Pseudo-spherical Submanifolds with Degenerate Bianchi Transformation

Abstract: We describe pseudo-spherical submanifolds with degenerate Bianchi transformation in constant curvature spaces.Mathematics Subject Classification (2010). Primary 53A07.

“…No less interesting is the problem of generalization of the considered subject area to the case of many-dimensional pseudo-spherical surfaces with the degenerated Bäcklund transformation. N and H N . Similarly to the case considered in the previous subsection, in [18] pseudo-spherical surfaces with a degenerated into a line Bianchi transformation are discussed in the sphere S N and Lobachevsky space H N .…”

“…A generalization of these results to the case of n-dimensional pseudo-spherical surfaces with the degenerated into a line Bianchi transformation in N -dimensional Euclidean space is obtained in [18].…”

“…In [16] (see also [14,18]), the problem of the description of pseudo-spherical surfaces with the degenerated Bianchi transformation in the Euclidean space E N is considered for an arbitrary N ≥ 3. The following special class of pseudo-spherical surfaces is introduced.…”

“…Moreover, in [16,18], the constructive methods of constructing generalized Beltrami surfaces are discussed. It is shown that any curve in E N −2 can be locally obtained by means of a degenerate Bianchi transformation of some generalized Beltrami surface in E N .…”

Generalization of the Bianchi–Bäcklund Transformation of Pseudo-Spherical Surfaces

“…No less interesting is the problem of generalization of the considered subject area to the case of many-dimensional pseudo-spherical surfaces with the degenerated Bäcklund transformation. N and H N . Similarly to the case considered in the previous subsection, in [18] pseudo-spherical surfaces with a degenerated into a line Bianchi transformation are discussed in the sphere S N and Lobachevsky space H N .…”

“…A generalization of these results to the case of n-dimensional pseudo-spherical surfaces with the degenerated into a line Bianchi transformation in N -dimensional Euclidean space is obtained in [18].…”

“…In [16] (see also [14,18]), the problem of the description of pseudo-spherical surfaces with the degenerated Bianchi transformation in the Euclidean space E N is considered for an arbitrary N ≥ 3. The following special class of pseudo-spherical surfaces is introduced.…”

“…Moreover, in [16,18], the constructive methods of constructing generalized Beltrami surfaces are discussed. It is shown that any curve in E N −2 can be locally obtained by means of a degenerate Bianchi transformation of some generalized Beltrami surface in E N .…”

Generalization of the Bianchi–Bäcklund Transformation of Pseudo-Spherical Surfaces

“…A complete description of n-dimensional pseudo-spherical submanifolds in R n+p admitting degenerate Bianchi transformations to one-dimensional curves was proved recently in [11], see also [7], [12]. These submanifolds, which are called generalized Beltrami surfaces, are submanifolds of revolution obtained by rotating particular curves, generalized tractrices.…”

Degenerate Bianchi transformations for three-dimensional pseudo-spherical submanifolds in $\mathbb R^5$

Degenerate Bianchi Transformations for Three-Dimensional Pseudo-Spherical Submanifolds in $${\mathbb {R}}^5$$