Add to ORKGIn this note we classify all Bonnet pairs on a simply connected domain. Our main intent was to apply what we call a quaternionic function theory to a concrete problem in differential geometry. The ideas are simple: conformal immersions into quaternions or imaginary quaternions take the place of chart maps for a Riemann surface. Starting from a reference immersion we construct all conformal immersions of a given (simply connected) Riemann surface (up to translational periods) by spin transformations. With this viewpoint in mind we discuss how to construct all Bonnet pairs on a simply connected domain from isothermic surfaces and vice versa. Isothermic surfaces are solutions to a certain soliton equation and thus a simple dimension count tell...
We know that Bonnet surfaces are the surfaces which can admit at least one non-trivial isometry that...
This note gives sufficient conditions (isothermic or totally nonisothermic) for an immersion of a co...
Abstract. We introduce a new method to construct a large family of Lagrangian surfaces in complex Eu...
In this note we classify all Bonnet pairs on a simply connected domain. Our main intent was to apply...
Two non-congruent surfaces that are isometric and have the same mean curva-ture at corresponding poi...
A generic surface in Euclidean 3-space is determined uniquely by its metric and curvature. Classific...
We characterize the Christoffel pairs of timelike isothermic surfaces in the four-dimensional split-...
The structure equations for a two-dimensional manifold are introduced and two results based on the C...
In this work one can find a research on special isothermic surfaces of arbitrary type, and arbitrary...
Abstract. In these notes we compute the geodesic curvature on a surface in isothermal coordinates an...
We solve Blaschke’s problem for hypersurfaces of dimension n ≥ 3. Namely, we determine all pairs of ...
We prove a sub-Riemannian version of Bonnet-Myers theorem that applies to any quaternionic contact m...
Abstract. The problem of determining the Bonnet hypersurfaces in Rn+1, for n> 1, is studied here....
This note gives sufficient conditions (isothermic or totally nonisothermic) for an immersion of a co...
surfaces, homogeneous spaces. We solve the Bonnet problem for surfaces in the homogeneous 3-manifold...
We know that Bonnet surfaces are the surfaces which can admit at least one non-trivial isometry that...
This note gives sufficient conditions (isothermic or totally nonisothermic) for an immersion of a co...
Abstract. We introduce a new method to construct a large family of Lagrangian surfaces in complex Eu...
In this note we classify all Bonnet pairs on a simply connected domain. Our main intent was to apply...
Two non-congruent surfaces that are isometric and have the same mean curva-ture at corresponding poi...
A generic surface in Euclidean 3-space is determined uniquely by its metric and curvature. Classific...
We characterize the Christoffel pairs of timelike isothermic surfaces in the four-dimensional split-...
The structure equations for a two-dimensional manifold are introduced and two results based on the C...
In this work one can find a research on special isothermic surfaces of arbitrary type, and arbitrary...
Abstract. In these notes we compute the geodesic curvature on a surface in isothermal coordinates an...
We solve Blaschke’s problem for hypersurfaces of dimension n ≥ 3. Namely, we determine all pairs of ...
We prove a sub-Riemannian version of Bonnet-Myers theorem that applies to any quaternionic contact m...
Abstract. The problem of determining the Bonnet hypersurfaces in Rn+1, for n> 1, is studied here....
This note gives sufficient conditions (isothermic or totally nonisothermic) for an immersion of a co...
surfaces, homogeneous spaces. We solve the Bonnet problem for surfaces in the homogeneous 3-manifold...
We know that Bonnet surfaces are the surfaces which can admit at least one non-trivial isometry that...
This note gives sufficient conditions (isothermic or totally nonisothermic) for an immersion of a co...
Abstract. We introduce a new method to construct a large family of Lagrangian surfaces in complex Eu...