In this paper, the spherical indicatrix curves drawn by quaternionic frenet vectors are computed. Also the quaternionic geodesic curvatures of the spherical indicatrix curves to E^3 and S^2 are found
{aeres : ACL}International audienceIn the euclidean plane, a regular curve can be defined through it...
AbstractWe develop quaternionic analysis using as a guiding principle representation theory of vario...
AbstractFor regular polynomial curves r(t) in R3, relations between the helicity condition, existenc...
In this paper, the spherical indicatrix curves drawn by quaternionic frenet vectors are computed. Al...
In this paper, we studied some characterizations of the osculating sphere of the real quaternionic c...
We derive a general differential equation satisfed by the distance function for quaternionic curves ...
William Rowan Hamilton invented the quaternions in 1843, in his effort to construct hypercomplex num...
In this study, a brief summary about quaternions and quaternionic curves are firstly presented. Also...
The real roots of the cubic and quartic polynomials are studied geometrically with the help of their...
We are studying hyperbolic function theory in the total skew-field of quaternions. Earlier the theor...
Dissertação de mestrado em Matemática Computacional.A descoberta dos quaterniões por Sir Hamilton em...
In this paper, we investigate special Smarandache curves in terms of Sabban frame of spherical indic...
YÖK Tez ID: 418439Bu çalışma beş bölümden oluşmaktadır. Birinci bölümde giriş, tezin amacı ve kaynak...
p>In this paper, we found the Darboux vector of the spatial quaternionicnbsp;curve according to the ...
The paper makes an attempt to visualize one of the homogeneous geometries, the it Sol geometry, by i...
{aeres : ACL}International audienceIn the euclidean plane, a regular curve can be defined through it...
AbstractWe develop quaternionic analysis using as a guiding principle representation theory of vario...
AbstractFor regular polynomial curves r(t) in R3, relations between the helicity condition, existenc...
In this paper, the spherical indicatrix curves drawn by quaternionic frenet vectors are computed. Al...
In this paper, we studied some characterizations of the osculating sphere of the real quaternionic c...
We derive a general differential equation satisfed by the distance function for quaternionic curves ...
William Rowan Hamilton invented the quaternions in 1843, in his effort to construct hypercomplex num...
In this study, a brief summary about quaternions and quaternionic curves are firstly presented. Also...
The real roots of the cubic and quartic polynomials are studied geometrically with the help of their...
We are studying hyperbolic function theory in the total skew-field of quaternions. Earlier the theor...
Dissertação de mestrado em Matemática Computacional.A descoberta dos quaterniões por Sir Hamilton em...
In this paper, we investigate special Smarandache curves in terms of Sabban frame of spherical indic...
YÖK Tez ID: 418439Bu çalışma beş bölümden oluşmaktadır. Birinci bölümde giriş, tezin amacı ve kaynak...
p>In this paper, we found the Darboux vector of the spatial quaternionicnbsp;curve according to the ...
The paper makes an attempt to visualize one of the homogeneous geometries, the it Sol geometry, by i...
{aeres : ACL}International audienceIn the euclidean plane, a regular curve can be defined through it...
AbstractWe develop quaternionic analysis using as a guiding principle representation theory of vario...
AbstractFor regular polynomial curves r(t) in R3, relations between the helicity condition, existenc...