Curvature surfaces in generic conformally flat hypersurfaces arising from Poincar\'e metric -- Extension and Approximation

Abstract

We study generic conformally flat (analytic-)hypersurfaces in the Euclidean 4-space R4. Such a local-hypersurface is obtained as an evolution of surfaces issuing from a certain surface in R4, and then, in consequence, the original surface is a (principal-)curvature surface of the hypersurface. The Poincar\'e metric gH of the upper half plane leads to a 6-dimensional set of rational Riemannian metrics g0 of R2: on a simply connected open set in the regular domain of g0, a curvature surface f0 with the metric g0 is determined, which we denote by (f0,g0). In this paper, we choose a suitable metric g0 of R2 determined by gH to get nice curvature surfaces (but it also has degenerate and divergent points in R2), and clarify the structure of the curvature surfaces (f0,g0): the curvature surfaces (f0,g0) extend analytically to what kind of set in R2 beyond the regular set of g0, and then the extended surface (f0,g0) is defined on a certain open set of R2 and bounded in R4; for the extended surface (f0,g0), we explicitly catch the set of degenerate points and the limits in R4 of both ends of every principal curvature line, and then the two limits of every line for one principal curvature are parallel small circles in a standard 2-sphere S2. Then, every principal curvature line in the extended surface (f0,g0) is expressed by a frame field of R4 induced on the surface from a hypersurface and it lies on a standard 2-sphere S2 with line-dependent radius. We also provide a general method of constructing an approximation of such frame fields, and obtain the entire pictures of those lines including degenerate points of (f0,g0).