We introduce a class of surfaces in euclidean space motivated by a problem posed by Élie Cartan. This class furnishes what seems to be the first examples of pairs of non-congruent surfaces in euclidean space such that, under a diffeomorphism Φ, lines of curvatures are preserved and principal curvatures are switched. We show how to construct such surfaces using holomorphic data and discuss their relation with minimal surfaces. We also prove that if the diffeomorphism Φ preserves the conformal class of the third fundamental form, then all examples belong to the class of surfaces that we deal with in this work
Attempts have been made to introduce ruled surfaces generated from any vector X, Bishop Darboux vect...
This paper deals with the surfaces of constant mean curvature in the Euclidean space. The first par...
Abstract. We construct harmonic diffeomorphisms from the complex plane C onto any Hadamard surface M...
Concerning complete orientable minimal surfaces with finite total curvature in Euclidean three-space...
The aim of this article is to present and reformulate systematically what is known about surfaces in...
We prove that there exists at most one minimal diffeomorphism in a given homotopy class between any ...
The Ribaucour transformation classically relates surfaces via a sphere congruence that preserves lin...
Meeks and Pérez present a survey of recent spectacular successes in classical minimal surface theory...
AbstractThe space of lines in R3 can be viewed as a four dimensional homogeneous space of the group ...
3D surface classification is a fundamental problem in computer vision and computational geometry. Su...
This book contains recent results from a group focusing on minimal surfaces in the Moscow State Univ...
In this work we construct families of CMC (Constant Mean Curvature) surfaces which bifurcate from ce...
In this paper, we study surfaces in Euclidean 3-space that satisfy a Weingarten condition of linear ...
3D surface classification is a fundamental problem in computer vision and computational geometry. Su...
122 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2004.In this work, the author stud...
Attempts have been made to introduce ruled surfaces generated from any vector X, Bishop Darboux vect...
This paper deals with the surfaces of constant mean curvature in the Euclidean space. The first par...
Abstract. We construct harmonic diffeomorphisms from the complex plane C onto any Hadamard surface M...
Concerning complete orientable minimal surfaces with finite total curvature in Euclidean three-space...
The aim of this article is to present and reformulate systematically what is known about surfaces in...
We prove that there exists at most one minimal diffeomorphism in a given homotopy class between any ...
The Ribaucour transformation classically relates surfaces via a sphere congruence that preserves lin...
Meeks and Pérez present a survey of recent spectacular successes in classical minimal surface theory...
AbstractThe space of lines in R3 can be viewed as a four dimensional homogeneous space of the group ...
3D surface classification is a fundamental problem in computer vision and computational geometry. Su...
This book contains recent results from a group focusing on minimal surfaces in the Moscow State Univ...
In this work we construct families of CMC (Constant Mean Curvature) surfaces which bifurcate from ce...
In this paper, we study surfaces in Euclidean 3-space that satisfy a Weingarten condition of linear ...
3D surface classification is a fundamental problem in computer vision and computational geometry. Su...
122 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2004.In this work, the author stud...
Attempts have been made to introduce ruled surfaces generated from any vector X, Bishop Darboux vect...
This paper deals with the surfaces of constant mean curvature in the Euclidean space. The first par...
Abstract. We construct harmonic diffeomorphisms from the complex plane C onto any Hadamard surface M...