We consider a smooth curve with singular points in the Euclidean space. As a smooth curve with singular points, we have introduced a framed curve or a framed immersion. A framed immersion is a smooth curve with a moving frame and the pair is an immersion. We define an evolute and a focal surface of a framed immersion in the Euclidean space. The evolutes and focal surfaces of framed immersions are generalizations of each object of regular space curves. We give relationships between singularities of the evolutes and of the focal surfaces. Moreover, we consider properties of the evolutes, focal surfaces and repeated evolutes.First View (as of 2019-08-27
Evolutes and pedals of plane curves have been well investigated since the beginning of the history o...
We have already defined the evolutes and the involutes of fronts without inflection points. For regu...
We study the extrinsic geometry of surfaces immersed in Rn, n ≥ 5, by analyzing their contacts with ...
We consider a smooth curve with singular points in the Euclidean space. As a smooth curve with singu...
The evolute of a regular curve in the Euclidean plane is given by not only the caustics of the regul...
A framed surface is a smooth surface in the Euclidean space with a moving frame.The framed surfaces ...
A framed surface is a smooth surface in the Euclidean space with a moving frame. The framed surfaces...
In order to consider singular curves in the unit sphere, we consider Legendre curves in the unit sph...
For a regular plane curve, an involute of it is the trajectory described by the end of a stretched s...
Coordenação de Aperfeiçoamento de Pessoal de Nível SuperiorThe focal surface of a curve γ in the Euc...
Evolutoids of a plane curve are a generalization of an evolute. They form a one parameter family of ...
We study evolutes and involutes of space curves. Although much of the material presented is not new ...
We can use a moving frame, as in the case of regular plane curves in the Euclidean plane, in order t...
We consider the differential geometry of evolutes of singular curves in hyperbolic 2-space and de Si...
In this work, for regular involute-evolute curve couples, it is proven that evolute’s Frenet apparat...
Evolutes and pedals of plane curves have been well investigated since the beginning of the history o...
We have already defined the evolutes and the involutes of fronts without inflection points. For regu...
We study the extrinsic geometry of surfaces immersed in Rn, n ≥ 5, by analyzing their contacts with ...
We consider a smooth curve with singular points in the Euclidean space. As a smooth curve with singu...
The evolute of a regular curve in the Euclidean plane is given by not only the caustics of the regul...
A framed surface is a smooth surface in the Euclidean space with a moving frame.The framed surfaces ...
A framed surface is a smooth surface in the Euclidean space with a moving frame. The framed surfaces...
In order to consider singular curves in the unit sphere, we consider Legendre curves in the unit sph...
For a regular plane curve, an involute of it is the trajectory described by the end of a stretched s...
Coordenação de Aperfeiçoamento de Pessoal de Nível SuperiorThe focal surface of a curve γ in the Euc...
Evolutoids of a plane curve are a generalization of an evolute. They form a one parameter family of ...
We study evolutes and involutes of space curves. Although much of the material presented is not new ...
We can use a moving frame, as in the case of regular plane curves in the Euclidean plane, in order t...
We consider the differential geometry of evolutes of singular curves in hyperbolic 2-space and de Si...
In this work, for regular involute-evolute curve couples, it is proven that evolute’s Frenet apparat...
Evolutes and pedals of plane curves have been well investigated since the beginning of the history o...
We have already defined the evolutes and the involutes of fronts without inflection points. For regu...
We study the extrinsic geometry of surfaces immersed in Rn, n ≥ 5, by analyzing their contacts with ...