suppose that

\bar{γ} ≢ \pm γ

.

Definition 6.

We say that

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

are Bertrand mates if there exists a smooth function

φ : I \to R

such that

\bar{γ} (t) = cos φ (t) γ (t) - sin φ (t) ν_{1} (t)

and

{\bar{ν}}_{1} (t) = sin φ (t) γ (t) + cos φ (t) ν_{1} (t)

for all

t \in I

. We also say that

(γ, ν_{1}, ν_{2}) : I \to Δ

is a Bertrand curve if there exists a spherical framed curve

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2}) : I \to Δ

such that

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

are Bertrand mates.

Lemma 4.

Under the notations of Definition 6, if

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

are Bertrand mates, then φ is a constant with

sin φ \neq 0

.

Proof.

By differentiating

\bar{γ} (t) = cos φ (t) γ (t) - sin φ (t) ν_{1} (t)

, we have

\begin{matrix} \bar{α} (t) \bar{μ} (t) = & - \dot{φ} (t) sin φ (t) γ (t) - \dot{φ} (t) cos φ (t) ν_{1} (t) - ℓ (t) sin φ (t) ν_{2} (t) \\ + (α (t) cos φ (t) - m (t) sin φ (t)) μ (t) . \end{matrix}

Since

{\bar{ν}}_{1} (t) = sin φ (t) γ (t) + cos φ (t) ν_{1} (t)

, we have

\dot{φ} (t) = 0

for all

t \in I

. Therefore,

φ

is a constant. If

sin φ = 0

, then

\bar{γ} (t) = \pm γ (t)

for all

t \in I

. Hence,

φ

is a constant with

sin φ \neq 0

. □

Theorem 6.

Let

(γ, ν_{1}, ν_{2}) : I \to Δ

be a spherical framed curve with curvature

(α, ℓ, m, n)

. Then,

(γ, ν_{1}, ν_{2})

is a Bertrand curve if and only if there exist a constant φ with

sin φ \neq 0

and a smooth function

θ : I \to R

such that

\begin{matrix} ℓ (t) sin φ cos θ (t) + (α (t) cos φ - m (t) sin φ) sin θ (t) = 0 \end{matrix}

(13)

for all

t \in I

.

Proof.

Suppose that

(γ, ν_{1}, ν_{2})

is a Bertrand curve. By Lemma 4, there exist a spherical framed curve

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

and a constant

φ

with

sin φ \neq 0

such that

\bar{γ} (t) = cos φ γ (t) - sin φ ν_{1} (t)

and

{\bar{ν}}_{1} (t) = sin φ γ (t) + cos φ ν_{1} (t)

for all

t \in I

. By differentiating

\bar{γ} (t) = cos φ γ (t) - sin φ ν_{1} (t)

, we have

\bar{α} (t) \bar{μ} (t) = - ℓ (t) sin φ ν_{2} (t) + (α (t) cos φ - m (t) sin φ) μ (t)

. Since

{\bar{ν}}_{1} (t) = sin φ γ (t) + cos φ ν_{1} (t)

, there exists a smooth function

θ : I \to R

such that

\begin{matrix} (\begin{matrix} {\bar{ν}}_{2} (t) \\ \bar{μ} (t) \end{matrix}) & = (\begin{matrix} cos θ (t) & - sin θ (t) \\ sin θ (t) & cos θ (t) \end{matrix}) (\begin{matrix} ν_{2} (t) \\ μ (t) \end{matrix}) . \end{matrix}

(14)

Then, we have

\begin{matrix} \bar{α} (t) sin θ (t) = - ℓ (t) sin φ, \bar{α} (t) cos θ (t) = α (t) cos φ - m (t) sin φ . \end{matrix}

It follows that

ℓ (t) sin φ cos θ (t) + (α (t) cos φ - m (t) sin φ) sin θ (t) = 0

for all

t \in I

.

Conversely, suppose that there exists a smooth function

θ : I \to R

such that

ℓ (t) sin φ

cos θ (t) + (α (t) cos φ - m (t) sin φ) sin θ (t) = 0

for all

t \in I

. We define a mapping

(γ, ν_{1}, ν_{2}) : I \to Δ

by

\bar{γ} (t) = cos φ γ (t) - sin φ ν_{1} (t), {\bar{ν}}_{1} (t) = sin φ γ (t) + cos φ ν_{1} (t)

and

{\bar{ν}}_{2} (t) = cos θ (t) ν_{2} (t) - sin θ (t) μ (t) .

Then,

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

is a spherical framed curve. Therefore,

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

are Bertrand mates. □

Proposition 8.

Suppose that

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2}) : I \to Δ

are Bertrand mates, where

\bar{γ} (t) = cos φ γ (t) - sin φ ν_{1} (t)

and

ℓ (t) sin φ cos θ (t) + (α (t) cos φ - m (t) sin φ) sin θ (t) = 0

for all

t \in I

. Then, the curvature

(\bar{α}, \bar{ℓ}, \bar{m}, \bar{n})

of

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

is given by

\begin{matrix} \bar{α} (t) = & - ℓ (t) sin φ sin θ (t) + (α (t) cos φ - m (t) sin φ) cos θ (t), \\ \bar{ℓ} (t) = & ℓ (t) cos φ cos θ (t) - (α (t) sin φ + m (t) cos φ) sin θ (t), \\ \bar{m} (t) = & ℓ (t) cos φ sin θ (t) + (α (t) sin φ + m (t) cos φ) cos θ (t), \\ \bar{n} (t) = & n (t) - \dot{θ} (t) . \end{matrix}

Proof.

By Equation (14), we have

{\bar{ν}}_{2} (t) = cos θ (t) ν_{2} (t) - sin θ (t) μ (t)

. By differentiating, we have

\begin{matrix} - \bar{ℓ} (t) {\bar{ν}}_{1} (t) + \bar{n} (t) \bar{μ} (t) = & α (t) sin θ (t) γ (t) + (- ℓ (t) cos θ (t) + m (t) sin θ (t)) ν_{1} (t) \\ + (n (t) - \dot{θ} (t)) sin θ (t) ν_{2} (t) + (n (t) - \dot{θ} (t)) cos θ (t) μ (t) . \end{matrix}

Since

{\bar{ν}}_{1} (t) = sin φ γ (t) + cos φ ν_{1} (t)

and

\bar{μ} (t) = sin θ (t) ν_{2} (t) + cos θ (t) μ (t)

, we have

\begin{matrix} \bar{ℓ} (t) sin φ = - α (t) sin θ (t), \bar{ℓ} (t) cos φ = ℓ (t) cos θ (t) - m (t) sin θ (t), \bar{n} (t) = n (t) - \dot{θ} (t) . \end{matrix}

It follows that

\bar{ℓ} (t) = ℓ (t) cos φ cos θ (t) - (α (t) sin φ + m (t) cos φ) sin θ (t) .

Moreover, by differentiating

\bar{μ} (t) = sin θ (t) ν_{2} (t) + cos θ (t) μ (t)

, we have

\begin{matrix} - \bar{α} (t) \bar{γ} (t) - \bar{m} (t) {\bar{ν}}_{1} (t) - \bar{n} (t) {\bar{ν}}_{2} (t) = & - α (t) cos θ (t) γ (t) - (ℓ (t) sin θ (t) + m (t) cos θ (t)) ν_{1} (t) \\ + (\dot{θ} (t) - n (t)) cos θ (t) ν_{2} (t) + (n (t) - \dot{θ} (t)) sin θ (t) μ (t) . \end{matrix}

Since

\bar{γ} (t) = cos φ γ (t) - sin φ ν_{1} (t)

,

{\bar{ν}}_{1} (t) = sin φ γ (t) + cos φ ν_{1} (t)

and

{\bar{ν}}_{2} (t) = cos θ (t) ν_{2} (t) - sin θ (t) μ (t)

, we have

\begin{matrix} \bar{α} (t) cos φ + \bar{m} (t) sin φ & = α (t) cos θ (t), \\ \bar{α} (t) sin φ - \bar{m} (t) cos φ & = - ℓ (t) sin θ (t) - m (t) cos θ (t) . \end{matrix}

It follows that

\bar{α} (t) = - ℓ (t) sin φ sin θ (t) + (α (t) cos φ - m (t) sin φ) cos θ (t)

and

\bar{m} (t) = ℓ (t) cos φ sin θ (t) + (α (t) sin φ + m (t) cos φ) cos θ (t) .

□

Corollary 3.

Let

(γ, ν_{1}, ν_{2}) : I \to Δ

be a spherical framed curve with curvature

(α, ℓ, m, n)

. If

ℓ (t) = 0

for all

t \in I

, then

(γ, ν_{1}, ν_{2})

is a Bertrand curve.

Proof.

If we take

θ (t) = 0

, then Equation (13) is satisfied. □

Let

(γ, ν_{1}, ν_{2}) : I \to Δ

be a spherical framed curve with curvature

(α, ℓ, m, n)

. If we take an adapted frame

{{\tilde{ν}}_{1} (t), {\tilde{ν}}_{2} (t), μ (t)}

, then the curvature is given by

(α, 0, \tilde{m}, \tilde{n})

. By Corollary 3, we have the following.

Corollary 4.

For an adapted frame,

(γ, {\tilde{ν}}_{1}, {\tilde{ν}}_{2})

is always a Bertrand curve.

Proposition 9.

Suppose that

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2}) : I \to Δ

are Bertrand mates with curvatures

(α, ℓ, m, n)

and

(\bar{α}, \bar{ℓ}, \bar{m}, \bar{n})

, respectively. Then, there exist a constant φ with

sin φ \neq 0

and a smooth function

θ : I \to R

such that the following formulas hold:

(1): $ℓ (t) sin φ = - \bar{α} (t) sin θ (t),$ $\bar{ℓ} (t) sin φ = - α (t) sin θ (t) .$
(2): $α (t) cos φ - m (t) sin φ = \bar{α} (t) cos θ (t),$ $\bar{α} (t) cos φ + \bar{m} (t) sin φ = α (t) cos θ (t) .$
(3): $ℓ (t) cos φ = \bar{ℓ} (t) cos θ (t) + \bar{m} (t) sin θ (t),$ $\bar{ℓ} (t) cos φ = ℓ (t) cos θ (t) - m (t) sin θ (t) .$
(4): $α (t) sin φ + m (t) cos φ = - \bar{ℓ} (t) sin θ (t) + \bar{m} (t) cos θ (t), - \bar{α} (t) sin φ + \bar{m} (t) cos φ = ℓ (t) sin θ (t) + m (t) cos θ (t) .$

Proof.

By Definition 6 and the proof of Theorem 6, we have

\begin{matrix} \bar{γ} (t) = & cos φ γ (t) - sin φ ν_{1} (t), \\ {\bar{ν}}_{1} (t) = & sin φ γ (t) + cos φ ν_{1} (t), \\ {\bar{ν}}_{2} (t) = & cos θ (t) ν_{2} (t) - sin θ (t) μ (t), \\ \bar{μ} (t) = & sin θ (t) ν_{2} (t) + cos θ (t) μ (t) . \end{matrix}

We write the moving frame of

γ

in terms of the moving frame of

\bar{γ}

:

\begin{matrix} γ (t) = & cos φ \bar{γ} (t) + sin φ {\bar{ν}}_{1} (t), \\ ν_{1} (t) = & - sin φ \bar{γ} (t) + cos φ {\bar{ν}}_{1} (t), \\ ν_{2} (t) = & cos θ (t) {\bar{ν}}_{2} (t) + sin θ (t) \bar{μ} (t), \\ μ (t) = & - sin θ (t) {\bar{ν}}_{2} (t) + cos θ (t) \bar{μ} (t) . \end{matrix}

By differentiating

\bar{γ} (t), {\bar{ν}}_{1} (t), {\bar{ν}}_{2} (t), \bar{μ} (t)

and

γ (t), ν_{1} (t), ν_{2} (t), μ (t)

, we obtain the formulas. □

By Proposition 9, we have the following relations.

Corollary 5.

With the same assumption as in Proposition 9, suppose that

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

are Bertrand mates, then the following relations hold:

(1): $ℓ (t) \bar{ℓ} (t) {sin}^{2} φ = α (t) \bar{α} (t) {sin}^{2} θ (t)$ .
(2): $(α (t) cos φ - m (t) sin φ) (\bar{α} (t) cos φ + \bar{m} (t) sin φ) = α (t) \bar{α} (t) {cos}^{2} θ (t)$ .
(3): $ℓ (t) \bar{ℓ} (t) {cos}^{2} φ = (ℓ (t) cos θ (t) - m (t) sin θ (t)) (\bar{ℓ} (t) cos θ (t) + \bar{m} (t) sin θ (t))$ .
(4): $(α (t) sin φ + m (t) cos φ) (\bar{α} (t) sin φ - \bar{m} (t) cos φ) = (ℓ (t) sin θ (t) + m (t) cos θ (t)) (\bar{ℓ} (t) sin θ (t) - \bar{m} (t) cos θ (t))$ .

3.2. Mannheim Curves of Spherical Framed Curves

Let

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2}) : I \to Δ

be spherical framed curves with curvatures

(α, ℓ, m, n)

and

(\bar{α}, \bar{ℓ}, \bar{m}, \bar{n})

, respectively. Suppose that

\bar{γ} ≢ \pm γ

.

Definition 7.

We say that

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

are Mannheim mates if there exists a smooth function

φ : I \to R

such that

\bar{γ} (t) = cos φ (t) γ (t) - sin φ (t) ν_{1} (t)

and

{\bar{ν}}_{2} (t) = sin φ (t) γ (t) + cos φ (t) ν_{1} (t)

for all

t \in I

. We also say that

(γ, ν_{1}, ν_{2}) : I \to Δ

is a Mannheim curve if there exists a spherical framed curve

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2}) : I \to Δ

such that

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

are Mannheim mates.

Lemma 5.

Under the notations of Definition 7, if

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

are Mannheim mates, then φ is a constant with

sin φ \neq 0

.

Proof.

By differentiating

\bar{γ} (t) = cos φ (t) γ (t) - sin φ (t) ν_{1} (t)

, we have

\begin{matrix} \bar{α} (t) \bar{μ} (t) = & - \dot{φ} (t) sin φ (t) γ (t) - \dot{φ} (t) cos φ (t) ν_{1} (t) - ℓ (t) sin φ (t) ν_{2} (t) \\ + (α (t) cos φ (t) - m (t) sin φ (t)) μ (t) . \end{matrix}

Since

{\bar{ν}}_{2} (t) = sin φ (t) γ (t) + cos φ (t) ν_{1} (t)

, we have

\dot{φ} (t) = 0

for all

t \in I

. Therefore,

φ

is a constant. If

sin φ = 0

, then

\bar{γ} (t) = \pm γ (t)

for all

t \in I

. Hence,

φ

is a constant with

sin φ \neq 0

. □

Theorem 7.

Let

(γ, ν_{1}, ν_{2}) : I \to Δ

be a spherical framed curve with curvature

(α, ℓ, m, n)

. Then,

(γ, ν_{1}, ν_{2})

is a Mannheim curve if and only if there exist a constant φ with

sin φ \neq 0

and a smooth function

ϕ : I \to R

such that

\begin{matrix} - ℓ (t) sin φ sin ϕ (t) + (α (t) cos φ - m (t) sin φ) cos ϕ (t) = 0 \end{matrix}

(15)

for all

t \in I

.

Proof.

Suppose that

(γ, ν_{1}, ν_{2})

is a Mannheim curve. By Lemma 5, there exist a spherical framed curve

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

and a constant

φ

with

sin φ \neq 0

such that

\bar{γ} (t) = cos φ γ (t) - sin φ ν_{1} (t)

and

{\bar{ν}}_{2} (t) = sin φ γ (t) + cos φ ν_{1} (t)

for all

t \in I

. By differentiating

\bar{γ} (t) = cos φ γ (t) - sin φ ν_{1} (t)

, we have

\bar{α} (t) \bar{μ} (t) = (α (t) cos φ - m (t) sin φ) μ (t) - ℓ (t) sin φ ν_{2} (t)

. Since

{\bar{ν}}_{2} (t) = sin φ γ (t) + cos φ ν_{1} (t)

, there exists a smooth function

ϕ : I \to R

such that

\begin{matrix} (\begin{matrix} \bar{μ} (t) \\ {\bar{ν}}_{1} (t) \end{matrix}) & = (\begin{matrix} cos ϕ (t) & - sin ϕ (t) \\ sin ϕ (t) & cos ϕ (t) \end{matrix}) (\begin{matrix} ν_{2} (t) \\ μ (t) \end{matrix}) . \end{matrix}

(16)

Then, we have

\begin{matrix} \bar{α} (t) cos ϕ (t) = - ℓ (t) sin φ, - \bar{α} sin ϕ (t) = α (t) cos φ - m (t) sin φ . \end{matrix}

It follows that

- ℓ (t) sin φ sin ϕ (t) + (α (t) cos φ - m (t) sin φ) cos ϕ (t) = 0

for all

t \in I

.

Conversely, suppose that

- ℓ (t) sin φ sin ϕ (t) + (α (t) cos φ - m (t) sin φ) cos ϕ (t) = 0

for all

t \in I

. We define a mapping

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2}) : I \to Δ

by

\bar{γ} (t) = cos φ γ (t) - sin φ ν_{1} (t), {\bar{ν}}_{1} (t) = sin ϕ (t) ν_{2} (t) + cos ϕ (t) μ (t)

and

{\bar{ν}}_{2} (t) = sin φ γ (t) + cos φ ν_{1} (t) .

Then,

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

is a spherical framed curve. Therefore,

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

are Mannheim mates. □

Proposition 10.

Suppose that

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2}) : I \to Δ

are Mannheim mates, where

\bar{γ} (t) = cos φ γ (t) - sin φ ν_{1} (t)

and

- ℓ (t) sin φ sin ϕ (t) + (α (t) cos φ - m (t) sin φ) cos ϕ (t) = 0

for all

t \in I

. Then, the curvature

(\bar{α}, \bar{ℓ}, \bar{m}, \bar{n})

of

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

is given by

\begin{matrix} \bar{α} (t) = & - ℓ (t) sin φ cos ϕ (t) + (- α (t) cos φ + m (t) sin φ) sin ϕ (t), \\ \bar{ℓ} (t) = & ℓ (t) cos φ sin ϕ (t) - (α (t) sin φ + m (t) cos φ) cos ϕ (t), \\ \bar{m} (t) = & \dot{ϕ} (t) - n (t), \\ \bar{n} (t) = & - ℓ (t) cos φ cos ϕ (t) - (α (t) sin φ + m (t) cos φ) sin ϕ (t) . \end{matrix}

Proof.

By Equation (16), we have

\bar{μ} (t) = cos ϕ (t) ν_{2} (t) - sin ϕ (t) μ (t)

. By differentiating, we have

\begin{matrix} - \bar{α} (t) \bar{γ} (t) - \bar{m} (t) {\bar{ν}}_{1} (t) - \bar{n} (t) {\bar{ν}}_{2} (t) = & α (t) sin ϕ (t) γ + (- ℓ (t) cos ϕ (t) + m (t) sin ϕ (t)) ν_{1} (t) \\ + (n (t) - \dot{ϕ} (t)) sin ϕ (t) ν_{2} (t) + (n (t) - \dot{ϕ} (t)) cos ϕ (t) μ (t) . \end{matrix}

Since

\bar{γ} (t) = cos φ γ (t) - sin φ ν_{1} (t)

,

{\bar{ν}}_{1} (t) = sin ϕ (t) ν_{2} (t) + cos ϕ (t) μ (t)

and

{\bar{ν}}_{2} (t) = sin φ γ (t) + cos φ ν_{1} (t)

, we have

\begin{matrix} \bar{m} (t) = & \dot{ϕ} (t) - n (t), \\ \bar{α} (t) cos φ + \bar{n} (t) sin φ = & - α (t) sin ϕ (t), \\ \bar{α} (t) sin φ - \bar{n} (t) cos φ = & - ℓ (t) cos ϕ (t) + m (t) sin ϕ (t) . \end{matrix}

It follows that

\bar{α} (t) = - ℓ (t) sin φ cos ϕ (t) + (- α (t) cos φ + m (t) sin φ) sin ϕ (t)

and

\bar{n} (t) = ℓ (t) cos φ cos ϕ (t) - (α (t) sin φ + m (t) cos φ) sin ϕ (t) .

Moreover, by differentiating

{\bar{ν}}_{1} (t) = sin ϕ (t) ν_{2} (t) + cos ϕ (t) μ (t)

, we have

\begin{matrix} \bar{ℓ} (t) {\bar{ν}}_{2} (t) + \bar{m} (t) \bar{μ} (t) = & - α (t) cos ϕ (t) γ (t) - (ℓ (t) sin ϕ (t) + m (t) cos ϕ (t)) ν_{1} (t) \\ + (\dot{ϕ} (t) - n (t)) cos ϕ (t) ν_{2} (t) + (n (t) - \dot{ϕ} (t)) sin ϕ (t) μ (t) . \end{matrix}

Since

{\bar{ν}}_{2} (t) = sin φ γ (t) + cos φ ν_{1} (t)

, we have

\begin{matrix} \bar{ℓ} (t) sin φ = & - α (t) cos ϕ (t), \\ \bar{ℓ} (t) cos φ = & - (ℓ (t) sin ϕ (t) + m (t) cos ϕ (t)) . \end{matrix}

It follows that

\bar{ℓ} (t) = - ℓ (t) cos φ sin ϕ (t) - (α (t) sin φ + m (t) cos φ) cos ϕ (t) .

□

Corollary 6.

Let

(γ, ν_{1}, ν_{2}) : I \to Δ

be a spherical framed curve with curvature

(α, ℓ, m, n)

. If

ℓ (t) = 0

for all

t \in I

, then

(γ, ν_{1}, ν_{2})

is a Mannheim curve.

Proof.

If we take

ϕ (t) = π / 2

, then Equation (15) is satisfied. □

Let

(γ, ν_{1}, ν_{2}) : I \to Δ

be a spherical framed curve with curvature

(α, ℓ, m, n)

. If we take an adapted frame

{{\tilde{ν}}_{1} (t), {\tilde{ν}}_{2} (t), μ (t)}

, then the curvature of

(γ, {\tilde{ν}}_{1}, {\tilde{ν}}_{2})

is given by

(α, 0, \tilde{m}, \tilde{n})

. By Corollary 6, we have the following.

Corollary 7.

For an adapted frame,

(γ, {\tilde{ν}}_{1}, {\tilde{ν}}_{2})

is always a Mannheim curve.

Proposition 11.

Suppose that

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2}) : I \to Δ

are Mannheim mates with curvatures

(α, ℓ, m, n)

and

(\bar{α}, \bar{ℓ}, \bar{m}, \bar{n})

, respectively. Then, there exist a constant φ with

sin φ \neq 0

and a smooth function

ϕ : I \to R

such that the following formulas hold:

(1): $α (t) cos φ - m (t) sin φ = - \bar{α} (t) sin ϕ (t),$ $\bar{α} (t) cos φ + \bar{n} (t) sin φ = - α (t) sin ϕ (t) .$
(2): $ℓ (t) sin φ = - \bar{α} (t) cos ϕ (t),$ $\bar{ℓ} (t) sin φ = - α (t) cos ϕ (t) .$
(3): $ℓ (t) cos φ = - \bar{ℓ} (t) sin ϕ (t) + \bar{n} (t) cos ϕ (t),$ $\bar{ℓ} (t) cos φ = - ℓ (t) sin ϕ (t) - m (t) cos ϕ (t) .$
(4): $α (t) sin φ + m (t) cos φ = - \bar{ℓ} (t) cos ϕ (t) - \bar{n} (t) sin ϕ (t), \bar{α} (t) sin φ - \bar{n} (t) cos φ = - ℓ (t) cos ϕ (t) + m (t) sin ϕ (t) .$

Proof.

By Definition 7 and the proof of Theorem 7, we have

\begin{matrix} \bar{γ} (t) = & cos φ γ (t) - sin φ ν_{1} (t), \\ {\bar{ν}}_{2} (t) = & sin φ γ (t) + cos φ ν_{1} (t), \\ \bar{μ} (t) = & cos ϕ (t) ν_{2} (t) - sin ϕ (t) μ (t), \\ {\bar{ν}}_{1} (t) = & sin ϕ (t) ν_{2} (t) + cos ϕ (t) μ (t) . \end{matrix}

We write the moving frame of

γ

in terms of the moving frame of

\bar{γ}

:

\begin{matrix} γ (t) = & cos φ \bar{γ} (t) + sin φ {\bar{ν}}_{2} (t), \\ ν_{1} (t) = & - sin φ \bar{γ} (t) + cos φ {\bar{ν}}_{2} (t), \\ ν_{2} (t) = & cos ϕ (t) \bar{μ} (t) + sin ϕ (t) {\bar{ν}}_{1} (t), \\ μ (t) = & - sin ϕ (t) \bar{μ} (t) + cos ϕ (t) {\bar{ν}}_{1} (t) . \end{matrix}

By differentiating

\bar{γ} (t), {\bar{ν}}_{1} (t), {\bar{ν}}_{2} (t), \bar{μ} (t)

and

γ (t), ν_{1} (t), ν_{2} (t), μ (t)

, we obtain the formulas. □

By Proposition 11, we have the following relations.

Corollary 8.

With the same assumption as in Proposition 11, suppose that

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

are Mannheim mates, then the following relations hold:

(1): $(α (t) cos φ - m (t) sin φ) (\bar{α} (t) cos φ + \bar{n} (t) sin φ) = α (t) \bar{α} (t) {sin}^{2} ϕ (t)$ .
(2): $ℓ (t) \bar{ℓ} (t) {sin}^{2} φ = α (t) \bar{α} (t) {cos}^{2} ϕ (t)$ .
(3): $ℓ (t) \bar{ℓ} (t) {cos}^{2} φ = (ℓ (t) sin ϕ (t) + m (t) cos ϕ (t)) (\bar{ℓ} (t) sin ϕ (t) - \bar{n} (t) cos ϕ (t))$ .
(4): $(α (t) sin φ + m (t) cos φ) (\bar{α} (t) sin φ - \bar{n} (t) cos φ) = (ℓ (t) cos ϕ (t) - m (t) sin ϕ (t)) (\bar{ℓ} (t) cos ϕ (t) + \bar{n} (t) sin ϕ (t))$ .

Theorem 8.

Let

(γ, ν_{1}, ν_{2}) : I \to Δ

be a spherical framed curve with curvature

(α, ℓ, m, n)

. Then,

(γ, ν_{1}, ν_{2})

is a Bertrand curve if and only if

(γ, ν_{1}, ν_{2})

is a Mannheim curve.

Proof.

Suppose that

(γ, ν_{1}, ν_{2})

is a Bertrand curve. By Theorem 6, there exist a constant

φ

with

sin φ \neq 0

and a smooth function

θ : I \to R

such that

ℓ (t) sin φ cos θ (t) + (α (t) cos φ - m (t) sin φ) sin θ (t) = 0

for all

t \in I

. If

ϕ (t) = θ (t) - π / 2

, then we have

- ℓ (t) sin φ sin ϕ (t) + (α (t) cos φ - m (t) sin φ) cos ϕ (t) = 0

for all

t \in I

. By Theorem 7,

(γ, ν_{1}, ν_{2})

is a Mannheim curve.

Conversely, suppose that

(γ, ν_{1}, ν_{2})

is a Mannheim curve. By Theorem 7, there exist a constant

φ

with

sin φ \neq 0

and a smooth function

ϕ : I \to R

such that

- ℓ (t) sin φ sin ϕ (t) + (α (t) cos φ - m (t) sin φ) cos ϕ (t) = 0

for all

t \in I

. If

θ (t) = ϕ (t) + π / 2

, then we have

ℓ (t) sin φ cos θ (t) + (α (t) cos φ - m (t) sin φ) sin θ (t) = 0

for all

t \in I

. By Theorem 6,

(γ, ν_{1}, ν_{2})

is a Bertrand curve. □

Example 3.

Let

(γ, ν_{1}, ν_{2}) : R \to Δ

,

\begin{matrix} γ (t) = & \frac{1}{\sqrt{2 t^{2} + \frac{5}{4}}} (t sin t + cos t, - t cos t + sin t, t sin 2 t + \frac{1}{2} cos 2 t, - t cos 2 t + \frac{1}{2} sin 2 t), \\ ν_{1} (t) = & \frac{1}{\sqrt{2}} (- sin t, cos t, sin 2 t, - cos 2 t), \\ ν_{2} (t) = & \frac{1}{\sqrt{20 t^{2} + \frac{9}{2}}} (- 4 t cos t + \frac{3}{2} sin t, - 4 t sin t - \frac{3}{2} cos t, 2 t cos 2 t + \frac{3}{2} sin 2 t, \\ 2 t sin 2 t - \frac{3}{2} cos 2 t) . \end{matrix}

Then,

\begin{matrix} \dot{γ} (t) = & \frac{t}{{(2 t^{2} + \frac{5}{4})}^{\frac{3}{2}}} ((2 t^{2} - \frac{3}{4}) cos t - 2 t sin t, (2 t^{2} - \frac{3}{4}) sin t + 2 t cos t, \\ 2 (2 t^{2} + \frac{3}{4}) cos 2 t - 2 t sin 2 t, 2 (2 t^{2} + \frac{3}{4}) sin 2 t + 2 t cos 2 t), \end{matrix}

we have that

t = 0

is a singular point of γ. By a direct calculation,

(γ, ν_{1}, ν_{2})

is a spherical framed curve. Then,

\begin{matrix} μ (t) = & γ (t) \times ν_{1} (t) \times ν_{2} (t) \\ = & \frac{1}{\sqrt{20 t^{4} + 17 t^{2} + \frac{45}{16}}} ((2 t^{2} - \frac{3}{4}) cos t - 2 t sin t, (2 t^{2} - \frac{3}{4}) sin t + 2 t cos t, \\ 2 (2 t^{2} + \frac{3}{4}) cos 2 t - 2 t sin 2 t, 2 (2 t^{2} + \frac{3}{4}) sin 2 t + 2 t cos 2 t) \end{matrix}

and the curvature is given by

α (t) = \frac{t \sqrt{20 t^{4} + 17 t^{2} + \frac{45}{16}}}{{(2 t^{2} + \frac{5}{4})}^{\frac{3}{2}}}, ℓ (t) = \frac{8 t}{\sqrt{40 t^{2} + 9}},

m (t) = \frac{24 t^{2} + 15}{4 \sqrt{40 t^{4} + 34 t^{2} + \frac{45}{8}}}, n (t) = \frac{15 (8 t^{2} + 5)}{8 \sqrt{20 t^{2} + \frac{9}{2}} \sqrt{20 t^{4} + 17 t^{2} + \frac{45}{16}}} .

It is easy to see that

m (t) \neq 0

for all

t \in R

. Therefore, if we take

φ = π / 2

,

sin θ (t) = \frac{ℓ (t)}{\sqrt{ℓ^{2} (t) + m^{2} (t)}}

and

cos θ (t) = \frac{m (t)}{\sqrt{ℓ^{2} (t) + m^{2} (t)}}

, then Equation (13) is satisfied. By Theorem 6,

(γ, ν_{1}, ν_{2})

is a Bertrand curve. In fact,

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2}) : R \to Δ

,

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2}) = (- ν_{1}, γ, \frac{m (t)}{\sqrt{ℓ^{2} (t) + m^{2} (t)}} ν_{2} - \frac{ℓ (t)}{\sqrt{ℓ^{2} (t) + m^{2} (t)}} μ)

is a spherical framed curve. Hence,

(γ, ν_{1}, ν_{2})

and

(\bar{γ}, {\bar{ν}}_{1}, {\bar{ν}}_{2})

are Bertrand mates.

Author Contributions

Writing—original draft preparation, M.T. and H.Y.; writing—review and editing, M.T. and H.Y.; All authors equally contributed to this work. All authors have read and agreed to the published version of the manuscript.

Funding

This research was funded by JSPS KAKENHI Grant Number JP 20K03573.

Institutional Review Board Statement

Not applicable.

Informed Consent Statement

Not applicable.

Data Availability Statement

Not applicable.

Conflicts of Interest

The authors declare no conflict of interest.

References

Izumiya, S.; Takeuchi, N. Generic properties of helices and Bertrand curves. J. Geom. 2002, 74, 97–109. [Google Scholar] [CrossRef]
Matsuda, H.; Yorozu, S. Notes on Bertrand curves. Yokohama Math. J. 2003, 50, 41–58. [Google Scholar]
Liu, H.; Wang, F. Mannheim partner curves in 3-space. J. Geom. 2008, 88, 120–126. [Google Scholar] [CrossRef]
Choi, J.H.; Kang, T.H.; Kim, Y.H. Bertrand curves in 3-dimensional space forms. Appl. Math. Comput. 2012, 219, 1040–1046. [Google Scholar] [CrossRef]
Choi, J.H.; Kang, T.H.; Kim, Y.H. Mannheim curves in 3-dimensional space forms. Bull. Korean Math. Soc. 2013, 50, 1099–1108. [Google Scholar] [CrossRef] [Green Version]
Orbay, K.; Kasap, E. On Mannheim partner curves in E³. Int. J. Phys. Sci. 2009, 4, 261–264. [Google Scholar]
Papaioannou, S.G.; Kiritsis, D. Anpplication of Bertrand curves and surface to CAD/CAM. Comp. Aid. Geom. Des. 1985, 17, 348–352. [Google Scholar] [CrossRef]
Ravani, B.; Ku, T.S. Bertrand offsets of ruled and developable surfaces. Comp. Aid. Geom. Des. 1991, 23, 145–152. [Google Scholar] [CrossRef]
Huang, J.; Chen, L.; Izumiya, S.; Pei, D. Geometry of special curves and surfaces in 3-space form. J. Geom. Phys. 2019, 136, 31–38. [Google Scholar] [CrossRef]
Huang, J.; Pei, D. Singular Special Curves in 3-Space Forms. Mathematics 2020, 8, 846. [Google Scholar] [CrossRef]
Kim, C.Y.; Park, J.H.; Yorozu, S. Curves on the unit 3-sphere S³(1) in the Euclidean 4-space R⁴. Bull. Korean Math. Soc. 2013, 50, 1599–1622. [Google Scholar] [CrossRef] [Green Version]
Lucas, P.; Ortega, J.A. Bertrand curves in the three-dimensional sphere. J. Geom. Phys. 2012, 62, 1903–1914. [Google Scholar] [CrossRef]
Lucas, P.; Ortega-Yagües, J.A. Bertrand curves in non-flat 3-dimensional (Riemannian or Lorentzian) space forms. Bull. Korean Math. Soc. 2013, 50, 1109–1126. [Google Scholar] [CrossRef]
Zhao, W.; Pei, D.; Cao, X. Mannheim curves in nonflat 3-dimensional space forms. Adv. Math. Phys. 2015, 4, 1–9. [Google Scholar] [CrossRef] [PubMed]
Honda, S.; Takahashi, M. Bertrand and Mannheim curves of framed curves in the 3-dimensional Euclidean space. Turk. J. Math. 2020, 44, 883–899. [Google Scholar] [CrossRef]
Takahashi, M. Legendre curves in the unit spherical bundle over the unit sphere and evolutes. Contemp. Math. 2016, 675, 337–355. [Google Scholar]
Honda, S.; Takahashi, M. Framed curves in the Euclidean space. Adv. Geom. 2016, 16, 265–276. [Google Scholar] [CrossRef] [Green Version]
Gibson, C.G. Elementary Geometry of Differentiable Curves. An Undergraduate Introduction; Cambridge University Press: Cambridge, UK, 2001. [Google Scholar]
Barros, M. General helices and a theorem of Lancret. Proc. Amer. Math. Soc. 1997, 125, 1503–1509. [Google Scholar] [CrossRef]
Bishop, R.L. There is more than one way to frame a curve. Amer. Math. Mon. 1975, 82, 246–251. [Google Scholar] [CrossRef]

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Takahashi, M.; Yu, H. Bertrand and Mannheim Curves of Spherical Framed Curves in a Three-Dimensional Sphere. Mathematics 2022, 10, 1292. https://doi.org/10.3390/math10081292

AMA Style

Takahashi M, Yu H. Bertrand and Mannheim Curves of Spherical Framed Curves in a Three-Dimensional Sphere. Mathematics. 2022; 10(8):1292. https://doi.org/10.3390/math10081292

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Takahashi, Masatomo, and Haiou Yu. 2022. "Bertrand and Mannheim Curves of Spherical Framed Curves in a Three-Dimensional Sphere" Mathematics 10, no. 8: 1292. https://doi.org/10.3390/math10081292

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Takahashi, M., & Yu, H. (2022). Bertrand and Mannheim Curves of Spherical Framed Curves in a Three-Dimensional Sphere. Mathematics, 10(8), 1292. https://doi.org/10.3390/math10081292

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Bertrand and Mannheim Curves of Spherical Framed Curves in a Three-Dimensional Sphere

Abstract

1. Introduction

2. Regular Spherical Curves

2.1. Bertrand Curves of Regular Spherical Curves

2.2. Mannheim Curves of Regular Spherical Curves

3. Spherical Framed Curves

3.1. Bertrand Curves of Spherical Framed Curves

3.2. Mannheim Curves of Spherical Framed Curves

Author Contributions

Funding

Institutional Review Board Statement

Informed Consent Statement

Data Availability Statement

Conflicts of Interest

References

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