Add to ORKGIn a recent series of papers, K. Leichweiß extended various topics from Euclidean geometry to the hyperbolic plane (and partially to the geometry on the sphere). His results concern convexity and extremum problems for closed curves, including the addition of convex sets
Let X be a simply connected and hyperbolic subregion of the complex plane ℂ. A proper subregion Ω of...
Let X be a simply connected and hyperbolic subregion of the complex plane ℂ. A proper subregion Ω of...
This book provides a self-contained introduction to convex geometry in Euclidean space. After coveri...
This paper is the third and final part of a trilogy dealing with the concept of k-convexity in vario...
Abstract. In Euclidean geometry the vertices P of those angles ∠APB of size α that pass through the ...
This thesis is a study of three topics, each of which describes an aspect of the geometry of conform...
This thesis is a study of three topics, each of which describes an aspect of the geometry of conform...
In this two-sessions seminar, some results concerning geometrical properties of three dimensional po...
We investigate various problems related to convexity in the three spaces of constant curvature (the ...
Thesis (Ph. D.)--University of Hawaii at Manoa, 1993.Includes bibliographical references (leaf 124)M...
AbstractUsing results from integral geometry, we find inequalities involving mean curvature integral...
Abstract. Using results from integral geometry, we find inequalities involving mean curvature integr...
AbstractLet X be a simply connected and hyperbolic subregion of the complex plane C. A proper subreg...
Imagine a world in which there are infinitely many lines through a single point that are all paralle...
We describe the first-order variations of the angles of Euclidean, spherical or hyperbolic polygons ...
Let X be a simply connected and hyperbolic subregion of the complex plane ℂ. A proper subregion Ω of...
Let X be a simply connected and hyperbolic subregion of the complex plane ℂ. A proper subregion Ω of...
This book provides a self-contained introduction to convex geometry in Euclidean space. After coveri...
This paper is the third and final part of a trilogy dealing with the concept of k-convexity in vario...
Abstract. In Euclidean geometry the vertices P of those angles ∠APB of size α that pass through the ...
This thesis is a study of three topics, each of which describes an aspect of the geometry of conform...
This thesis is a study of three topics, each of which describes an aspect of the geometry of conform...
In this two-sessions seminar, some results concerning geometrical properties of three dimensional po...
We investigate various problems related to convexity in the three spaces of constant curvature (the ...
Thesis (Ph. D.)--University of Hawaii at Manoa, 1993.Includes bibliographical references (leaf 124)M...
AbstractUsing results from integral geometry, we find inequalities involving mean curvature integral...
Abstract. Using results from integral geometry, we find inequalities involving mean curvature integr...
AbstractLet X be a simply connected and hyperbolic subregion of the complex plane C. A proper subreg...
Imagine a world in which there are infinitely many lines through a single point that are all paralle...
We describe the first-order variations of the angles of Euclidean, spherical or hyperbolic polygons ...
Let X be a simply connected and hyperbolic subregion of the complex plane ℂ. A proper subregion Ω of...
Let X be a simply connected and hyperbolic subregion of the complex plane ℂ. A proper subregion Ω of...
This book provides a self-contained introduction to convex geometry in Euclidean space. After coveri...