DOIAbstract
In this work, we state and prove the sine, cosine I, cosine II, sine-cosine and cotangent rules for spherical triangles on the hyperbolic unit sphere H02 in the Lorentzian space R13
In this work, we state and prove the sine, cosine I, cosine II, sine-cosine and cotangent rules for spherical triangles on the hyperbolic unit sphere H02 in the Lorentzian space R13
In this note, we will study about the space of oriented geodesics in hyperbolic spaces Hn. It is wel...
Suppose T is a geodesic triangle with respect to the spherical or the hyperbolic metric. Let f : T !...
AbstractHyperbolic trigonometry is developed and illustrated in this article along lines parallel to...
In plane Lorentzian geometry it is studied points, timelike, spacelike and lightlike lines, triangle...
In this work, we proved the sine and cosine rules for a spherical pure triangle on the dual Lorentzi...
Abstract. In this paper, by using the definition of oriented hyperbolic angle be-tween two non–null ...
In this work, we proved the Cosine Rule II for a spherical triangle on the dual unit spher
Abstract. We study the hyperbolic cosine and sine laws in the extended hyperbolic space which contai...
Abstract. In this paper, using definitions of oriented hyperbolic angles between non–null vectors, w...
We provide hyperbolic analogues of some classical theorems in spherical geometry due to Menelaus, E...
Abstract. We give the hyperbolic analogues of some classical theorems in spherical geometry due to M...
Using the method of C. Vörös, we establish several results on hyperbolic plane geometry, related t...
Abstract: In this study, we present a proof of the Menelaus theorem for quadrilaterals in hyperbolic...
In this study, we present a proof of the Menelaus theorem for quadrilaterals in hyperbolic geometry,...
In this study, we present a proof of the Menelaus theorem for quadrilaterals in hyperbolic geometry,...
In this note, we will study about the space of oriented geodesics in hyperbolic spaces Hn. It is wel...
Suppose T is a geodesic triangle with respect to the spherical or the hyperbolic metric. Let f : T !...
AbstractHyperbolic trigonometry is developed and illustrated in this article along lines parallel to...
In plane Lorentzian geometry it is studied points, timelike, spacelike and lightlike lines, triangle...
In this work, we proved the sine and cosine rules for a spherical pure triangle on the dual Lorentzi...
Abstract. In this paper, by using the definition of oriented hyperbolic angle be-tween two non–null ...
In this work, we proved the Cosine Rule II for a spherical triangle on the dual unit spher
Abstract. We study the hyperbolic cosine and sine laws in the extended hyperbolic space which contai...
Abstract. In this paper, using definitions of oriented hyperbolic angles between non–null vectors, w...
We provide hyperbolic analogues of some classical theorems in spherical geometry due to Menelaus, E...
Abstract. We give the hyperbolic analogues of some classical theorems in spherical geometry due to M...
Using the method of C. Vörös, we establish several results on hyperbolic plane geometry, related t...
Abstract: In this study, we present a proof of the Menelaus theorem for quadrilaterals in hyperbolic...
In this study, we present a proof of the Menelaus theorem for quadrilaterals in hyperbolic geometry,...
In this study, we present a proof of the Menelaus theorem for quadrilaterals in hyperbolic geometry,...
In this note, we will study about the space of oriented geodesics in hyperbolic spaces Hn. It is wel...
Suppose T is a geodesic triangle with respect to the spherical or the hyperbolic metric. Let f : T !...
AbstractHyperbolic trigonometry is developed and illustrated in this article along lines parallel to...
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