Normal curvature and the topological structure of multidimensional surfaces in a spherical space

## Abstract In this paper we study complete orientable surfaces with a constant principal curvature __R__ in the 3‐dimensional hyperbolic space **H**^3^. We prove that if __R__^2^ > 1, such a surface is totally umbilical or umbilically free and it can be described in terms of a complete regular cur

Let \(X\) be a Banach space, and \(S(X)\) be the unit sphere of \(X\). Two geometric concepts are introduced: the modulus \(W(\varepsilon)=\inf \left\{\sup \left\{, f\_{x} \in \nabla\_{x}\right\}, x, y \in S(X)\right.\) with \(\|x-y\| \geq \varepsilon\} ;\) and the modulus \(W\_{1}(\varepsilon)=\sup

In the hyperspace Exp X of all closed subsets of a topological space X interval and order topology solely use the c-relation in Exp X for their definitions whereas HAUSDORFB set convergence and VIETORIS topology use neighbourhoods in X itself. Nevertheless there exist intimate but non-trivial relati