We give a moving frame of a Legendre curve (or, a frontal) in the unit tangent bundle and define a pair of smooth functions of a Legendre curve like as the curvature of a regular plane curve. It is quite useful to analyse the Legendre curves. The existence and uniqueness for Legendre curves hold similarly to the case of regular plane curves. As an application, we consider contact between Legendre curves and the arc-length parameter of Legendre immersions in the unit tangent bundle
summary:We study Legendre and slant curves for Bianchi-Cartan-Vranceanu metrics. These curves are ch...
To appear in Proc. Edimb. Math. Soc.We construct a Legendrian version of Envelope theory. A tangenti...
We give new functions of Legendrian knots derived from Legendrian fronts. These are integer-valued l...
We give a moving frame of a Legendre curve (or, a frontal) in the unite tangent bundle and define a ...
In order to consider singular curves in the unit sphere, we consider Legendre curves in the unit sph...
In this study, we consider some special mates of spherical Legendre curves by using Legendre frame a...
We study convexity of simple closed frontals in the Euclidean plane by using the curvature of Legend...
For singular plane curves, the classical definitions of envelopes are vague. In order to define enve...
In this paper, we introduce a one-parameter family of Legendre curves in the unit spherical bundle o...
The evolute of a regular curve in the Euclidean plane is given by not only the caustics of the regul...
For a regular plane curve, an involute of it is the trajectory described by the end of a stretched s...
For singular plane curves, the classical definitions of envelopes are vague. In order to define enve...
We construct the generic component of the moduli space of the germs of Legendrian curves with generi...
For families of hypersurfaces with singular points, a classical definition of an envelope is vague. ...
A framed surface is a smooth surface in the Euclidean space with a moving frame.The framed surfaces ...
summary:We study Legendre and slant curves for Bianchi-Cartan-Vranceanu metrics. These curves are ch...
To appear in Proc. Edimb. Math. Soc.We construct a Legendrian version of Envelope theory. A tangenti...
We give new functions of Legendrian knots derived from Legendrian fronts. These are integer-valued l...
We give a moving frame of a Legendre curve (or, a frontal) in the unite tangent bundle and define a ...
In order to consider singular curves in the unit sphere, we consider Legendre curves in the unit sph...
In this study, we consider some special mates of spherical Legendre curves by using Legendre frame a...
We study convexity of simple closed frontals in the Euclidean plane by using the curvature of Legend...
For singular plane curves, the classical definitions of envelopes are vague. In order to define enve...
In this paper, we introduce a one-parameter family of Legendre curves in the unit spherical bundle o...
The evolute of a regular curve in the Euclidean plane is given by not only the caustics of the regul...
For a regular plane curve, an involute of it is the trajectory described by the end of a stretched s...
For singular plane curves, the classical definitions of envelopes are vague. In order to define enve...
We construct the generic component of the moduli space of the germs of Legendrian curves with generi...
For families of hypersurfaces with singular points, a classical definition of an envelope is vague. ...
A framed surface is a smooth surface in the Euclidean space with a moving frame.The framed surfaces ...
summary:We study Legendre and slant curves for Bianchi-Cartan-Vranceanu metrics. These curves are ch...
To appear in Proc. Edimb. Math. Soc.We construct a Legendrian version of Envelope theory. A tangenti...
We give new functions of Legendrian knots derived from Legendrian fronts. These are integer-valued l...