Add to ORKGIn [4], we developed the theory of properly embedded minimal surfaces in M × R, where M is a compact Riemannian surface. One of the first results in [4] is that a properly embedded noncompact minimal surface Σ inM×R of bounded Gaussian curvature is quasiperiodic in the following sense: given an
Abstract. It is proved that the spaces of index one minimal surfaces and stable constant mean curvat...
It is known that a compact minimal surface in a 3-dimensional flat torus T 3 = R3/Λ can be regarded ...
In this paper we will discuss minimal surfaces Σ in M × R, where M will be the 2-sphere (with the co...
In [4], we developed the theory of properly embedded minimal surfaces in M × R, where M is a compact...
The main goal of this paper is to construct a complete, embedded minimal surface in euclidean space ...
We give a new approach to the study of relations between the Gauss map and compactness properties fo...
We introduce a new class of p-minimal surfaces. We shaw that the Gauss map of a two-dimensional p-mi...
We introduce a new class of p-minimal surfaces. We shaw that the Gauss map of a two-dimensional p-mi...
Abstract. We prove that closed surfaces of all topological types, except for the non-orientable odd-...
Abstract. We prove that if M ⊂ R3 is a properly embedded oriented stable minimal surface whose bound...
Abstract: we construct a properly embedded minimal surface in the at product R2 S1 which is quasi-...
We prove that there are no complete one-sided stable minimal surfaces in the Euclidean 3-space. We c...
We prove a growth theorem for a function to belong to the class Sigma(mu; a) and generalize a Weiers...
We establish some a priori geometric relations on stable minimal sur-faces lying inside three-manifo...
Abstract. We prove a structural theorem that provides a precise local picture of how a sequence of c...
Abstract. It is proved that the spaces of index one minimal surfaces and stable constant mean curvat...
It is known that a compact minimal surface in a 3-dimensional flat torus T 3 = R3/Λ can be regarded ...
In this paper we will discuss minimal surfaces Σ in M × R, where M will be the 2-sphere (with the co...
In [4], we developed the theory of properly embedded minimal surfaces in M × R, where M is a compact...
The main goal of this paper is to construct a complete, embedded minimal surface in euclidean space ...
We give a new approach to the study of relations between the Gauss map and compactness properties fo...
We introduce a new class of p-minimal surfaces. We shaw that the Gauss map of a two-dimensional p-mi...
We introduce a new class of p-minimal surfaces. We shaw that the Gauss map of a two-dimensional p-mi...
Abstract. We prove that closed surfaces of all topological types, except for the non-orientable odd-...
Abstract. We prove that if M ⊂ R3 is a properly embedded oriented stable minimal surface whose bound...
Abstract: we construct a properly embedded minimal surface in the at product R2 S1 which is quasi-...
We prove that there are no complete one-sided stable minimal surfaces in the Euclidean 3-space. We c...
We prove a growth theorem for a function to belong to the class Sigma(mu; a) and generalize a Weiers...
We establish some a priori geometric relations on stable minimal sur-faces lying inside three-manifo...
Abstract. We prove a structural theorem that provides a precise local picture of how a sequence of c...
Abstract. It is proved that the spaces of index one minimal surfaces and stable constant mean curvat...
It is known that a compact minimal surface in a 3-dimensional flat torus T 3 = R3/Λ can be regarded ...
In this paper we will discuss minimal surfaces Σ in M × R, where M will be the 2-sphere (with the co...