If a Hilbert geometry satisfies a rather weak version of either Ceva’s or Menelaus’ theorem for every triangle, then it is hyperbolic
In this paper non-geodesic biharmonic curves in {tiny $widetilde{SL(2,mathbb{R})}$} space are charac...
In this note, we give an alternative and considerably shorter proof of a result of Shult stating tha...
In this paper, we propose a resolvent of an equilibrium problem in a geodesic space with negative cu...
A Hilbert geometry is hyperbolic if and only if the perpendicular bisectors or the altitudes of any ...
In the dissertation, we present our research in the fields of projective metric geometries, in the c...
This note will prove a discreteness criterion for groups of orientation-preserving isometries of the...
EnWe point out that the axiomatic analysis of the statement The segments joining a point with the ve...
AbstractLet X be a simply connected and hyperbolic subregion of the complex plane C. A proper subreg...
In this paper, we provide the exact expressions (not found in the liter- ature) for the curved surfa...
This paper is devoted to studying the semilinear elliptic system of H?non type ???????BNu=K(d(x))Qu...
The moduli space of convex projective structures on a simplicial hyperbolic Coxeter orbifold is eith...
Abstract. The hyperbolic plane is an example of a geometry where the first four of Euclid’s Axioms h...
Explicit expressions for the centroids of hyperbolic pie shapes and isosce- les triangles are found...
For Γ a cocompact or cofinite Fuchsian group, we study the hyperbolic lattice point problem in conju...
In Euclidean geometry we find three types of special conics, which are distinguished with respect to...
In this paper non-geodesic biharmonic curves in {tiny $widetilde{SL(2,mathbb{R})}$} space are charac...
In this note, we give an alternative and considerably shorter proof of a result of Shult stating tha...
In this paper, we propose a resolvent of an equilibrium problem in a geodesic space with negative cu...
A Hilbert geometry is hyperbolic if and only if the perpendicular bisectors or the altitudes of any ...
In the dissertation, we present our research in the fields of projective metric geometries, in the c...
This note will prove a discreteness criterion for groups of orientation-preserving isometries of the...
EnWe point out that the axiomatic analysis of the statement The segments joining a point with the ve...
AbstractLet X be a simply connected and hyperbolic subregion of the complex plane C. A proper subreg...
In this paper, we provide the exact expressions (not found in the liter- ature) for the curved surfa...
This paper is devoted to studying the semilinear elliptic system of H?non type ???????BNu=K(d(x))Qu...
The moduli space of convex projective structures on a simplicial hyperbolic Coxeter orbifold is eith...
Abstract. The hyperbolic plane is an example of a geometry where the first four of Euclid’s Axioms h...
Explicit expressions for the centroids of hyperbolic pie shapes and isosce- les triangles are found...
For Γ a cocompact or cofinite Fuchsian group, we study the hyperbolic lattice point problem in conju...
In Euclidean geometry we find three types of special conics, which are distinguished with respect to...
In this paper non-geodesic biharmonic curves in {tiny $widetilde{SL(2,mathbb{R})}$} space are charac...
In this note, we give an alternative and considerably shorter proof of a result of Shult stating tha...
In this paper, we propose a resolvent of an equilibrium problem in a geodesic space with negative cu...
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